{"pkgId":"22","subjectId":"1333","fullwidthLayout":false,"contentData":{"PACKAGE_NAME":"ICSE Curriculum Full Access","PACKAGE_SLUG":"icse-full","PACKAGE_IMG":"file_603347239_1592483891.png","ADMCOURSE_ID":"380","COURSE_NAME":"Grade 9","COUNTRY_ID":"342","STANDARD_NAME":"ICSE","ADMSUBJECT_ID":"1333","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","CAT_NAME":"Cube and Cuboids : Surface area and Volume","CONT_ID":"752","CONT_TITLE":"Cubes and Cuboids: Surface Area and Volume","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_SLUG":"cubes-and-cuboids-surface-area-and-volume","BACKING_FILE":null,"CONT_SRC":null,"CONTTYPE_ID":"9","PUBLIC_IMG":"thumb_vm000011.jpg","PUBLIC_BANNER_IMG":"vm000011.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000011.mp4","PUBLIC_VIDEO_URL":null,"PACKAGE_DOMAIN":"STEM"},"pkgCourses":[{"ADMCOURSE_ID":"377","COURSE_NAME":"Grade 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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":"2019-07-23 09:57:14","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":"1333","ADMCOURSE_ID":"380","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":"Grade 9","COUNTRY_ID":"342","SHORT_NAME":"ICSE","DOMAIN_NAME":"STEM"},{"CONT_ID":"751","CATEGORY_ID":"1","CONT_TITLE":"Cartesian Coordinates","CONT_SLUG":"cartesian-coordinates","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 Cartesian plane is a two-dimensional surface formed by two intersecting and perpendicular lines. Points can be plotted on this plane and located by their x and y coordinates.\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 four quadrants in a Cartesian plane.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Label coordinate points as positive or negative based on their position in a Cartesian plane.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify the axis of abscissa and the axis of ordinate.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Locate the origin in a Cartesian plane.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Plot a point in two-dimensional coordinate geometry.\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.vm000010","TOPIC_ID":"vm000010","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000010.jpg","PUBLIC_BANNER_IMG":"vm000010.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000010.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":"2019-07-23 09:57:14","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 Cartesian plane is a two-dimensional surface formed by two intersecting and perpendicular lines. Points can be plotted on this plane and located by their x and y coordinates.\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 four quadrants in a Cartesian plane.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Label coordinate points as positive or negative based on their position in a Cartesian plane.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify the axis of abscissa and the axis of ordinate.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Locate the origin in a Cartesian plane.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Plot a point in two-dimensional coordinate geometry.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Cartesian Coordinates","ADMSUBJECT_ID":"1333","ADMCOURSE_ID":"380","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":"Grade 9","COUNTRY_ID":"342","SHORT_NAME":"ICSE","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":"2019-07-23 09:57:14","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 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":"1333","ADMCOURSE_ID":"380","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":"Grade 9","COUNTRY_ID":"342","SHORT_NAME":"ICSE","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":"2019-07-23 09:57:14","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":"1333","ADMCOURSE_ID":"380","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":"Grade 9","COUNTRY_ID":"342","SHORT_NAME":"ICSE","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":"2019-07-23 09:57:14","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;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":"1333","ADMCOURSE_ID":"380","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":"Grade 9","COUNTRY_ID":"342","SHORT_NAME":"ICSE","DOMAIN_NAME":"STEM"},{"CONT_ID":"380","CATEGORY_ID":"1","CONT_TITLE":"Trignometric Ratios","CONT_SLUG":"trignometric-ratios","CONT_TITLE_AR":"Trignometric Ratios","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThe sides and angles of a triangle are related to each other. The relationships that define the connection between the angles and the sides of a right triangle are expressed in terms of six trigonometric ratios: Sine (sin), cosine (cos), tangent (tan), cosecant (cosec), secant (sec), and cotangent (cot).\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 relationship between sides and angles of a triangle.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explore different types of trigonometric ratios.\u003C\/div\u003E","CONT_DESC_AR":"For any right triangle, there are six trig ratios: Sine (sin), cosine (cos), tangent (tan), cosecant (cosec), secant (sec), and cotangent (cot).\u0026lt;br \/\u0026gt;\nGiven a triangle, you should be able to identify all 6 ratios for all angles (except the right angle).\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 explore:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; different types of trigonometric ratios","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.hs300064","TOPIC_ID":"hs300064","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300064.jpg","PUBLIC_BANNER_IMG":"hs300064.jpg","PUBLIC_VIDEO":"pvideo_hs300064.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/zde7q65f7F4","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-23 09:57:14","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;The sides and angles of a triangle are related to each other. The relationships that define the connection between the angles and the sides of a right triangle are expressed in terms of six trigonometric ratios: Sine (sin), cosine (cos), tangent (tan), cosecant (cosec), secant (sec), and cotangent (cot).\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;- Identify the relationship between sides and angles of a triangle.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Explore different types of trigonometric ratios.\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":"Trigonometric Ratios","ADMSUBJECT_ID":"1333","ADMCOURSE_ID":"380","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":"Grade 9","COUNTRY_ID":"342","SHORT_NAME":"ICSE","DOMAIN_NAME":"STEM"},{"CONT_ID":"254","CATEGORY_ID":"1","CONT_TITLE":"Solving Systems of Equations in Two Variables","CONT_SLUG":"solving-system-of-equations-in-two-variables","CONT_TITLE_AR":"Solving System of 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.To solve the system of equations graphically, first of all we graph both the lines and then find the point of intersection. If the lines intersect at only one point, it is known as unique solutions. If the line coincides with each other, then they have infinitely many solutions and if the two lines are parallel, then no solution exists for those equations.\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 a linear equation in two variables using the graphical method.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Differentiate and construct a unique solution.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Differentiate and construct infinitely many solutions.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Differentiate and construct no solution.\u003C\/div\u003E","CONT_DESC_AR":"Solving systems of equations with two variables.\u003C\/br\u003E\r\nA system of a linear equation is comprised of two or more equations, used to find a common solution to the equations.\u003C\/br\u003E\u003C\/br\u003E\r\n\u003Cstrong\u003ELearning Objectives\u003C\/strong\u003E\u003C\/br\u003E\u003C\/br\u003E\r\nAt the end of this simulation, you will be able to:\u003C\/br\u003E\r\n\u2022 solve linear equation in two variable using graphical method\u003C\/br\u003E\r\n\u2022 differentiate and construct unique solution\u003C\/br\u003E\r\n\u2022 differentiate and construct infinitely many solution\u003C\/br\u003E\r\n\u2022 differentiate and construct no solution","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.hs300076","TOPIC_ID":"hs300076","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300076.jpg","PUBLIC_BANNER_IMG":"hs300076.jpg","PUBLIC_VIDEO":"pvideo_hs300076.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/tc7Z4gGoOwU","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-23 09:57:14","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 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.To solve the system of equations graphically, first of all we graph both the lines and then find the point of intersection. If the lines intersect at only one point, it is known as unique solutions. If the line coincides with each other, then they have infinitely many solutions and if the two lines are parallel, then no solution exists for those equations.\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;- Solve a linear equation in two variables using the graphical method.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Differentiate and construct a unique solution.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Differentiate and construct infinitely many solutions.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Differentiate and construct no 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":"Solving System of Equations in Two Variables","ADMSUBJECT_ID":"1333","ADMCOURSE_ID":"380","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":"Grade 9","COUNTRY_ID":"342","SHORT_NAME":"ICSE","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":"2019-07-23 09:57:14","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 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":"1333","ADMCOURSE_ID":"380","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":"Grade 9","COUNTRY_ID":"342","SHORT_NAME":"ICSE","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":"2019-07-23 09:57:14","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":"1333","ADMCOURSE_ID":"380","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":"Grade 9","COUNTRY_ID":"342","SHORT_NAME":"ICSE","DOMAIN_NAME":"STEM"},{"CONT_ID":"225","CATEGORY_ID":"1","CONT_TITLE":"Area Related to Circle","CONT_SLUG":"area-related-to-circles","CONT_TITLE_AR":"Area Related to Circles","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA sector is the part of a circle enclosed by two radii and an intercepted arc of that circle. The segment of a circle is the region bounded by a chord. An annulus is a flat ring shaped object. To find the area of an annulus, a sector, and a segment we actually need to find the fractional part of the area of the entire circle.\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 area of a sector.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the area of a segment.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the area of an annulus.\u003C\/div\u003E","CONT_DESC_AR":"When finding the area of an annulus, sector, and segment you are actually finding a fractional part of the area of the entire circle.\u003C\/br\u003E\u003C\/br\u003E\r\n\u003Cstrong\u003ELearning Objectives\u003C\/strong\u003E\u003C\/br\u003E\u003C\/br\u003E\r\nAt the end of this simulation, you will be able to apply the formula of:\u003C\/br\u003E\r\n\u2022 the area of a sector\u003C\/br\u003E\r\n\u2022 the area of a segment\u003C\/br\u003E\r\n\u2022 the area of an annulus","BACKING_FILE":"hs300020.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.hs300020","TOPIC_ID":"hs300020","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300020.jpg","PUBLIC_BANNER_IMG":"HS300020.jpg","PUBLIC_VIDEO":"pvideo_hs300020.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/z4XP6Ift0Yc","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-23 09:57:14","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 sector is the part of a circle enclosed by two radii and an intercepted arc of that circle. The segment of a circle is the region bounded by a chord. An annulus is a flat ring shaped object. To find the area of an annulus, a sector, and a segment we actually need to find the fractional part of the area of the entire circle.\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 area of a sector.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Find the area of a segment.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Find the area of an annulus.\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":"Area Related to Circles","ADMSUBJECT_ID":"1333","ADMCOURSE_ID":"380","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":"Grade 9","COUNTRY_ID":"342","SHORT_NAME":"ICSE","DOMAIN_NAME":"STEM"},{"CONT_ID":"185","CATEGORY_ID":"1","CONT_TITLE":"Area of a Triangle","CONT_SLUG":"area-of-triangle","CONT_TITLE_AR":"Area of Triangle","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA triangle is a closed figure made of three lines. The area of triangle is the half of the area of parallelogram and is calculated by multiplying length of the base with the height of the triangle and then dividing the product by 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- Identify and formulate the area of a triangle.\u003C\/div\u003E","CONT_DESC_AR":"A triangle is made of three lines.\u003C\/br\u003E\r\nThere are obtuse, acute, right, scalene, isosceles and equilateral triangles.\u003C\/br\u003E\r\nThe area of each type of triangle is equal to one-half the area of the parallelogram.\u003C\/br\u003E\u003C\/br\u003E\r\n\u003Cstrong\u003ELearning Objective\u003C\/strong\u003E\u003C\/br\u003E\u003C\/br\u003E\r\nIn this topic you will be able to:\u003C\/br\u003E\r\n\u2022 identify and formulate the area of a triangle","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.ms300030","TOPIC_ID":"ms300030","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300030.jpg","PUBLIC_BANNER_IMG":"MS300030.jpg","PUBLIC_VIDEO":"pvideo_ms300030.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/k4vh55iP_fM","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-23 09:57:14","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 triangle is a closed figure made of three lines. The area of triangle is the half of the area of parallelogram and is calculated by multiplying length of the base with the height of the triangle and then dividing the product by 2.\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 area of a 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":"Area of Triangle","ADMSUBJECT_ID":"1333","ADMCOURSE_ID":"380","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":"Grade 9","COUNTRY_ID":"342","SHORT_NAME":"ICSE","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":"2019-07-23 09:57:14","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;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":"1333","ADMCOURSE_ID":"380","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":"Grade 9","COUNTRY_ID":"342","SHORT_NAME":"ICSE","DOMAIN_NAME":"STEM"}],"levelObject":[],"contData":{"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":"2018-08-02 12:57:18","CREATED_BY":"2143","UPDATED_ON":"2024-10-08 08:54:01","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","DISPLAY_NAME":"CBSE - Grade 9 - Mathematics","DISPLAY_NAME_AR":"","SUBJECT_IMG":"","ADMSUBJECT_ID":"894","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","ADMCOURSE_ID":"196","COURSE_NAME":"Grade 9","COUNTRY_ID":"288","STANDARD_ID":"288","SHORT_NAME":"CBSE","LANG_ID":null,"LOCALE_TITLE":null,"LOCALE_DESC":null,"DIR":null,"LANG_NAME":null,"DOMAIN_NAME":"STEM","DOMAIN_DESC":"STEM"},"checkLang":["English - US","Espa\u00f1ol","Ti\u1ebfng Vi\u1ec7t"],"devices":["UmetyVR","WebXR"]}