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The volume of a composite solid is equal to the sum of the volumes of each component.\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 shapes that are composite solids.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify the shapes that form a composite solid.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate the volume of a composite solid.\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.vm000061","TOPIC_ID":"vm000061","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000061.jpg","PUBLIC_BANNER_IMG":"vm000061.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000061.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":"2018-09-05 06:02:58","CREATED_BY":"2143","UPDATED_ON":"2018-09-05 08:31:47","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;Objects that are composed of two or more basic three-dimensional shapes are called composite solids. The volume of a composite solid is equal to the sum of the volumes of each component.\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;- Identify shapes that are composite solids.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify the shapes that form a composite solid.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Calculate the volume of a composite solid.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Volume of Composite Solids","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"750","CATEGORY_ID":"1","CONT_TITLE":"Real Numbers: Laws of Exponents","CONT_SLUG":"real-numbers-laws-of-exponents","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 power indicates the number of times a base number is multiplied by itself. In 5\u00b2 the number 5 is called the base and the number 2 isan exponent. The laws of exponents specify that when multiplying like bases, keep the base the same and add the exponents. When raising a base with a power to another power, the base remains the same and the exponents are multiplied.\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 laws of exponents.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Demonstrate how to simplify a monomial using the laws of exponents.\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.vm000009","TOPIC_ID":"vm000009","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000009.jpg","PUBLIC_BANNER_IMG":"vm000009.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000009.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":"2018-09-05 06:02:58","CREATED_BY":"2143","UPDATED_ON":"2018-09-05 08:31:47","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 power indicates the number of times a base number is multiplied by itself. In 5\u00b2 the number 5 is called the base and the number 2 isan exponent. The laws of exponents specify that when multiplying like bases, keep the base the same and add the exponents. When raising a base with a power to another power, the base remains the same and the exponents are multiplied.\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 laws of exponents.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Demonstrate how to simplify a monomial using the laws of exponents.\u0026amp;nbsp;\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Real Numbers:Laws of Exponents","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"749","CATEGORY_ID":"1","CONT_TITLE":"Powers of Monomials","CONT_SLUG":"powers-of-monomials","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 power of the monomial indicates the number of times a base number is multiplied by itself. In 5\u00b2 the number 5 is called the base and the number 2 is an exponent.\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 definition of the term monomial.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Simplify monomials.\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.vm000008","TOPIC_ID":"vm000008","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000008.jpg","PUBLIC_BANNER_IMG":"vm000008.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000008.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":"2018-09-05 06:02:58","CREATED_BY":"2143","UPDATED_ON":"2018-09-05 08:31:47","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 power of the monomial indicates the number of times a base number is multiplied by itself. In 5\u00b2 the number 5 is called the base and the number 2 is an exponent.\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 definition of the term monomial.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Simplify monomials.\u0026amp;nbsp;\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Powers of Monomials","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"558","CATEGORY_ID":"1","CONT_TITLE":"Surface Area of a Pyramid","CONT_SLUG":"surface-area-of-a-pyramid","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 pyramid is a polyhedron that has a base, which can be any polygon, and three or more triangular faces that meet at a point called the apex. To calculate the surface area of the pyramid, add the areas of all the triangles and the base. The height of a triangle within a pyramid is called the slant height.\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- Formulate the lateral surface area of the pyramid.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Formulate the total surface area of the pyramid.\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.ms300203","TOPIC_ID":"ms300203","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300203.jpg","PUBLIC_BANNER_IMG":"MS300203.jpg","PUBLIC_VIDEO":"pvideo_ms300203.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/2H2wfL5AUBY","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"0","UPDATED_ON":"2018-09-05 08:31:47","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 pyramid is a polyhedron that has a base, which can be any polygon, and three or more triangular faces that meet at a point called the apex. To calculate the surface area of the pyramid, add the areas of all the triangles and the base. The height of a triangle within a pyramid is called the slant height.\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;- Formulate the lateral surface area of the pyramid.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Formulate the total surface area of the pyramid.\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 Pyramid","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"555","CATEGORY_ID":"1","CONT_TITLE":"Volume of a Pyramid","CONT_SLUG":"volume-of-pyramid","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 pyramid is a polyhedron that has a base, which can be any polygon, and three or more triangular faces that meet at a point called the apex. The volume \u2019V\u2019 of a pyramid is one-third the area of the base \u2019B\u2019 times the height \u2019h\u2019. V=1\/3(Bh).\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- Formulate the volume of triangular pyramid. \u003C\/div\u003E \r\n\u003Cdiv\u003E- Formulate the volume of rectangular pyramid. \u003C\/div\u003E \r\n\u003Cdiv\u003E- Formulate the volume of square based pyramid.\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.ms300199","TOPIC_ID":"ms300199","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300199.jpg","PUBLIC_BANNER_IMG":"MS300199.jpg","PUBLIC_VIDEO":"pvideo_ms300199.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/TsO8AErj2ok","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"0","UPDATED_ON":"2018-09-05 08:31:47","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 pyramid is a polyhedron that has a base, which can be any polygon, and three or more triangular faces that meet at a point called the apex. The volume \u2019V\u2019 of a pyramid is one-third the area of the base \u2019B\u2019 times the height \u2019h\u2019. V=1\/3(Bh).\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;- Formulate the volume of triangular pyramid.\u0026lt;br\u0026gt;\u0026amp;nbsp;- Formulate the volume of rectangular pyramid.\u0026lt;br\u0026gt;\u0026amp;nbsp;- Formulate the volume of square based pyramid.\u0026lt;br\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Volume of Pyramid","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"553","CATEGORY_ID":"1","CONT_TITLE":"Surface Area of Cones","CONT_SLUG":"surface-area-of-cones","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 total surface area of a cone is the sum of the area of its base and its lateral surface. The formula for finding total surface area of a cone is SA = \u03c0r\u00b2 + \u03c0rl, where r is the radius and l is the slant height.\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 cone.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Apply the formula for the surface area of a cone 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.hs300192","TOPIC_ID":"hs300192","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300192.jpg","PUBLIC_BANNER_IMG":"HS300192.jpg","PUBLIC_VIDEO":"pvideo_hs300192.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/R_p8vHHjgig","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"0","UPDATED_ON":"2018-09-05 08:31:47","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;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Overview:\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;The total surface area of a cone is the sum of the area of its base and its lateral surface. The formula\u0026amp;nbsp; for finding total surface area of a cone is SA = \u03c0r\u00b2 + \u03c0rl, where r is the radius and l is the slant height.\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;Learning objectives\u0026lt;br\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;- Calculate the surface area of a cone.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Apply the formula for the surface area of a cone in real life situations.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Surface Area of Cones","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"551","CATEGORY_ID":"1","CONT_TITLE":"Volume of a Sphere","CONT_SLUG":"volume-of-sphere","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 sphere is a round solid figure in which every point on its surface is equidistant from its center. The volume V of a sphere is four-thirds times pi times the radius cubed. The volume of a sphere is 2\/3 of the volume of a cylinder with the same radius, and height being equal to the diameter of the sphere.\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 volume of a sphere.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Apply the formula for the volume of a sphere 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.hs300190","TOPIC_ID":"hs300190","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300190.jpg","PUBLIC_BANNER_IMG":"hs300190.jpg","PUBLIC_VIDEO":"pvideo_hs300190.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/6d_7asXX3sk","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"0","UPDATED_ON":"2018-09-05 08:31:47","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 sphere is a round solid figure in which every point on its surface is equidistant from its center. The volume V of a sphere is four-thirds times pi times the radius cubed. The volume of a sphere is 2\/3 of the volume of a cylinder with the same radius, and height being equal to the diameter of the sphere.\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;- Calculate the volume of a sphere.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Apply the formula for the volume of a sphere 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":"Volume of Sphere","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"550","CATEGORY_ID":"1","CONT_TITLE":"Use of the Pythagorean Theorem","CONT_SLUG":"use-of-pythagoras-theorem","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 Pythagorean theorem deals with the lengths of the sides of a right triangle. The theorem states that the sum of the squares of the lengths of the legs of a right triangle is equal to the square of the length of its hypotenuse .\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 Pythagorean theorem.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate the unknown dimensions of any right triangle.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Apply the Pythagorean theorem 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.hs300186","TOPIC_ID":"hs300186","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300186.jpg","PUBLIC_BANNER_IMG":"HS300186.jpg","PUBLIC_VIDEO":"pvideo_hs300186.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/ftnG5We0TUc","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"0","UPDATED_ON":"2018-09-05 08:31:47","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;The Pythagorean theorem deals with the lengths of the sides of a right triangle. The theorem states that the sum of the squares of the lengths of the legs of a right triangle is equal to the square of the length of its hypotenuse .\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 Pythagorean theorem.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Calculate the unknown dimensions of any right triangle.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Apply the Pythagorean theorem 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":"Use of Pythagoras Theorem","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"536","CATEGORY_ID":"1","CONT_TITLE":"Area of Composite Figures","CONT_SLUG":"area-of-composite-figures","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 composite figure is made up of several simple geometric figures such as triangles, rectangles, squares, circles, and semicircles. To find the area of a composite figure, divide the figure into simpler shapes and then add areas of all the figures together.\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 how to break down and calculate the area of composite figures.\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.ms300134","TOPIC_ID":"ms300134","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300134.jpg","PUBLIC_BANNER_IMG":"ms300134.jpg","PUBLIC_VIDEO":"pvideo_ms300134.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/_UsnFsnVIDo","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"0","UPDATED_ON":"2018-09-05 08:31:47","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 composite figure is made up of several simple geometric figures such as triangles, rectangles, squares, circles, and semicircles. To find the area of a composite figure, divide the figure into simpler shapes and then add areas of all the figures together.\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:\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Explain how to break down and calculate the area of composite figures.\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Area of Composite Figures","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"531","CATEGORY_ID":"1","CONT_TITLE":"Add and Subtract Simple Algebraic Fractions","CONT_SLUG":"add-and-subtract-simple-algebraic-fractions","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 algebraic fraction is a fraction that is represented using the variables, such as x and y. To add or subtract the algebraic fractions, find the lowest common multiple of the denominators and then express all fractions in terms of the lowest common denominator. Finally, simplify the numerators to obtain the numerator of the answer.\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 algebraic fractions.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Add and subtract algebraic fractions.\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.ms300115","TOPIC_ID":"ms300115","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300115.jpg","PUBLIC_BANNER_IMG":"MS300115.jpg","PUBLIC_VIDEO":"pvideo_ms300115.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/igdpaoWXmlQ","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"0","UPDATED_ON":"2018-09-05 08:31:47","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;br\u0026gt;\u0026lt;br\u0026gt;An algebraic fraction is a fraction that is represented using the variables, such as x and y. To add or subtract the algebraic fractions, find the lowest common multiple of the denominators and then express all fractions in terms of the lowest common denominator. Finally, simplify the numerators to obtain the numerator of the answer.\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;Learning objectives\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 algebraic fractions.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Add and subtract algebraic fractions..\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Add and Subtract Simple Algebraic Fraction","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"322","CATEGORY_ID":"1","CONT_TITLE":"Volume and Surface Area of a Cylinder","CONT_SLUG":"volume-and-surface-area-of-cylinder","CONT_TITLE_AR":"Volume and Surface Area of Cylinder","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA right circular cylinder is a closed solid that has two circular bases connected by a curved surface. The curved surface area of a cylinder is the area of its curved surface excluding the base, while total surface area is calculated by adding the areas of curved surface and two circular bases. The volume of a cylinder is calculated by multiplying the area of the base with the height of the cylinder.\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 right circular cylinder.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Derive the formula for the total surface area of a right circular cylinder.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Derive the formula for the volume of a right circular cylinder.\u003C\/div\u003E","CONT_DESC_AR":"Formula for curved surface area, total surface area and volume of a right circular cylinder.\u0026lt;br \/\u0026gt;\n\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 find that the\u0026lt;br \/\u0026gt;\n\u0026amp;bull; Curved surface area = 2\u0026amp;pi;rh\u0026lt;br \/\u0026gt;\n\u0026amp;bull; Total surface area = 2\u0026amp;pi;r(r+h)\u0026lt;br \/\u0026gt;\n\u0026amp;bull; Volume = \u0026amp;pi;r\u0026amp;sup2;h \u0026amp;nbsp;\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\nWhere r is the radius and h is the height of the cylinder.","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.hs300016","TOPIC_ID":"hs300016","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300016.jpg","PUBLIC_BANNER_IMG":"HS300016.jpg","PUBLIC_VIDEO":"pvideo_hs300016.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/Pasy8gpnPP0","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"0","UPDATED_ON":"2018-09-05 08:31:47","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 right circular cylinder is a closed solid that has two circular bases connected by a curved surface. The curved surface area of a cylinder is the area of its curved surface excluding the base, while total surface area is calculated by adding the areas of curved surface and two circular bases. The volume of a cylinder is calculated by multiplying the area of the base with the height of the cylinder.\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;- Derive the formula for the curved surface area of a right circular cylinder.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Derive the formula for the total surface area of a right circular cylinder.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Derive the formula for the volume of a right circular cylinder.\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 Cylinder","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"277","CATEGORY_ID":"1","CONT_TITLE":"Linearization and Data Modeling","CONT_SLUG":"linearization-and-data-modeling","CONT_TITLE_AR":"Linearization and Data Modelling","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EData modeling is often the first step in database design and object-oriented programming, as designers first create a conceptual model of how data items relate to each other. Data modeling involves a progression from conceptual model to logical model to physical schema.\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 linearization.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Describe data modeling.\u003C\/div\u003E","CONT_DESC_AR":"Data modeling is often the first step in database design and object-oriented programming as designers first create a conceptual model of how data items relate to each other.\u0026lt;br \/\u0026gt;\nData modeling involves a progression from conceptual model to logical model to physical schema.\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; know about concept of linearization\u0026lt;br \/\u0026gt;\n\u0026amp;bull; know about data modelling","BACKING_FILE":"hs300063.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.hs300063","TOPIC_ID":"hs300063","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300063.jpg","PUBLIC_BANNER_IMG":"HS300063.jpg","PUBLIC_VIDEO":"pvideo_hs300063.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/McM47DumGy4","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"1","UPDATED_ON":"2018-09-05 08:31:47","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;Data modeling is often the first step in database design and object-oriented programming, as designers first create a conceptual model of how data items relate to each other. Data modeling involves a progression from conceptual model to logical model to physical schema.\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 linearization.\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Describe data modeling.\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":"Linearization and Data Modeling","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"267","CATEGORY_ID":"1","CONT_TITLE":"Scatter Plot","CONT_SLUG":"scatter-plot","CONT_TITLE_AR":"Scatter Plot","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EScatter plot is a graph of plotted points that show the relationship between two sets of data. It is defined as a set of points plotted on a horizontal and vertical axis. The graph can depict the extent of correlation between the values of observed quantities or phenomena.\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 scatter plot.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define positive and negative associations.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Create a scatter plot.\u003C\/div\u003E","CONT_DESC_AR":"The scatter diagram graphs pairs of numerical data, with one variable on each axis, to look for a relationship between them. Or we can say in a Scatter (XY) Plot the\u0026amp;nbsp;points shows the relationship between two sets of data.\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning objective\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\nAt the end of this simulation, you will be familiar with\u0026lt;br \/\u0026gt;\n- scatter plot graph","BACKING_FILE":"hs300053.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.hs300053","TOPIC_ID":"hs300053","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300053.jpg","PUBLIC_BANNER_IMG":"HS300053.jpg","PUBLIC_VIDEO":"pvideo_hs300053.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/J9k05vryu-s","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"1","UPDATED_ON":"2018-09-05 08:31:47","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;Scatter plot is a graph of plotted points that show the relationship between two sets of data. It is defined as a set of points plotted on a horizontal and vertical axis. The graph can depict the extent of correlation between the values of observed quantities or phenomena.\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 scatter plot.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Define positive and negative associations.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Create a scatter plot.\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":"Scatter Plot","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"243","CATEGORY_ID":"1","CONT_TITLE":"Linear Equations in Two Variables","CONT_SLUG":"linear-equations-in-two-variables","CONT_TITLE_AR":"Linear Equations in Two Variables","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 equation in two variable is defined as a first-degree equation that can be written in the form ax + by = c, where both a and b are not equal to zero and a, b, and c are real numbers. The graph of any equation of this form is a straight line.\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- Express a linear equation in the form of ax + by + c = 0.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Write a linear equation in two variables to represent a given statement.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Match a graph with its equation.\u003C\/div\u003E","CONT_DESC_AR":"Solving systems of equations with two variables.A system of a linear equation is comprised of two or more equations, used to find a common solution to the equations.\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; express the linear equation in form of ax+by+c=0\u0026lt;br \/\u0026gt;\n\u0026amp;bull; write linear equation in two variable to represent given statement\u0026lt;br \/\u0026gt;\n\u0026amp;bull; match the graph with it\u0026amp;rsquo;s equation","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.hs300027","TOPIC_ID":"hs300027","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300027.jpg","PUBLIC_BANNER_IMG":"hs300027.jpg","PUBLIC_VIDEO":"pvideo_hs300027.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/960TQM0oUso","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"1","UPDATED_ON":"2018-09-05 08:31:47","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 equation in two variable is defined as a first-degree equation that can be written in the form ax + by = c, where both a and b are not equal to zero and \u0026amp;nbsp;a, b, and c are real numbers. The graph of any equation of this form is a straight line.\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;- Express a linear equation in the form of ax + by + c = 0.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Write a linear equation in two variables to represent a given statement.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Match a graph with its equation.\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":"Linear Equations in Two Variables","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"239","CATEGORY_ID":"1","CONT_TITLE":"Volume of a Cone","CONT_SLUG":"volume-of-a-cone","CONT_TITLE_AR":"Volume of a Cone","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThe volume of a cone is the amount of space that will fit inside it. The volume of a cone is one-third of the volume of cylinder.\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 formulate the volume of cone.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Apply the formula of volume of cone in real life situations.\u003C\/div\u003E","CONT_DESC_AR":"The volume of a cone is the amount of space that will fit inside it. We use the formula for the volume of a cone is one-third of the volume of cylinder.\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; determine the volume of a cone\u0026lt;br \/\u0026gt;\n\u0026amp;bull; apply the formula of the volume of a cone","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.hs300025","TOPIC_ID":"hs300025","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300025.jpg","PUBLIC_BANNER_IMG":"HS300025.jpg","PUBLIC_VIDEO":"pvideo_hs300025.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/Sx8Sn7O6-_c","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"1","UPDATED_ON":"2018-09-05 08:31:47","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 volume of a cone is the amount of space that will fit inside it. The volume of a cone is one-third of the volume of cylinder.\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 formulate the volume of cone.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Apply the formula of volume of cone in 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":"Volume of a Cone","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"212","CATEGORY_ID":"1","CONT_TITLE":"Equations of a Straight Line","CONT_SLUG":"equation-of-a-straight-line","CONT_TITLE_AR":"Equations of Straight Line","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 gradient, and c is the value where the line cuts the y-axis. The value of c is called the intercept on the y-axis.\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 point-slope form.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define slope-intercept form.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define standard form.\u003C\/div\u003E","CONT_DESC_AR":"The general equation of a straight line is y = mx + c, where m is the gradient, and c is the value where the line cuts the y-axis.\u0026lt;br \/\u0026gt;\nThe value of c is called the intercept on the y-axis.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\nIn this simulation, you will be able to explore linear equations written in:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; \u0026amp;nbsp;point-slope form\u0026lt;br \/\u0026gt;\n\u0026amp;bull; \u0026amp;nbsp;slope-intercept form\u0026lt;br \/\u0026gt;\n\u0026amp;bull; \u0026amp;nbsp;standard form","BACKING_FILE":"ms300073.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300073","TOPIC_ID":"ms300073","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300073.jpg","PUBLIC_BANNER_IMG":"MS300073.jpg","PUBLIC_VIDEO":"pvideo_ms300073.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/M6FZ3P3hQJs","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"1","UPDATED_ON":"2018-09-05 08:31:47","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;The general equation of a straight line is y = mx + c, where m is the gradient, and c is the value where the line cuts the y-axis. The value of c is called the intercept on the y-axis.\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;- Define point-slope form.\u0026lt;\/span\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;span style=\u0026quot;font-size: 13px;\u0026quot;\u0026gt;- Define slope-intercept form.\u0026lt;\/span\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;span style=\u0026quot;font-size: 13px;\u0026quot;\u0026gt;- Define standard form.\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":"Equations of Straight Line","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"202","CATEGORY_ID":"1","CONT_TITLE":"Slope of a Straight Line","CONT_SLUG":"slope-of-straight-line","CONT_TITLE_AR":"Slope of Straight Line","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 of a straight line is defined as the measure of steepness of a line.\u003C\/div\u003E \r\n\u003Cdiv\u003EThere are three methods of finding slope.\u003C\/div\u003E \r\n\u003Cdiv\u003E1. When the angle of inclination is given, slope m is calculated by using the formula:\u003C\/div\u003E \r\n\u003Cdiv\u003Em= tan\u03b8, \u003C\/div\u003E \r\n\u003Cdiv\u003E2. When rise and run are given , slope m is calculated by using the formula:\u003C\/div\u003E \r\n\u003Cdiv\u003Em = rise\/run, \u003C\/div\u003E \r\n\u003Cdiv\u003E3. When coordinates of any two points on a line are given, slope m is calculated by using the formula: \u003C\/div\u003E \r\n\u003Cdiv\u003Em= (x2-x1)\/(y2-y1).\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 line when the angle of inclination is given.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the slope of a line when the rise and run are given.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the slope of a line when coordinates of any two points on the line are given.\u003C\/div\u003E","CONT_DESC_AR":"To find the slope of a line when the angle of inclination is given, m=tan\u03b8, rise and run m = rise\/run, coordinates of any two points m= (x2-x1)\/(y2-y1) on the line are given.\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- find the slope of a line when the angle of inclination is given\u0026lt;br \/\u0026gt;\n- find the slope of a line when the rise and run are given\u0026lt;br \/\u0026gt;\n- find the slope of a line when coordinates of any two points on the line are given","BACKING_FILE":"hs300010.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.hs300010","TOPIC_ID":"hs300010","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300010.jpg","PUBLIC_BANNER_IMG":"HS300010.jpg","PUBLIC_VIDEO":"pvideo_hs300010.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/kM8TgBK92JY","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"1","UPDATED_ON":"2018-09-05 08:31:47","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 slope of a straight line is defined as the measure of steepness of a line.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;There are three methods of finding slope.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;1. When the angle of inclination is given, slope m is calculated by using the formula:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;m= tan\u03b8,\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;2. When rise and run are given , slope m is calculated by using the formula:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;m = rise\/run,\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;3. When coordinates of any two points on a line are given, slope m is calculated by using the formula:\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;m= (x2-x1)\/(y2-y1).\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;- Find the slope of a line when the angle of inclination is given.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Find the slope of a line when the rise and run are given.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Find the slope of a line when coordinates of any two points on the line are given.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Slope of Straight Line","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"},{"CONT_ID":"182","CATEGORY_ID":"1","CONT_TITLE":"Pythagorean Theorem","CONT_SLUG":"pythagorean-theorem","CONT_TITLE_AR":"Pythagorean Theorem","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EPythagorean theorem states that the square of the hypotenuse (the side opposite to the right angle) is equal to the sum of the squares of the other two sides in a right triangle. By using this theorem, we can find the length of unknown side if any two side lengths are given.\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 Pythagorean theorem.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Use the Pythagorean theorem to find the side lengths of a right triangle.\u003C\/div\u003E","CONT_DESC_AR":"Pythagoras theorem is a fundamental relationship in Euclidean geometry among the three sides of a right triangle.\u0026lt;br \/\u0026gt;\nIt states that the square of the hypotenuse (the side opposite the right angle) is equal to the sum of the squares of the other two sides.\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 the simulation you will be able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; define the Pythagorean theorem\u0026lt;br \/\u0026gt;\n\u0026amp;bull; use the Pythagorean theorem to find the lengths of the sides of right triangles\u0026lt;br \/\u0026gt;\n\u0026amp;bull; use the Pythagorean theorem to find the areas of right triangles\u0026lt;br \/\u0026gt;\n\u0026amp;bull; apply the Pythagorean theorem to find the perimeter and area of triangles on a grid","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.ms300029","TOPIC_ID":"ms300029","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300029.jpg","PUBLIC_BANNER_IMG":"ms300029.jpg","PUBLIC_VIDEO":"pvideo_ms300029.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/73FuqeMHDv4","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2018-09-05 06:02:58","CREATED_BY":"1","UPDATED_ON":"2018-09-05 08:31:47","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;Pythagorean theorem states that the square of the hypotenuse (the side opposite to the right angle) is equal to the sum of the squares of the other two sides in a right triangle. By using this theorem, we can find the length of unknown side if any two side lengths are given.\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 Pythagorean theorem.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Use the Pythagorean theorem to find the side lengths of a right triangle.\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":"Pythagorean Theorem","ADMSUBJECT_ID":"931","ADMCOURSE_ID":"250","DISPLAY_NAME":"Ontario - Grade 9 - Mathematics: Academic","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics: Academic","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Grade 9","COUNTRY_ID":"316","SHORT_NAME":"Ontario","DOMAIN_NAME":"STEM"}]}