{"pkgId":"15","subjectId":"1308","fullwidthLayout":false,"contentData":{"PACKAGE_NAME":"Ontario Curriculum Full Access","PACKAGE_SLUG":"ontario-full","PACKAGE_IMG":"file_700468735_1592489113.png","ADMCOURSE_ID":"374","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","STANDARD_NAME":"Ontario","ADMSUBJECT_ID":"1308","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","CAT_NAME":"Linear Expressions :Addition","CONT_ID":"732","CONT_TITLE":"Linear Expressions: Addition","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA linear expression is an expression containing a variable that is only raised to the first power 1. To add linear expressions, combine like terms. For example: To add 2x + 2 and 4x + 5, add 2x and 4x which produces 6x. Then add the constant terms 2 + 5 = 7. 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It can also be defined as a surface or a shape exposed by making a straight cut through a shape. For example, the horizontal cross section of a cylinder is a circle and its vertical cross section is a rectangle.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define the concept of cross section for three-dimensional objects.\u003C\/div\u003E \r\n\u003Cdiv\u003E- State the meaning of horizontal and vertical cross sections.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify the cross sections of three-dimensional objects.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000076","TOPIC_ID":"vm000076","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000076.jpg","PUBLIC_BANNER_IMG":"vm000076.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000076.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A cross section is the intersection of a plane with a three-dimensional object. It can also be defined as a surface or a shape exposed by making a straight cut through a shape. For example, the horizontal cross section of a cylinder is a circle and its vertical cross section is a rectangle.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define the concept of cross section for three-dimensional objects.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- State the meaning of horizontal and vertical cross sections.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify the cross sections of three-dimensional objects.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Cross Sections","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"752","CATEGORY_ID":"1","CONT_TITLE":"Cubes and Cuboids: Surface Area and Volume","CONT_SLUG":"cubes-and-cuboids-surface-area-and-volume","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA cube is a solid object with six square surfaces that are all the same size. A a cuboid is a solid shape with six rectangular surfaces.The total surface area of a cube or a cuboid can be calculated by adding the areas of all 6 faces. The lateral surface area is calculated by adding the areas of four walls only. The volume of a cuboid is the product of its dimensions.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the volume of a cube.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the surface area of a cube.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the volume of a cuboid.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the surface area of a cuboid.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000011","TOPIC_ID":"vm000011","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000011.jpg","PUBLIC_BANNER_IMG":"vm000011.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000011.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A cube is a solid object with six square surfaces that are all the same size. A a cuboid is a solid shape with six rectangular surfaces.The total surface area of a cube or a cuboid can be calculated by adding the areas of all 6 faces. The lateral surface area is calculated by adding the areas of four walls only. The volume of a cuboid is the product of its dimensions.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the volume of a cube.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the surface area of a cube.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the volume of a cuboid.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the surface area of a cuboid.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Cube and Cuboids : Surface area and Volume","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"748","CATEGORY_ID":"1","CONT_TITLE":"Sum of Arithmetic Progression","CONT_SLUG":"sum-of-arithmetic-progression","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003ETo find the sum of all the n terms of an arithmetic progression, apply the formula for sum of n terms, Sn= (n \/ 2)(2 a + (n - 1) d). the arithmetic mean between two numbers a and b is (a + b) \/ 2 and if the sequence is a, A1, A2, A3, A4, b then A1, A2, A3, A4 are four arithmetic means between a and b.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define the term arithmetic progression.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain the properties of an arithmetic progression.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Insert arithmetic means between two numbers.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Apply the nth term formula.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate the sum of terms in an arithmetic progression.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000007","TOPIC_ID":"vm000007","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000007.jpg","PUBLIC_BANNER_IMG":"vm000007.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000007.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;To find the sum of all the n terms of an arithmetic progression, apply the formula for sum of n terms, Sn= (n \/ 2)(2 a + (n - 1) d). the arithmetic mean between two numbers a and b is (a + b) \/ 2 and if the sequence is a, A1, A2, A3, A4, b then A1, A2, A3, A4 are four arithmetic means between a and b.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define the term arithmetic progression.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Explain the properties of an arithmetic progression.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Insert arithmetic means between two numbers.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Apply the nth term formula.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Calculate the sum of terms in an arithmetic progression.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Sum of Arithmetic Progression","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"747","CATEGORY_ID":"1","CONT_TITLE":"Arithmetic Progressions","CONT_SLUG":"arithmetic-progressions","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAn arithmetic sequence is a sequence in which the successive terms have common differences. With the first term (a), common difference (d) and (n) number of terms, we can find the last term using the formula, a\u003Csub\u003En\u003C\/sub\u003E= a + (n - 1) d.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define arithmetic progression.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Recognise arithmetic progressions.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate the nth term of an arithmetic progression.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000006","TOPIC_ID":"vm000006","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000006.jpg","PUBLIC_BANNER_IMG":"vm000006.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000006.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;An arithmetic sequence is a sequence in which the successive terms have common differences. With the first term (a), common difference (d) and (n) number of terms, we can find the last term using the formula, a\u0026lt;sub style=\u0026quot;color: rgb(0, 77, 64); font-family: \u0026amp;quot;Open Sans\u0026amp;quot;, \u0026amp;quot;Lucida Sans\u0026amp;quot;, sans-serif; text-align: justify;\u0026quot;\u0026gt;n\u0026lt;span style=\u0026quot;font-size: 18px;\u0026quot;\u0026gt;\u0026amp;nbsp;\u0026lt;\/span\u0026gt;\u0026lt;\/sub\u0026gt;= a + (n - 1) d.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define arithmetic progression.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Recognise arithmetic progressions.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Calculate the nth term of an arithmetic progression.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Arithmetic progression","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"742","CATEGORY_ID":"1","CONT_TITLE":"Functions: Linear and Nonlinear","CONT_SLUG":"functions-linear-and-non-linear","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA linear function is a function whose graph is a line. Algebraically, a linear function can be defined as a polynomial with its highest exponent equal to 1 or a horizontal line. Similarly, a function whose graph is not a straight line is a nonlinear function. Algebraically, a nonlinear function is a polynomial with its highest power greater than 1.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify graphs of linear functions.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify graphs of nonlinear functions.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify linear functions through tables.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify nonlinear functions through tables.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000088","TOPIC_ID":"vm000088","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000088.jpg","PUBLIC_BANNER_IMG":"vm000088.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000088.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A linear function is a function whose graph is a line. Algebraically, a linear function can be defined as a polynomial with its highest exponent equal to 1 or a horizontal line. Similarly, a function whose graph is not a straight line is a nonlinear function. Algebraically, a nonlinear function is a polynomial with its highest power greater than 1.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify graphs of linear functions.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify graphs of nonlinear functions.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify linear functions through tables.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify nonlinear functions through tables.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Functions: Linear and Non-linear","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"740","CATEGORY_ID":"1","CONT_TITLE":"Scale Factors","CONT_SLUG":"scale-factor","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThe perimeter, area, and volume of objects that vary in size but not in shape are related to each other by a number called a scale factor. Scale factor calculations depend on the shape of the objects.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- State the scale factor for surface area, volume, and perimeter of an object.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate scale factors for objects that change dimensions.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000062","TOPIC_ID":"vm000062","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000062.jpg","PUBLIC_BANNER_IMG":"vm000062.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000062.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;The perimeter, area, and volume of objects that vary in size but not in shape are related to each other by a number called a scale factor. Scale factor calculations depend on the shape of the objects.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- State the scale factor for surface area, volume, and perimeter of an object.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Calculate scale factors for objects that change dimensions.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Scale Factors","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"739","CATEGORY_ID":"1","CONT_TITLE":"Slope","CONT_SLUG":"slope","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThe general equation of a straight line is y = mx + c, where m is the slope, and c is the value where the line cuts the y-axis. Slope is calculated as the ratio of rise\/run. Rise value is calculated as (y2 - y1) and run value as (x2 - x1).\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify the rise and run of a slope.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the slope of a line.\u003C\/div\u003E \r\n\u003Cdiv\u003E- State the slope of a vertical line and a horizontal line.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000051","TOPIC_ID":"vm000051","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000051.jpg","PUBLIC_BANNER_IMG":"vm000051.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000051.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;The general equation of a straight line is y = mx + c, where m is the slope, and c is the value where the line cuts the y-axis. Slope is calculated as the ratio of rise\/run. Rise value is calculated as (y2 - y1) and run value as (x2 - x1).\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify the rise and run of a slope.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the slope of a line.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- State the slope of a vertical line and a horizontal line.Overview:\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Slope","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"738","CATEGORY_ID":"1","CONT_TITLE":"Functions: Graphing","CONT_SLUG":"functions-graphing","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA set of points in a plane is said to be the graph of a function if and only if no vertical line intersects the graph at more than one point.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain the concept of mathematical functions.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Write the general expression of a function.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify the dependent and independent variables in a function.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Locate inputs and outputs on a function table.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Graph a function based on data in a function table.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000089","TOPIC_ID":"vm000089","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000089.jpg","PUBLIC_BANNER_IMG":"vm000089.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000089.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A set of points in a plane is said to be the graph of a function if and only if no vertical line intersects the graph at more than one point.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Explain the concept of mathematical functions.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Write the general expression of a function.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify the dependent and independent variables in a function.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Locate inputs and outputs on a function table.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Graph a function based on data in a function table.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Functions: Graphing","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"737","CATEGORY_ID":"1","CONT_TITLE":"Convert Between Systems","CONT_SLUG":"convert-between-system","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThere are two main systems for measuring length, weight, and capacity: the customary system and the metric system. The customary measurement system measures length in inches, feet, yards, and miles; capacity in cups, pints, quarts, and gallons; and weight in pounds, and tons. the metric system measures length in centimeters, meters, and kilometers; capacity in liters; and weight in grams and kilograms.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Convert units from customary to metric systems and vice versa.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Convert units within the customary system.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Convert units within the metric system.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000025","TOPIC_ID":"vm000025","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000025.jpg","PUBLIC_BANNER_IMG":"vm000025.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000025.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;There are two main systems for measuring length, weight, and capacity: the customary system and the metric system. The customary measurement system measures length in inches, feet, yards, and miles; capacity in cups, pints, quarts, and gallons; and weight in pounds, and tons. the metric system measures length in centimeters, meters, and kilometers; capacity in liters; and weight in grams and kilograms.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning objectives:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Convert units from customary to metric systems and vice versa.\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Convert units within the customary system.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Convert units within the metric system.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Convert between System","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"735","CATEGORY_ID":"1","CONT_TITLE":"Descriptive Statistics","CONT_SLUG":"descriptive-statistics","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EDescriptive statistics describe, show, or summarize a collected set of data in a meaningful way. Box-and-whisker plots are a common method of summarizing data. In box-and-whisker plots, the ends of the box are the upper and lower quartiles, the median is marked by a vertical line inside the box and the whiskers are the two lines outside the box that extend to the highest and lowest data points.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Display data graphically and interpret box plots.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Recognize, describe, and calculate the upper quartile, median, and lower quartile of a set of data.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000082","TOPIC_ID":"vm000082","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000082.jpg","PUBLIC_BANNER_IMG":"vm000082.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000082.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Descriptive statistics describe, show, or summarize a collected set of data in a meaningful way. Box-and-whisker plots are a common method of summarizing data. In box-and-whisker plots, the ends of the box are the upper and lower quartiles, the median is marked by a vertical line inside the box and the whiskers are the two lines outside the box that extend to the highest and lowest data points.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Display data graphically and interpret box plots.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Recognize, describe, and calculate the upper quartile, median, and lower quartile of a set of data.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Descriptive Statistics","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"732","CATEGORY_ID":"1","CONT_TITLE":"Linear Expressions: Addition","CONT_SLUG":"linear-expressions-addition","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA linear expression is an expression containing a variable that is only raised to the first power 1. To add linear expressions, combine like terms. For example: To add 2x + 2 and 4x + 5, add 2x and 4x which produces 6x. Then add the constant terms 2 + 5 = 7. The result can be written as 6x + 7.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define linear expression.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Add linear expressions.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000042","TOPIC_ID":"vm000042","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000042.jpg","PUBLIC_BANNER_IMG":"vm000042.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000042.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A linear expression is an expression containing a variable that is only raised to the first power 1. To add linear expressions, combine like terms. For example: To add 2x + 2 and 4x + 5, add 2x and 4x which produces 6x. Then add the constant terms 2 + 5 = 7. The result can be written as 6x + 7.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define linear expression.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Add linear expressions.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Linear Expressions :Addition","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"730","CATEGORY_ID":"1","CONT_TITLE":"Scientific Notation","CONT_SLUG":"scientific-notation","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EScientific notation is the way to express very large numbers or very small numbers. For example, the very small number 0.0000000056, can be written 5.6 x 10^(-9). the very larg number 259000000000 can be written as 2.59 x 10^(11).\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objective:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Express numbers in scientific and decimal notation.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000040","TOPIC_ID":"vm000040","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000040.jpg","PUBLIC_BANNER_IMG":"vm000040.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000040.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Scientific notation is the way to express very large numbers or very small numbers. For example, the very small number 0.0000000056, can be written 5.6 x 10^(-9). the very larg number 259000000000 can be written as 2.59 x 10^(11).\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objective:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Express numbers in scientific and decimal notation.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Scientific Notation","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"729","CATEGORY_ID":"1","CONT_TITLE":"Slope and Similar Triangles","CONT_SLUG":"slope-and-similar-triangles","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThe slope or steepness of a non-vertical line is the same between any two points along that line.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EIf we draw a right triangle using two points on any line and then draw another right triangle using two other points on the same line, the triangles formed will be similar to each other because the slope of the line remains same at all of the points.The ratio of the corresponding sides of similar triangles remains equal.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the slope of a straight line.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the slope of a straight line using similar triangles.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Use similar triangles to determine if a line is straight or sloped.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000052","TOPIC_ID":"vm000052","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000052.jpg","PUBLIC_BANNER_IMG":"vm000052.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000052.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;The slope or steepness of a non-vertical line is the same between any two points along that line.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;If we draw a right triangle using two points on any line and then draw another right triangle using two other points on the same line, the triangles formed will be similar to each other because the slope of the line remains same at all of the points.The ratio of the corresponding sides of similar triangles remains equal.\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning objectives:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the slope of a straight line.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the slope of a straight line using similar triangles.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Use similar triangles to determine if a line is straight or sloped.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Slope and Similar Triangles","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"728","CATEGORY_ID":"1","CONT_TITLE":"Distance Between Two Parallel Lines","CONT_SLUG":"distance-between-two-parallel-lines","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThe distance between two parallel lines is the length of the perpendicular segment between them. It doesn\u0026#039;t matter which perpendicular line is selected, because all the perpendicular lines have the same length. The distance between two parallel lines can be calculated by using the distance formula D= |c1 - c2I \/ (\u221a1 + m\u00b2) where c1 and c2 are the y-intercepts and m is the slope of two parallel lines.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the distance between two parallel lines, given two points.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the distance between two parallel lines, given their slope intercept form.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000054","TOPIC_ID":"vm000054","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000054.jpg","PUBLIC_BANNER_IMG":"vm000054.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000054.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;The distance between two parallel lines is the length of the perpendicular segment between them. It doesn\u0026#039;t matter which perpendicular line is selected, because all the perpendicular lines have the same length. The distance between two parallel lines can be calculated by using the distance formula D= |c1 - c2I \/ (\u221a1 + m\u00b2) where c1 and c2 are the y-intercepts and m is the slope of two parallel lines.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the distance between two parallel lines, given two points.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the distance between two parallel lines, given their slope intercept form.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Distance between Two Parallel Lines","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"573","CATEGORY_ID":"1","CONT_TITLE":"Volumes of Similar Solids","CONT_SLUG":"volume-of-similar-solids-1","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003ETwo solids are similar if they are the same type of solid and their corresponding radii, heights, base lengths, widths, etc. are proportional. If two solids are similar with a scale factor of (a\/b), then their volumes are in the ratio of (a\/b)\u00b3.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Derive the volume scale factor to calculate the unknown volume of similar solids.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Implement the concept of the volume scale factor to calculate the unknown volume of similar solids in real life situations.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300140","TOPIC_ID":"ms300140","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_file_844782869_1526979019.jpg","PUBLIC_BANNER_IMG":"ms300140.jpg","PUBLIC_VIDEO":"pvideo_ms300140.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/SwHkWBnmc7k","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;h3\u0026gt;Overview:\u0026lt;\/h3\u0026gt;\u0026lt;br\u0026gt;Two solids are similar if they are the same type of solid and their corresponding radii, heights, base lengths, widths, etc. are proportional. If two solids are similar with a scale factor of (a\/b), then their volumes are in the ratio of (a\/b)\u00b3.\u0026lt;br\u0026gt;\u0026lt;h3\u0026gt;\r\nLearning objectives\u0026lt;\/h3\u0026gt;\u0026lt;br\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Derive the volume scale factor to calculate the unknown volume of similar solids.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Implement the concept of the volume scale factor to calculate the unknown volume of similar solids in real life situations.\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Volumes of Similar Solids","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"566","CATEGORY_ID":"1","CONT_TITLE":"Mid Point Formula in 3D","CONT_SLUG":"mid-point-formula-in-three-dimension","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA midpoint is the exact center point between two defined points. To find this center point, midpoint formula is applied. In 3-dimensional space, the midpoint between (x1, y1, z1) and (x2, y2, z1) is (x1+x2 )\/2,(y1+y2 )\/2,(z1+z2 )\/2.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain the midpoint formula in 3-dimensions.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Apply the midpoint formula to find the position of a point or an object in the middle of two points or objects.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300323","TOPIC_ID":"ss300323","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300323.jpg","PUBLIC_BANNER_IMG":"SS300323.jpg","PUBLIC_VIDEO":"pvideo_ss300323.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/Wa0WFljDdC4","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"Overview:\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;A midpoint is the exact center point between two defined points. To find this center point, midpoint formula is applied. In 3-dimensional space, the midpoint between (x1, y1, z1) and (x2, y2, z1) is (x1+x2 )\/2,(y1+y2 )\/2,(z1+z2 )\/2.\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;Learning objectives\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Explain the midpoint formula in 3-dimensions.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Apply the midpoint formula to find the position of a point or an object in the middle of two points or objects.\u0026lt;\/div\u0026gt;\u0026lt;br\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Mid-point Formula in Three Dimension","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"565","CATEGORY_ID":"1","CONT_TITLE":"Minimum Spanning Tree","CONT_SLUG":"minimum-spanning-tree","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA minimum spanning tree (MST) or minimum weight spanning tree is a subset of the edges of a connected, edge-weighted undirected graph. It connects all the vertices together, without any cycles and with the minimum possible total edge weight.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define a tree.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain a minimum spanning tree.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.hs300235","TOPIC_ID":"hs300235","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300235.jpg","PUBLIC_BANNER_IMG":"HS300235.jpg","PUBLIC_VIDEO":"pvideo_hs300235.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/3ozYbeB3LmA","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"Overview:\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;A minimum spanning tree (MST) or minimum weight spanning tree is a subset of the edges of a connected, edge-weighted undirected graph. It connects all the vertices together, without any cycles and with the minimum possible total edge weight.\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;Learning objectives\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Define a tree.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Explain a minimum spanning tree.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Minimum Spanning Tree","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"559","CATEGORY_ID":"1","CONT_TITLE":"Distance on a Number Line","CONT_SLUG":"distance-on-a-number-line","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EIn this topic, we will determine the distance between integers by examining absolute value and number lines. For example, the absolute value of \u22123 is written |\u22123| which equals 3. Therefore, the distance of -3 from 0 is 3.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to: \u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain number line. \u003C\/div\u003E \r\n\u003Cdiv\u003E- Perform addition and subtraction on number line. \u003C\/div\u003E \r\n\u003Cdiv\u003E- Find distance on number line.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300388","TOPIC_ID":"ms300388","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300388.jpg","PUBLIC_BANNER_IMG":"MS300388.jpg","PUBLIC_VIDEO":"pvideo_ms300388.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/E4nrqAAhXD8","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"Overview:\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;In this topic, we will determine the distance between integers by examining absolute value and number lines. For example, the absolute value of \u22123 is written |\u22123| which equals 3. Therefore, the distance of -3 from 0 is 3.\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;Learning objectives\u0026lt;br\u0026gt;\u0026amp;nbsp;\u0026lt;br\u0026gt;After completing this module, you will be able to:\u0026lt;br\u0026gt;\u0026amp;nbsp;- Explain number line.\u0026lt;br\u0026gt;\u0026amp;nbsp;- Perform addition and subtraction on number line.\u0026lt;br\u0026gt;\u0026amp;nbsp;- Find distance on number line.\u0026lt;br\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Distance on a Number Line","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"552","CATEGORY_ID":"1","CONT_TITLE":"Pictogram","CONT_SLUG":"pictogram","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA pictogram is a graph that uses pictures to represent data. The method of creating pictograms is same as that of bar graphs, but instead of bars of the bar graph we use pictures in the pictogram to show the numbers.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define a pictogram.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Create a pictogram by collecting data and using pictures.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Read and interpret data on a pictogram.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300191","TOPIC_ID":"ms300191","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300191.jpg","PUBLIC_BANNER_IMG":"MS300191.jpg","PUBLIC_VIDEO":"pvideo_ms300191.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/pjvFMawGX_Q","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"Overview:\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;A pictogram is a graph that uses pictures to represent data. The method of creating pictograms is same as that of bar graphs, but instead of bars of the bar graph we use pictures in the pictogram to show the numbers.\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;Learning objectives\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;After completing this module, you will be able to:\u0026lt;br\u0026gt;\u0026lt;div\u0026gt;- Define a pictogram.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Create a pictogram by collecting data and using pictures.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Read and interpret data on a pictogram.\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Pictogram","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"549","CATEGORY_ID":"1","CONT_TITLE":"Surface Area of Similar Solids","CONT_SLUG":"surface-area-of-similar-solids","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003ETwo solids are similar if they are the same type of solid and their corresponding radii, heights, base lengths, widths, etc. are proportional. When two shapes are similar, the ratio of their areas is the square of the scale factor.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Derive the scale factor of the surface area for calculating the unknown surface areas of similar solids.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Apply the scale factor in calculating the unknown surface areas of similar solids.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":"ms300180.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300180","TOPIC_ID":"ms300180","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300180.jpg","PUBLIC_BANNER_IMG":"MS300180.jpg","PUBLIC_VIDEO":"pvideo_ms300180.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/9_FLcWDJPwA","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;\u0026lt;span style=\u0026quot;color: rgb(0, 0, 0); font-family: Arial; white-space: pre-wrap;\u0026quot;\u0026gt;Overview:\u0026lt;\/span\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Two solids are similar if they are the same type of solid and their corresponding radii, heights, base lengths, widths, etc. are proportional. When two shapes are similar, the ratio of their areas is the square of the scale factor.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives:\u0026lt;\/p\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Derive the scale factor of the surface area for calculating the unknown surface areas of similar solids.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Apply the scale factor in calculating the unknown surface areas of similar solids.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Surface Area of Similar Solids","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"543","CATEGORY_ID":"1","CONT_TITLE":"Sales Tax and Total Cost","CONT_SLUG":"sales-tax-and-total-cost","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA sales tax is the money paid to the government, by the service provider, for the sales of certain goods and services. This can be calculated by using the formula: Sales tax = tax rate \u00d7 total cost and, the total cost inclusive of sales tax is calculated by using the formula. Total price (inclusive of sales tax) = total cost + sales tax.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to: \u003C\/div\u003E \r\n\u003Cdiv\u003E- Define sales tax. \u003C\/div\u003E \r\n\u003Cdiv\u003E- Relate total cost to sales tax. \u003C\/div\u003E \r\n\u003Cdiv\u003E- Apply formula for sales tax. \u003C\/div\u003E \r\n\u003Cdiv\u003E- Find total price (inclusive of sales tax) of goods and services.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300148","TOPIC_ID":"ms300148","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300148.jpg","PUBLIC_BANNER_IMG":"MS300148.jpg","PUBLIC_VIDEO":"pvideo_ms300148.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/VFcXdS-PB6w","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"Overview:\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;A sales tax is the money paid to the government, by the service provider, for the sales of certain goods and services. This can be calculated by using the formula: Sales tax = tax rate \u00d7 total cost and, the total cost inclusive of sales tax is calculated by using the formula. Total\u0026amp;nbsp; price (inclusive of sales tax) = total\u0026amp;nbsp; cost + sales tax.\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;Learning objectives\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;After completing this module, you will be able to:\u0026lt;br\u0026gt;\u0026amp;nbsp;- Define sales tax.\u0026lt;br\u0026gt;\u0026amp;nbsp;- Relate total cost to sales tax.\u0026lt;br\u0026gt;\u0026amp;nbsp;- Apply formula for sales tax.\u0026lt;br\u0026gt;\u0026amp;nbsp;- Find total price (inclusive of sales tax) of goods and services.\u0026lt;br\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Sales Tax and Total Cost","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"535","CATEGORY_ID":"1","CONT_TITLE":"Solving Two Step Inequalities","CONT_SLUG":"solve-two-step-inequality","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAn inequality is a sentence built from expressions using one or more of the symbols \r\n\u003C,\u003E, \u2264, or \u2265. Two step inequalities means the system of inequalities which can be solved only in two steps.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Solve inequalities in two steps.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300133","TOPIC_ID":"ss300133","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300133.jpg","PUBLIC_BANNER_IMG":"SS300133.jpg","PUBLIC_VIDEO":"pvideo_ss300133.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/bdkNNR5Anr4","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;An inequality is a sentence built from expressions using one or more of the symbols \u0026amp;lt;, \u0026amp;gt;, \u2264, or \u2265. Two step inequalities means the system of inequalities which can be solved only in two steps.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objective\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Solve inequalities in two steps.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Solve Two Step Inequality","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"401","CATEGORY_ID":"1","CONT_TITLE":"Indirect Variation","CONT_SLUG":"indirect-variation","CONT_TITLE_AR":"Indirect Variation","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EIndirect variation is a relationship between two variables in which the product remains constant. When one variable increases the other decreases in proportion, so that the product does not change. If we say, b is inversely proportional to a, the equation is of the form b = k\/a (where k is a constant).\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to: \u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain the concept of variation.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Recognize indirect variation.\u003C\/div\u003E","CONT_DESC_AR":"Indirect variation is a relationship between two variables in which the product is a constant. When one variable increases the other decreases in proportion so that the product is unchanged. If b is inversely proportional to a, the equation is of the form b = k\/a (where k is a constant)\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\nIn this simulation, you will be able to :\u0026lt;br \/\u0026gt;\n- explain the concept of variation\u0026lt;br \/\u0026gt;\n- recognize indirect variation","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300119","TOPIC_ID":"ms300119","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300119.jpg","PUBLIC_BANNER_IMG":"MS300119.jpg","PUBLIC_VIDEO":"pvideo_ms300119.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/EzfNho0ncaw","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;h3\u0026gt;Overview:\u0026lt;\/h3\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Indirect variation is a relationship between two variables in which the product remains constant. When one variable increases the other decreases in proportion, so that the product does not change. If we say, b is inversely proportional to a, the equation is of the form b = k\/a (where k is a constant).\u0026lt;\/div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;h3\u0026gt;Learning Objectives:\u0026lt;br\u0026gt;\u0026lt;\/h3\u0026gt;\u0026lt;br\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Explain the concept of variation.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Recognize indirect variation.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Indirect Variation","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"379","CATEGORY_ID":"1","CONT_TITLE":"Introduction to the Integral","CONT_SLUG":"introduction-to-the-integral","CONT_TITLE_AR":"Introduction to the Integral","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAdding slices of infinitely small width leads us to find the whole. This method is called the limit of sum, which is the basic principle behind integration. Integration can be used to find areas, volumes, central points and many useful things. This module will describe the method of finding the area under a curve, using integration.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define the definite integral as the limit of a sum.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Use definite integrals to find the area between a curve and the x-axis.\u003C\/div\u003E","CONT_DESC_AR":"Integration can be used to find areas, volumes, central points and many useful things.But it is easiest to start with finding the area under the curve of a function.\u003C\/br\u003E\u003C\/br\u003E\r\n\u003Cstrong\u003ELearning Objectives\u003C\/strong\u003E\u003C\/br\u003E\u003C\/br\u003E\r\nIn this topic, you will be able to:\u003C\/br\u003E\r\n\u2022 define the definite integral as the limit of a sum\u003C\/br\u003E\r\n\u2022 use definite integrals to find the area between a curve and the x-axis","BACKING_FILE":"ss300015.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300015","TOPIC_ID":"ss300015","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300015.jpg","PUBLIC_BANNER_IMG":"SS300015.jpg","PUBLIC_VIDEO":"pvideo_ss300015.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/kojlvAWPJTk","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Adding slices of infinitely small width leads us to find the whole. This method is called the limit of sum, which is the basic principle behind integration. Integration can be used to find areas, volumes, central points and many useful things. This module will describe the method of finding the area under a curve, using integration.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Define the definite integral as the limit of a sum.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Use definite integrals to find the area between a curve and the x-axis.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Introduction to the Integral","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"335","CATEGORY_ID":"1","CONT_TITLE":"Factorial and Permutation","CONT_SLUG":"factorial-permutations","CONT_TITLE_AR":"Factorial \u0026 Permutations","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EPermutation is defined as the method of finding number of ways in which some or all members of a set can be arranged in different orders.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify permutations.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Apply permutations in real life.\u003C\/div\u003E","CONT_DESC_AR":"The notion of permutation relates to the act of arranging all the members of a set into some sequence or order, or if the set is already ordered, rearranging (reordering) its elements, a process called permutation.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\nAt the end of this simulation you will be able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; identify permutations\u0026lt;br \/\u0026gt;\n\u0026amp;bull; apply the permutation in real life","BACKING_FILE":"ss300006.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300006","TOPIC_ID":"ss300006","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300006.jpg","PUBLIC_BANNER_IMG":"ss300006.jpg","PUBLIC_VIDEO":"pvideo_ss300006.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/NWbjIGWhcfk","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Permutation is defined as the method of finding number of ways in which some or all members of a set can be arranged in different orders.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify permutations.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Apply permutations in real life.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Factorial \u0026 Permutation","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"334","CATEGORY_ID":"1","CONT_TITLE":"Volume and Surface Area of Frustum","CONT_SLUG":"volume-and-surface-area-of-frustum","CONT_TITLE_AR":"Volume and Surface Area of Frustum","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThe portion of a cone which remains after its upper part has been cut off by a plane parallel to its base is known as frustum of a cone. In this module, we will learn about the method of finding curved surface area, total surface area and volume of frustum.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Derive the formula for the curved surface area of a frustum.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Derive the formula for the total surface area of a frustum.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Derive the formula for the volume of a frustum.\u003C\/div\u003E","CONT_DESC_AR":"The portion of a cone or pyramid which remains after its upper part has been cut off by a plane parallel to its base, or which is intercepted between two such planes.\r\nIn this topic we will find the curved surface area, total surface area and volume of frustum.\u003Cbr \/\u003E\u003Cbr \/\u003E\r\n\u003Cstrong\u003ELearning Objectives:\u003C\/strong\u003E\u003Cbr \/\u003E\u003Cbr \/\u003E\r\nIn this topic you will be able to\u003Cbr \/\u003E\r\n- identify and formulate curved surface area of a frustum\u003Cbr \/\u003E\r\n- identify and formulate total surface area of a frustum\u003Cbr \/\u003E\r\n- identify and formulate the volume of a frustum","BACKING_FILE":"hs300022.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.hs300022","TOPIC_ID":"hs300022","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300022.jpg","PUBLIC_BANNER_IMG":"hs300022.jpg","PUBLIC_VIDEO":"pvideo_hs300022.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/9ttN4dy1iC0","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;The portion of a cone which remains after its upper part has been cut off by a plane parallel to its base is known as frustum of a cone. In this module, we will learn about the method of finding curved surface area, total surface area and volume of frustum.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Derive the formula for the curved surface area of a frustum.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Derive the formula for the total surface area of a frustum.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Derive the formula for the volume of a frustum.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Volume and Surface Area of Frustum","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"288","CATEGORY_ID":"1","CONT_TITLE":"Combinations","CONT_SLUG":"combinations","CONT_TITLE_AR":"Combinations","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA collection of objects, irrespective of their order is called a combination.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain combination.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Apply combination in real life.\u003C\/div\u003E","CONT_DESC_AR":"A combination is a way of selecting several things out of a larger group, where order does not matter.\u003C\/br\u003E\u003C\/br\u003E\r\n\u003Cstrong\u003ELearning Objectives\u003C\/strong\u003E\u003C\/br\u003E\u003C\/br\u003E\r\nIn this topic you will be able to:\u003C\/br\u003E\r\n- explain combinations\u003C\/br\u003E\r\n- apply combinations in real life","BACKING_FILE":"ss300068.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300068","TOPIC_ID":"ss300068","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300068.jpg","PUBLIC_BANNER_IMG":"SS300068.jpg","PUBLIC_VIDEO":"pvideo_ss300068.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/-12-sE3Wwck","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A collection of objects, irrespective of their order is called a combination.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Explain combination.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Apply combination in real life.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Combinations","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"278","CATEGORY_ID":"1","CONT_TITLE":"Introduction to Complex Numbers","CONT_SLUG":"introduction-to-complex-numbers","CONT_TITLE_AR":"Introduction to Complex Numbers","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA complex number is defined as the combination of real and an imaginary number that can be expressed in the form a + bi, where a and b are real numbers and i is the imaginary unit, satisfying the equation i^2 = \u22121. In this expression, a is the real part and b is the imaginary part of the complex number.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define complex numbers.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the conjugate and the multiplicative inverse of a complex number.\u003C\/div\u003E","CONT_DESC_AR":"A complex number is a number that can be expressed in the form a + bi, where a and b are real numbers and i is the imaginary unit, satisfying the equation i^2 = \u0026amp;minus;1.\u0026lt;br \/\u0026gt;\nIn this expression, a is the real part and b is the imaginary part of the complex number.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\nAt the end of this simulation, you will able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; explain the concept of complex numbers\u0026lt;br \/\u0026gt;\n\u0026amp;bull; find the conjugate and multiplicative inverse of a complex number","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.hs300012","TOPIC_ID":"hs300012","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300012.jpg","PUBLIC_BANNER_IMG":"HS300012.jpg","PUBLIC_VIDEO":"pvideo_hs300012.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/t2ti-mqDNXU","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A complex number is defined as the combination of real and an imaginary number that can be expressed in the form a + bi, where a and b are real numbers and i is the imaginary unit, satisfying the equation i^2 = \u22121. In this expression, a is the real part and b is the imaginary part of the complex number.\u0026amp;nbsp;\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Define complex numbers.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Find the conjugate and the multiplicative inverse of a complex number.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Introduction to Complex Numbers","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"274","CATEGORY_ID":"1","CONT_TITLE":"Division of Polynomials","CONT_SLUG":"division-of-polynomials-synthetic","CONT_TITLE_AR":"Division of Polynomials (synthetic)","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003ESynthetic division is a shortcut method of dividing a polynomial by another polynomial. To divide a polynomial by using synthetic division, we divide a linear expression by the leading coefficient (first number) that must be a 1. For example, you can use synthetic division to divide by x + 3 or x \u2013 6, but you cannot use synthetic division to divide by x\u00b2 + 2 or 3x\u00b2 \u2013 x + 7.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Solve the division of polynomials using the synthetic method.\u003C\/div\u003E","CONT_DESC_AR":"Synthetic division is shorthand, or a shortcut, method of polynomial division in the special case of dividing by a linear factor, and it only works in this case.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objective\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\nIn this topic you will be able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; solve division of polynomials by the synthetic method","BACKING_FILE":"ss300059.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300059","TOPIC_ID":"ss300059","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300059.jpg","PUBLIC_BANNER_IMG":"SS300059.jpg","PUBLIC_VIDEO":"pvideo_ss300059.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/ODtQToJDKFQ","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Synthetic division is a shortcut method of dividing a polynomial by another polynomial. To divide a polynomial by using synthetic division, we divide a linear expression by the leading coefficient (first number) that must be a 1. For example, you can use synthetic division to divide by x + 3 or x \u2013 6, but you cannot use synthetic division to divide by x\u00b2 + 2 or 3x\u00b2 \u2013 x + 7.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Solve the division of polynomials using the synthetic method.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Division of Polynomials","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"271","CATEGORY_ID":"1","CONT_TITLE":"Composite Functions","CONT_SLUG":"composite-functions","CONT_TITLE_AR":"Composite Functions","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EFunction Composition is the applying of one function to the results of another.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003E(g \u00ba f)(x) = g(f(x)),\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EFor representing this, we substitute f(x) in place of x in g(x) and the resultant function is composite function. Some functions can be decomposed into two (or more) simpler functions.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify the composition of two functions.\u003C\/div\u003E","CONT_DESC_AR":"Function Composition is applying one function to the results of another. (g \u0026amp;ordm; f)(x) = g(f(x)),\u0026lt;br \/\u0026gt;\nFor representing this , we substitute f(x) in place of x in g(x) and the resultant function is composite function.\u0026lt;br \/\u0026gt;\nSome functions can be de-composed into two (or more) simpler functions.\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objective\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\nIn this simulation, you will be able to:\u0026lt;br \/\u0026gt;\n- identify the composition of two functions","BACKING_FILE":"ss300048.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300048","TOPIC_ID":"ss300048","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300048.jpg","PUBLIC_BANNER_IMG":"SS300048.jpg","PUBLIC_VIDEO":"pvideo_ss300048.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/ZXaDs07rbYE","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;Function Composition is the applying of one function to the results of another.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;(g \u00ba f)(x) = g(f(x)),\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;For representing this, we substitute f(x) in place of x in g(x) and the resultant function is composite function. Some functions can be decomposed into two (or more) simpler functions.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify the composition of two functions.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Composite Functions","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"256","CATEGORY_ID":"1","CONT_TITLE":"Solving a System of Equations Using the Matrix Method","CONT_SLUG":"solving-system-of-equations-by-matrix-method","CONT_TITLE_AR":"Solving System of Equations by Matrix Method","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EWe are already familiar with the method of solving system of equations in two variables. But what if we have system of equations with three variables. In such situations, matrix method is the easiest method to get the value of variables. In this method, we have a variable matrix (X), a coefficient matrix (A) and a constant matrix (B). The matrix equation used to get the value of variable is X=A-1B.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain the concept of solving a system of equations by the matrix method.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain this method in relatable terms.\u003C\/div\u003E","CONT_DESC_AR":"The Matrix Solution.\u003C\/br\u003E\r\nThis states that we can find the values of x, y and z (the X matrix) by multiplying the inverse of the A matrix by the B matrix. First, we need to find the inverse of the A matrix.\u003C\/br\u003E\u003C\/br\u003E\r\n\u003Cstrong\u003ELearning Objectives\u003C\/strong\u003E\u003C\/br\u003E\u003C\/br\u003E\r\nIn this simulation, you will be able to:\u003C\/br\u003E\r\n\u2022 know the concept of solving system of equations by matrix method\u003C\/br\u003E\r\n\u2022 explain it in real life terms","BACKING_FILE":"ss300078.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300078","TOPIC_ID":"ss300078","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300078.jpg","PUBLIC_BANNER_IMG":"SS300078.jpg","PUBLIC_VIDEO":"pvideo_ss300078.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/uLyaKm4YSIQ","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"6","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;We are already familiar with the method of solving system of equations in two variables. But what if we have system of equations with three variables. In such situations, matrix method is the easiest method to get the value of variables. In this method, we have a variable matrix (X), a coefficient matrix (A) and a constant matrix (B). The matrix equation used to get the value of variable is X=A-1B.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives:\u0026lt;\/p\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Explain the concept of solving a system of equations by the matrix method.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Explain this method in relatable terms.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Solving System of Equations by Matrix Method","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"Higher Education"},{"CONT_ID":"252","CATEGORY_ID":"1","CONT_TITLE":"Terminating and Repeating Decimals","CONT_SLUG":"terminating-and-repeating-decimals","CONT_TITLE_AR":"Terminating and Repeating Decimals","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAny rational number that is actually a fraction in lowest terms can be written as either a terminating decimal or a repeating decimal. A decimal which can be expressed in a finite number of digits is known as terminating decimal while on the other hand, a decimal which does not end in finite number of digits but has repeated number of digits is known as non-terminating and repeating decimal.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explore terminating and repeating decimals.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Differentiate between terminating and repeating decimals.\u003C\/div\u003E","CONT_DESC_AR":"Any rational number (that is, a fraction in lowest terms) can be written as either a\u0026amp;nbsp;terminating decimal\u0026amp;nbsp;or a\u0026amp;nbsp;repeating decimal\u0026amp;nbsp;. Just divide the numerator by the denominator . If you end up with a remainder of 0 , then you have a\u0026amp;nbsp;terminating decimal.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\nAt the end of this simulation you will able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; differentiate between terminating and repeating decimals\u0026lt;br \/\u0026gt;\n\u0026amp;bull; explore terminating and repeating decimals","BACKING_FILE":"hs300075.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.hs300075","TOPIC_ID":"hs300075","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300075.jpg","PUBLIC_BANNER_IMG":"HS300075.jpg","PUBLIC_VIDEO":"pvideo_hs300075.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/18iBNHpp1uY","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Any rational number that is actually a fraction in lowest terms can be written as either a terminating decimal or a repeating decimal. A decimal which can be expressed in a finite number of digits is known as terminating decimal while on the other hand, a decimal which does not end in finite number of digits but has repeated number of digits is known as non-terminating and repeating decimal.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Explore terminating and repeating decimals.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Differentiate between terminating and repeating decimals.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Terminating and Repeating Decimals","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"248","CATEGORY_ID":"1","CONT_TITLE":"Hyperbola","CONT_SLUG":"hyperbola","CONT_TITLE_AR":"Hyperbola","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA hyperbola is a type of smooth curve that has two pieces, called connected components or branches, that are mirror images of each other and resemble two infinite bows. The hyperbola is one of the three kinds of conic section, formed by the intersection of a plane and a double cone.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the center, vertices, and foci of a hyperbola.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the equation of the hyperbola from the given information.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify different types of hyperbolae.\u003C\/div\u003E","CONT_DESC_AR":"A hyperbola is a type of smooth curve that has two pieces, called connected components or branches, that are mirror images of each other and resemble two infinite\u0026amp;nbsp;bows. The hyperbola is one of the three kinds of conic section, formed by the intersection of a plane and a double cone.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\nAt the end of this simulation you will be able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; find the centre, vertices, foci and end points of the conjugate axis\u0026lt;br \/\u0026gt;\n\u0026amp;bull; find the aymptote of a hyperbola\u0026lt;br \/\u0026gt;\n\u0026amp;bull; sketch the graph of a hyperbola\u0026lt;br \/\u0026gt;\n\u0026amp;bull; find the equation of a hyperbola from given information","BACKING_FILE":"ss300072.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300072","TOPIC_ID":"ss300072","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300072.jpg","PUBLIC_BANNER_IMG":"SS300072.jpg","PUBLIC_VIDEO":"pvideo_ss300072.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/BsSd5OSGhsw","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A hyperbola\u0026amp;nbsp; is a type of smooth curve that has two pieces, called connected components or branches, that are mirror images of each other and resemble two infinite bows. The hyperbola is one of the three kinds of conic section, formed by the intersection of a plane and a double cone.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;span style=\u0026quot;font-size: 13px;\u0026quot;\u0026gt;After completing this module, you will be able to:\u0026lt;\/span\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;span style=\u0026quot;font-size: 13px;\u0026quot;\u0026gt;- Find the center, vertices, and foci of a hyperbola.\u0026lt;\/span\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;span style=\u0026quot;font-size: 13px;\u0026quot;\u0026gt;- Find the equation of the hyperbola from the given information.\u0026lt;\/span\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;span style=\u0026quot;font-size: 13px;\u0026quot;\u0026gt;- Identify different types of hyperbolae.\u0026lt;\/span\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Hyperbola","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"244","CATEGORY_ID":"1","CONT_TITLE":"Ellipse","CONT_SLUG":"ellipse","CONT_TITLE_AR":"Ellipse","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA regular oval shape, traced by a point moving in a plane so that the sum of its distances from two other points (the foci) is constant, or resulting when a cone is cut by an oblique plane which does not intersect the base. A circle is a \u0026quot;special case\u0026quot; of an ellipse where both foci are at the same point (the center).\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the center, vertices, foci, and co-vertices.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Sketch the graph of an ellipse.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the equation of an ellipse from the given information.\u003C\/div\u003E","CONT_DESC_AR":"A regular oval shape, traced by a point moving in a plane so that the sum of its distances from two other points (the foci) is constant, or resulting when a cone is cut by an oblique plane which does not intersect the base.\u0026lt;br \/\u0026gt;\nA\u0026amp;nbsp;circle\u0026amp;nbsp;is a \u0026amp;quot;special case\u0026amp;quot; of an\u0026amp;nbsp;ellipse where both foci are at the same point (the center).\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\nIn this simulation you will be able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; find the center, vertices, foci, and endpoints of the \u0026amp;nbsp;\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;conjugate axis\u0026lt;br \/\u0026gt;\n\u0026amp;bull; sketch the graph of the ellipse\u0026lt;br \/\u0026gt;\n\u0026amp;bull; find the equation of a ellipse from given information","BACKING_FILE":"ss300071.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300071","TOPIC_ID":"ss300071","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300071.jpg","PUBLIC_BANNER_IMG":"SS300071.jpg","PUBLIC_VIDEO":"pvideo_ss300071.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/Oy-vC0_2ZFY","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A regular oval shape, traced by a point moving in a plane so that the sum of its distances from two other points (the foci) is constant, or resulting when a cone is cut by an oblique plane which does not intersect the base. A circle is a \u0026quot;special case\u0026quot; of an ellipse where both foci are at the same point (the center).\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Find the center, vertices, foci, and co-vertices.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Sketch the graph of an ellipse.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Find the equation of an ellipse from the given information.\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Ellipse","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"238","CATEGORY_ID":"1","CONT_TITLE":"Volume and Surface Area of a Cube and Cuboid","CONT_SLUG":"volume-and-surface-area-of-cube-and-cuboid","CONT_TITLE_AR":"Volume and Surface Area of Cube and Cuboid","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA cube is a solid object with six square surfaces which are all the same size while a cuboid is a solid shape with six rectangular surfaces. The total surface area of both cube and cuboid can be calculated by adding the areas of all the six faces. Their lateral surface area is calculated by adding the areas of four walls only. The volume of a cuboid is the product of its dimensions.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate the surface area of a cuboid and cube.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate the volume of a cuboid and cube.\u003C\/div\u003E","CONT_DESC_AR":"If l, b and h are the length, breadth and height of a cuboid respectively, then Total surface area = 2(lb + bh + lh) and Volume = lbh\r\nIf  \u0027a\u0027 is the length of the edge of a cube, then\r\nTotal surface area = 6a2 and Volume = a3\u003C\/br\u003E\u003C\/br\u003E\r\n\u003Cstrong\u003ELearning Objectives \u003C\/strong\u003E\u003C\/br\u003E\u003C\/br\u003E\r\nIn this topic you will be able to:\u003C\/br\u003E\r\n\u2022 compute the surface area of a cuboid and cube\u003C\/br\u003E\r\n\u2022 compute the volume of a cuboid and cube","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.hs300024","TOPIC_ID":"hs300024","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300024.jpg","PUBLIC_BANNER_IMG":"hs300024.jpg","PUBLIC_VIDEO":"pvideo_hs300024.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/idAy4P0XYQ8","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A cube is a solid object with six square surfaces which are all the same size while a cuboid is a solid shape with six rectangular surfaces. The total surface area of both cube and cuboid can be calculated by adding the areas of all the six faces. Their lateral surface area is calculated by adding the areas of four walls only. The volume of a cuboid is the product of its dimensions.\u0026amp;nbsp;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Calculate the surface area of a cuboid and cube.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Calculate the volume of a cuboid and cube.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Volume and Surface Area of Cube and Cuboid","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"221","CATEGORY_ID":"1","CONT_TITLE":"Lines","CONT_SLUG":"lines","CONT_TITLE_AR":"Lines","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA line is defined as a line of points that extend infinitely in two directions. A part of a line that is bounded by two distinct end points is defined as line segment. A ray is defined as a line with one endpoint.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define intersecting lines.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define parallel lines.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define a point.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define rays and line segments.\u003C\/div\u003E","CONT_DESC_AR":"A line is defined as a line of points that extends infinitely in two directions. It has one dimension, length. Points that are on the same line are called collinear points\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\nIn this topic, you will be able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; explore intersecting lines\u0026lt;br \/\u0026gt;\n\u0026amp;bull; explore parallel lines\u0026lt;br \/\u0026gt;\n\u0026amp;bull; explore what a point is\u0026lt;br \/\u0026gt;\n\u0026amp;bull; explore rays and line segments","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300045","TOPIC_ID":"ms300045","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300045.jpg","PUBLIC_BANNER_IMG":"MS300045.jpg","PUBLIC_VIDEO":"pvideo_ms300045.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/qsCqLjwf7P8","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A line is defined as a line of points that extend infinitely in two directions. A part of a line that is bounded by two distinct end points is defined as line segment. A ray is defined as a line with one endpoint.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Define intersecting lines.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Define parallel lines.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Define a point.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Define rays and line segments.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Lines","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"219","CATEGORY_ID":"1","CONT_TITLE":"Sets","CONT_SLUG":"sets","CONT_TITLE_AR":"Sets","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA set is defined as the collection of similar types of objects. It can be defined in two ways: set builder and roster form. The union of two sets is a new set that contains all of the elements that are in at least one of the two sets. The union is written as A \u222a B and the intersection of two sets is a new set that contains all the elements that are in both sets.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Learn about the concept and formation of sets.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Differentiate between set builder and roster forms of a set.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Differentiate between the union and intersection of sets.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Learn about the elements of a set.\u003C\/div\u003E","CONT_DESC_AR":"Set is defined as the collection of similar types of objects. Set can be defined in two ways: set builder and roster form.\u0026lt;br \/\u0026gt;\nThe union of two sets is a new set that contains all of the elements that are in at least one of the two sets.\u0026lt;br \/\u0026gt;\nThe union is written as A \u0026amp;cup; B and the intersection of two sets is a new set that contains all of the elements that are in both sets.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\nIn this topic you will be able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; know about the concept and formation of sets.\u0026lt;br \/\u0026gt;\n\u0026amp;bull; differentiate between set builder and roster form of a set.\u0026lt;br \/\u0026gt;\n\u0026amp;bull; differentiate between union and intersection of sets.\u0026lt;br \/\u0026gt;\n\u0026amp;bull; know about element of a set.\u0026lt;br \/\u0026gt;\n\u0026amp;bull; form Subsets of a set.","BACKING_FILE":"ss300008.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300008","TOPIC_ID":"ss300008","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300008.jpg","PUBLIC_BANNER_IMG":"SS300008.jpg","PUBLIC_VIDEO":"pvideo_ss300008.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/_JFbmbP_9Qw","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A set is defined as the collection of similar types of objects. It can be defined in two ways: set builder and roster form. The union of two sets is a new set that contains all of the elements that are in at least one of the two sets. The union is written as A \u222a B and the intersection of two sets is a new set that contains all the elements that are in both sets.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Learn about the concept and formation of sets.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Differentiate between set builder and roster forms of a set.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Differentiate between the union and intersection of sets.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Learn about the elements of a set.\u0026lt;\/p\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Sets","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"207","CATEGORY_ID":"1","CONT_TITLE":"Solving a System of Inequalities Graphically","CONT_SLUG":"solving-system-of-inequalities-graphically","CONT_TITLE_AR":"Solving System of Inequalities Graphically","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA linear inequality is an inequality which involves a linear function. A linear inequality contains one of the symbols of inequality: \u003C is less than, \u003E is greater than, \u2264 is less than or equal to, \u2265 is greater than or equal to. Linear inequality in two variables can be solved in a similar manner as we solve linear inequality.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain the concept of inequality.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Distinguish between graphs of inequalities.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Solve a system of linear inequalities graphically.\u003C\/div\u003E","CONT_DESC_AR":"A linear inequality is an inequality which involves a linear function.\u003C\/br\u003E\r\nA linear inequality contains one of the symbols of inequality: \u003C is less than, \u003E is greater than, \u2264 is less than or equal to.\u003C\/br\u003E\r\nLinear inequality in two variables can be solved in a similar manner as we solve system of linear equations.\u003C\/br\u003E\u003C\/br\u003E\r\n\u003Cstrong\u003ELearning Objectives\u003C\/strong\u003E\u003C\/br\u003E\u003C\/br\u003E\r\nIn this simulation,you will be able to:\u003C\/br\u003E\r\n\u2022 explain the concept of inequality\u003C\/br\u003E\r\n\u2022 distinguish between the graphs of inequalities\u003C\/br\u003E\r\n\u2022 solve the system of linear inequalities graphically","BACKING_FILE":"ss300049.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300049","TOPIC_ID":"ss300049","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300049.jpg","PUBLIC_BANNER_IMG":"SS300049.jpg","PUBLIC_VIDEO":"pvideo_ss300049.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/H6wES_wtrQ4","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A linear inequality is an inequality which involves a linear function. A linear inequality contains one of the symbols of inequality: \u0026amp;lt; is less than, \u0026amp;gt; is greater than, \u2264 is less than or equal to, \u2265 is greater than or equal to. Linear inequality in two variables can be solved in a similar manner as we solve linear inequality.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Explain the concept of inequality.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Distinguish between graphs of inequalities.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Solve a system of linear inequalities graphically.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Solving System of Inequalities Graphically","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"203","CATEGORY_ID":"1","CONT_TITLE":"Three Dimensional Geometric Figures","CONT_SLUG":"three-dimensional-geometric-figures","CONT_TITLE_AR":"Three Dimesional Geometric Figures","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAn object having three dimensions such as height, width and depth is known as a three dimensional object. Few common examples of 3-D figure are cube, cuboid, sphere, prism, pyramid etc.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Differentiate between different types of three dimensional figures.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify their number of vertices.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify their number of edges.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify their number of faces.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify their net shape.\u003C\/div\u003E","CONT_DESC_AR":"Different types of three dimensional figures include: \u0026amp;nbsp;cube,cuboid,sphere,prism,pryamid and etc.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\nIn this topic you will be able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; differentiate types of three-dimensional figures\u0026lt;br \/\u0026gt;\n\u0026amp;bull; identify their number of vertices\u0026lt;br \/\u0026gt;\n\u0026amp;bull; identify their number of edges\u0026lt;br \/\u0026gt;\n\u0026amp;bull; identify their number of faces\u0026lt;br \/\u0026gt;\n\u0026amp;bull; identify their net shape","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300038","TOPIC_ID":"ms300038","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300038.jpg","PUBLIC_BANNER_IMG":"MS300038.jpg","PUBLIC_VIDEO":"pvideo_ms300038.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/hDY0cPoKW6o","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;An object having three dimensions such as height, width and depth is known as a three dimensional object. Few common examples of 3-D figure are cube, cuboid, sphere, prism, pyramid etc.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Differentiate between different types of three dimensional figures.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify their number of vertices.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify their number of edges.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify their number of faces.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify their net shape.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Three Dimensional Geometric Figures","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"199","CATEGORY_ID":"1","CONT_TITLE":"Matrices","CONT_SLUG":"matrices","CONT_TITLE_AR":"Matrices","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA matrix is a rectangular array of numbers, symbols, or expressions, arranged in rows and columns. Matrices can be added, subtracted and multiplied. There are different types of matrices: row matrix, column matrix, identity matrix, zero matrix, diagonal matrix, symmetric matrix and skew symmetric matrix.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Create a matrix.\u003C\/div\u003E \r\n\u003Cdiv\u003E- List types of matrices.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Transpose a matrix.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Distinguish between a symmetric and a skew symmetric matrices.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Perform operations on a matrix.\u003C\/div\u003E","CONT_DESC_AR":"A matrix is a rectangular array of numbers, symbols, or expressions, arranged in rows and columns.\u0026lt;br \/\u0026gt;\nMatrices can be added, subtracted and multiplied.\u0026lt;br \/\u0026gt;\nThere are different types of matrices: row matrix, column matrix, identity matrix, zero matrix, diagonal matrix, symmetric matrix and skew symmetric matrix.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\nIn this simulation, You will be able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; create a matrix\u0026lt;br \/\u0026gt;\n\u0026amp;bull; list types of matrices\u0026lt;br \/\u0026gt;\n\u0026amp;bull; transpose a matrix\u0026lt;br \/\u0026gt;\n\u0026amp;bull; distinguish between symmetric and skew symmetric matrices\u0026lt;br \/\u0026gt;\n\u0026amp;bull; perform operations on a matrix","BACKING_FILE":"ss300009.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300009","TOPIC_ID":"ss300009","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300009.jpg","PUBLIC_BANNER_IMG":"SS300009.jpg","PUBLIC_VIDEO":"pvideo_ss300009.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/aCPP3rt6pYM","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A matrix is a rectangular array of numbers, symbols, or expressions, arranged in rows and columns. Matrices can be added, subtracted and multiplied. There are different types of matrices: row matrix, column matrix, identity matrix, zero matrix, diagonal matrix, symmetric matrix and skew symmetric matrix.\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Create a matrix.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- List types of matrices.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Transpose a matrix.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Distinguish between a symmetric and a skew symmetric matrices.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Perform operations on a matrix.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Matrices","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"196","CATEGORY_ID":"1","CONT_TITLE":"Graphing Linear Inequalities in One Variable","CONT_SLUG":"graphing-linear-inequalities-in-one-variable","CONT_TITLE_AR":"Graphing Linear Inequalities in One Variable","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA linear inequality in one variable is defined as an algebraic statement that relates a linear expression (with one variable) with a constant by \u003E, \u003C, \u2265, and \u2264 sign instead of =. For example, x \u2264 5. x + 3 \u003E \u2212 9. a \u2265 \u2212 11. \u003C\/div\u003E \r\n\u003Cdiv\u003EThe graph of a linear inequality in one variable is a number line in which we use open circle for \u003C and \u003E and a closed circle for \u2264 and \u2265. \u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define an inequality in one variable.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Relate a linear equation with a linear inequality in one variable.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Use different methods of graphing an inequality in one variable to find its solution.\u003C\/div\u003E","CONT_DESC_AR":"A linear inequality is an inequality which involves a linear function.\u003C\/br\u003E\r\nA linear inequality contains one of the symbols of inequality, \u003C is less than,  \u003E is greater than.\u003C\/br\u003E\r\n\u2264 is less than or equal to.\u003C\/br\u003E\r\nA linear inequality in one variable can be solved in a similar way as we solved a linear equation with one variable.\u003C\/br\u003E\u003C\/br\u003E\r\n\u003Cstrong\u003ELearning Objectives\u003C\/strong\u003E\u003C\/br\u003E\u003C\/br\u003E\r\nIn this simulation, you will be able to:\u003C\/br\u003E\r\n\u2022 define inequality\u003C\/br\u003E\r\n\u2022 relate linear equations with linear inequality\u003C\/br\u003E\r\n\u2022 use different methods of graphing inequality in one variable to find its solution","BACKING_FILE":"ss300007.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300007","TOPIC_ID":"ss300007","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300007.jpg","PUBLIC_BANNER_IMG":"SS300007.jpg","PUBLIC_VIDEO":"pvideo_ss300007.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/ZXP9i7B47ec","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;A linear inequality in one variable is defined as an algebraic statement that relates a linear expression (with one variable) with a constant by \u0026amp;gt;, \u0026amp;lt;, \u2265, and \u2264\u0026amp;nbsp; sign instead of\u0026amp;nbsp; =. For example, x \u2264 5. x + 3 \u0026amp;gt; \u2212 9. a \u2265 \u2212 11.\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;The graph of a linear inequality in one variable is a number line in which we use open circle for \u0026amp;lt; and \u0026amp;gt; and a closed circle for \u2264 and \u2265.\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Define an inequality in one variable.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Relate a linear equation with a linear inequality in one variable.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Use different methods of graphing an inequality in one variable to find its solution.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Graphing Linear Inequalities in One Variable","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"194","CATEGORY_ID":"1","CONT_TITLE":"Fundamental Principle of Counting","CONT_SLUG":"fundamental-principle-of-counting","CONT_TITLE_AR":"Fundamental Principle of Counting","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThe Fundamental Counting Principle is the method to find out the number of outcomes in a probability problem. It is of two types: the multiplication principle which states that if one event has (m) possible outcomes and a second independent event has (n) possible outcomes, then there are (mn) total possible outcomes for the two events together. Another one is the addition principle which states that if there are two events which can occur independently by (m) and (n) ways, then either of the two events can occur in (m+n) ways. \u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify and use the fundamental principle of multiplication.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify and use the fundamental principle of addition.\u003C\/div\u003E","CONT_DESC_AR":"The Fundamental Counting Principle is of two types: the Multiplication Principle which states that if one event has (m) possible outcomes and a second independent event has (n) possible outcomes, then there are (mn) total possible outcomes for the two events together.\u0026lt;br \/\u0026gt;\nAnother one is the Addition Principle which states that if there are two events which can occur independently by (m) and (n) ways, then either of the two events can occur in (m+n) ways.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\nIn this simulation, you will be able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; explain the fundamental principle of multiplication\u0026lt;br \/\u0026gt;\n\u0026amp;bull; explain the fundamental principle of addition","BACKING_FILE":"ss300011.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300011","TOPIC_ID":"ss300011","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300011.jpg","PUBLIC_BANNER_IMG":"SS300011.jpg","PUBLIC_VIDEO":"pvideo_ss300011.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/O8YlkaAEQKo","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;The Fundamental Counting Principle is the method to find out the number of outcomes in a probability problem. It is of two types: the multiplication principle which states that if one event has (m) possible outcomes and a second independent event has (n) possible outcomes, then there are (mn) total possible outcomes for the two events together.\u0026amp;nbsp; Another one is the addition principle which states that if there are two events which can occur independently by (m) and (n) ways, then either of the two events can occur in (m+n) ways.\u0026amp;nbsp;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify and use the fundamental principle of multiplication.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify and use the fundamental principle of addition.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Fundamental Principle of Counting","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"191","CATEGORY_ID":"1","CONT_TITLE":"Introduction to 3 Dimensional Coordinate Planes","CONT_SLUG":"introduction-to-3d-coordinate-plane","CONT_TITLE_AR":"Introduction to 3D Coordinate Plane","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThree-dimensional space is a geometric setting in which three values are required to determine the position of an element. This is the informal meaning of the term dimension. Three-dimension coordinates in space are (x,y,z), and the distance between two points can be find out with a distance formula.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify three-dimensional coordinates in space.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the distance between two points in space.\u003C\/div\u003E","CONT_DESC_AR":"A vector is a quantity having direction as well as magnitude.\u003C\/br\u003E\r\nVectors can be added and subtracted, and their magnitudes can also be calculated.\u003C\/br\u003E\u003C\/br\u003E\r\n\u003Cstrong\u003ELearning Objectives\u003C\/strong\u003E\u003C\/br\u003E\u003C\/br\u003E\r\nIn this simulation, you will be able to:\u003C\/br\u003E\r\n\u2022 perform addition and subtraction of vectors\u003C\/br\u003E\r\n\u2022 represent vectors by breaking them\r\ninto x, y or x, y, z components for two or three\r\ndimensions respectively\u003C\/br\u003E\r\n\u2022 calculate the magnitude of a vector in two and three\r\ndimensions\u003C\/br\u003E\r\n\u2022 perform the numerical addition of two vectors","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300005","TOPIC_ID":"ss300005","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300005.jpg","PUBLIC_BANNER_IMG":"SS300005.jpg","PUBLIC_VIDEO":"pvideo_ss300005.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/VfnzYb5HDFA","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Three-dimensional space is a geometric setting in which three values are required to determine the position of an element. This is the informal meaning of the term dimension. Three-dimension coordinates in space are (x,y,z), and the distance between two points can be find out with a distance formula.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify three-dimensional coordinates in space.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Find the distance between two points in space.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Introduction to 3D Coordinate plane","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"189","CATEGORY_ID":"1","CONT_TITLE":"Venn Diagram","CONT_SLUG":"venn-diagram","CONT_TITLE_AR":"Venn Diagram","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA Venn diagram is a diagram representing mathematical or logical sets pictorially as circles or closed curves within an enclosed rectangle (the universal set), with common elements of the different sets being represented by intersections of the circles.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Form Venn diagrams of sets.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Form Venn diagrams for real life situations.\u003C\/div\u003E","CONT_DESC_AR":"A Venn diagram is a diagram representing mathematical or logical sets pictorially as circles or closed curves within an enclosed rectangle (the universal set), with common elements of the different sets being represented by intersections of the circles.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\nIn this topic you will be able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; make a Venn diagram of sets\u0026lt;br \/\u0026gt;\n\u0026amp;bull; determine a Venn diagram in real life situations\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;","BACKING_FILE":"ss300004.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300004","TOPIC_ID":"ss300004","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300004.jpg","PUBLIC_BANNER_IMG":"SS300004.jpg","PUBLIC_VIDEO":"pvideo_ss300004.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/6cwmDQ6Ajuo","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A Venn diagram is a diagram representing mathematical or logical sets pictorially as circles or closed curves within an enclosed rectangle (the universal set), with common elements of the different sets being represented by intersections of the circles.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Form Venn diagrams of sets.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Form Venn diagrams for real life situations.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Venn Diagram","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"180","CATEGORY_ID":"1","CONT_TITLE":"Conic Section","CONT_SLUG":"conic-section","CONT_TITLE_AR":"Conic Section","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA conic section is a figure formed by the intersection of a plane and a circular cone. Conic sections are of four types: a circle, ellipse, parabola, or hyperbola, depending on the angle of the plane with respect to the cone. When we degenerate the conic section it becomes a point, line and two intersecting lines, respectively.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Differentiate between different conic sections.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify circles, parabolas, ellipses, and hyperbolas.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain what a degenerate section is.\u003C\/div\u003E","CONT_DESC_AR":"A conic section is a figure formed by the intersection of a plane and a circular cone.\u0026lt;br \/\u0026gt;\nConic sections are of four types: a circle, ellipse, parabola, or hyperbola, depending on the angle of the plane with respect to the cone.\u0026lt;br \/\u0026gt;\nWhen we degenerate the conic section it becomes a point, line and two intersecting lines, respectively.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\nIn this topic you will be able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; differentiate different conic sections\u0026lt;br \/\u0026gt;\n\u0026amp;bull; identify circles, parabola, ellipses and hyperbola\u0026lt;br \/\u0026gt;\n\u0026amp;bull; know what a degenerate section is","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300001","TOPIC_ID":"ss300001","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300001.jpg","PUBLIC_BANNER_IMG":"SS300001.jpg","PUBLIC_VIDEO":"pvideo_ss300001.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/wF_02X1jLLQ","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-12 05:02:53","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A conic section is a figure formed by the intersection of a plane and a circular cone. Conic sections are of four types: a circle, ellipse, parabola, or hyperbola, depending on the angle of the plane with respect to the cone. When we degenerate the conic section it becomes a point, line and two intersecting lines, respectively.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;span style=\u0026quot;font-size: 13px;\u0026quot;\u0026gt;After completing this module, you will be able to:\u0026lt;\/span\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;span style=\u0026quot;font-size: 13px;\u0026quot;\u0026gt;- Differentiate between different conic sections.\u0026lt;\/span\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;span style=\u0026quot;font-size: 13px;\u0026quot;\u0026gt;- Identify circles, parabolas, ellipses, and hyperbolas.\u0026lt;\/span\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;span style=\u0026quot;font-size: 13px;\u0026quot;\u0026gt;- Explain what a degenerate section is\u0026lt;\/span\u0026gt;.\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Conic Section","ADMSUBJECT_ID":"1308","ADMCOURSE_ID":"374","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"20","CATEGORY_ID":"1","CONT_TITLE":"Time and Clock","CONT_SLUG":"time-and-clock","CONT_TITLE_AR":"Time and Clock","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA clock is defined as a mechanical or electrical device used for measuring time by indicating hours, minutes, and sometimes seconds by hands. 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To add linear expressions, combine like terms. For example: To add 2x + 2 and 4x + 5, add 2x and 4x which produces 6x. Then add the constant terms 2 + 5 = 7. The result can be written as 6x + 7.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define linear expression.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Add linear expressions.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000042","TOPIC_ID":"vm000042","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000042.jpg","PUBLIC_BANNER_IMG":"vm000042.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000042.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-08-02 12:26:07","CREATED_BY":"2143","UPDATED_ON":"2024-10-07 12:29:26","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A linear expression is an expression containing a variable that is only raised to the first power 1. 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