{"pkgId":"67","subjectId":"1356","fullwidthLayout":false,"contentData":{"PACKAGE_NAME":"Malaysia (KSSM) Curriculum Full Access","PACKAGE_SLUG":"malaysia-kssm-full","PACKAGE_IMG":"file_332764030_1592481615.png","ADMCOURSE_ID":"384","COURSE_NAME":"Form 1","COUNTRY_ID":"343","STANDARD_NAME":"Malaysia (KSSM) - Updated","ADMSUBJECT_ID":"1356","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","CAT_NAME":"Quadrilaterals","CONT_ID":"767","CONT_TITLE":"Quadrilaterals","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA quadrilateral is a four-sided closed figure. It is called a parallelogram, if both pairs of opposite sides are parallel. A quadrilateral with at least one pair of parallel sides is known as a trapezium or trapezoid. 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It is called a parallelogram, if both pairs of opposite sides are parallel. A quadrilateral with at least one pair of parallel sides is known as a trapezium or trapezoid. A kite is a quadrilateral whose four sides can be grouped into two pairs of equal length sides that are adjacent to each other.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define the types of quadrilaterals by their sides and angles.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Classify quadrilaterals by their sides and angles.\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.vm000002","TOPIC_ID":"vm000002","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000002.jpg","PUBLIC_BANNER_IMG":"vm000002.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000002.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":"2019-07-26 09:58:51","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 quadrilateral is a four-sided closed figure. It is called a parallelogram, if both pairs of opposite sides are parallel. A quadrilateral with at least one pair of parallel sides is known as a trapezium or trapezoid. A kite is a quadrilateral whose four sides can be grouped into two pairs of equal length sides that are adjacent to each other.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define the types of quadrilaterals by their sides and angles.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Classify quadrilaterals by their sides and angles.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Quadrilaterals","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"766","CATEGORY_ID":"1","CONT_TITLE":"Parallel Lines and Transversal","CONT_SLUG":"parallel-lines-and-transversal","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 transversal is defined as a line or a line segment that intersects two or more other lines or line segments. When a transversal intersects two parallel lines, it produces eight different angles which are classified as corresponding angles, alternate interior angles, alternate exterior angles, vertically opposite angles, and linear pair. The corresponding angles, alternate interior angles, and alternate exterior angles are equal. The pair of interior angles on the same side of the transversal is supplementary.\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 and identify corresponding angles.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define and identify alternate interior and exterior angles.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define and identify the interior and exterior angles of a transversal.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the unknown values of angles by using concepts of transversals.\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.vm000001","TOPIC_ID":"vm000001","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000001.jpg","PUBLIC_BANNER_IMG":"vm000001.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000001.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":"2019-07-26 09:58:51","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 transversal is defined as a line or a line segment that intersects two or more other lines or line segments. When a transversal intersects two parallel lines, it produces eight different angles which are classified as corresponding angles, alternate interior angles, alternate exterior angles, vertically opposite angles, and linear pair. The corresponding angles, alternate interior angles, and alternate exterior angles are equal. The pair of interior angles on the same side of the transversal is supplementary.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define and identify corresponding angles.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define and identify alternate interior and exterior angles.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define and identify the interior and exterior angles of a transversal.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the unknown values of angles by using concepts of transversals.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Parallel Lines and Transversal","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"754","CATEGORY_ID":"1","CONT_TITLE":"Introduction to Percentages","CONT_SLUG":"introduction-to-percentages","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 percentage is defined as a portion of a whole expressed as a number between 0 and 100 instead of a fraction.The percentage is represented by % sign.\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 percentage.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate percentage.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate percentage increase.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate one number as the percentage of another.\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.vm000013","TOPIC_ID":"vm000013","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000013.jpg","PUBLIC_BANNER_IMG":"vm000013.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000013.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":"2019-07-26 09:58:51","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 percentage is defined as a portion of a whole expressed as a number between 0 and 100 instead of a fraction.The percentage is represented by % sign.\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;- Define percentage.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Calculate percentage.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Calculate percentage increase.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Calculate one number as the percentage of another.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Introduction to Percentages","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"746","CATEGORY_ID":"1","CONT_TITLE":"Properties of a Parallelogram","CONT_SLUG":"properties-of-a-parallelogram","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 parallelogram is defined as a special quadrilateral with its opposite sides parallel and equal. The sum of of its four interior angles is 360 degrees. The diagonals of a parallelogram bisect each other. The sum of adjacent angles of a parallelogram is 180 degrees and opposite angles are equal.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Demonstrate how a diagonal of a parallelogram divides it into two congruent triangles.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain the properties of a parallelogram.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify necessary conditions for a quadrilateral to be a parallelogram.\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.vm000005","TOPIC_ID":"vm000005","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_file_1826225161_1581315132.jpg","PUBLIC_BANNER_IMG":"file_1826225161_1581315132.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000005.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":"2019-07-26 09:58:51","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;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A parallelogram is defined as a special quadrilateral with its opposite sides parallel and equal. The sum of of its four interior angles is 360 degrees. The diagonals of a parallelogram bisect each other. The sum of adjacent angles of a parallelogram is 180 degrees and opposite angles are equal.\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;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Demonstrate how a diagonal of a parallelogram divides it into two congruent triangles.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Explain the properties of a parallelogram.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify necessary conditions for a quadrilateral to be a parallelogram.\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Properties of a Parallelogram","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"745","CATEGORY_ID":"1","CONT_TITLE":"Areas of Parallelograms and Triangles","CONT_SLUG":"area-of-parallelograms-and-triangles","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThe area of a triangle is half of the area of parallelogram if both triangles and paralleograms lie between the same parallel lines and have the same base. Alternatively, the area of a parallelogram is twice the area of triangle that lies between its pair of parallel sides and has one of its side as the base.\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 figures that have a common base and are between the same parallel lines.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain that the area of a triangle is equal to half the area of a parallelogram if both have the same base and lie between the same parallel lines.\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.vm000004","TOPIC_ID":"vm000004","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000004.jpg","PUBLIC_BANNER_IMG":"vm000004.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000004.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":"2019-07-26 09:58:51","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;The area of a triangle is half of the area of parallelogram if both triangles and paralleograms lie between the same parallel lines and have the same base. Alternatively, the area of a parallelogram is twice the area of triangle that lies between its pair of parallel sides and has one of its side as the base.\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 figures that have a common base and are between the same parallel lines.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Explain that the area of a triangle is equal to half the area of a parallelogram if both have the same base and lie between the same parallel lines.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Area of Parallelograms and Triangles","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"744","CATEGORY_ID":"1","CONT_TITLE":"Parallelograms","CONT_SLUG":"parallelograms","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 parallelogram can be defined as a special quadrilateral having opposite sides equal and parallel. A diagonal of a parallelogram divides it into two congruent triangles. The sum of all the interior angles of a parallelogram is 360 degrees.\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 formation of a parallelogram using congruent triangles.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Formulate the area of a parallelogram.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain the angle sum property.\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.vm000003","TOPIC_ID":"vm000003","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000003.jpg","PUBLIC_BANNER_IMG":"vm000003.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000003.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":"2019-07-26 09:58:51","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 parallelogram can be defined as a special quadrilateral having opposite sides equal and parallel. A diagonal of a parallelogram divides it into two congruent triangles. The sum of all the interior angles of a parallelogram is 360 degrees.\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;- Explain the formation of a parallelogram using congruent triangles.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Formulate the area of a parallelogram.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Explain the angle sum property.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Parallelograms","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"743","CATEGORY_ID":"1","CONT_TITLE":"Solve Inequality by Addition or Subtraction","CONT_SLUG":"inequalities-solve-by-addition-or-subtraction","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA linear inequality in one variable is an algebraic statement that expresses either a less than or a greater than relationship between two linear expressions. For example, x + 3 \u003E \u22129 is a linear inequality. Solving inequalities is similar to solving 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 inequalities using addition and subtraction.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find solution sets of inequalities.\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.vm000050","TOPIC_ID":"vm000050","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000050.jpg","PUBLIC_BANNER_IMG":"vm000050.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000050.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":"2019-07-26 09:58:51","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A linear inequality in one variable is an algebraic statement that expresses either a less than or a greater than relationship between two linear expressions. For example,\u0026amp;nbsp; x + 3 \u0026amp;gt; \u22129 is a linear inequality. Solving inequalities is similar to solving equations.\u0026amp;nbsp;\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;- Solve inequalities using addition and subtraction.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find solution sets of inequalities.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Inequalities: Solve by Addition or Subtraction","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"736","CATEGORY_ID":"1","CONT_TITLE":"Classification of Angles","CONT_SLUG":"classification-of-angles","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\u003EAngles are classified as straight, right, acute, or obtuse. An angle is a fraction of a 360\u00b0 circle. A straight angle is the same as half of the circle and its measure is 180\u00b0. A right angle is a quarter of a circle and its measure is 90\u00b0. A protractor can be used to measure angles.\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 and identify an acute angle.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define and identify a right angle.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define and identify an obtuse angle.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define and identify a straight angle.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define and identify a reflex angle.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define and identify a complete angle.\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.vm000055","TOPIC_ID":"vm000055","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000055.jpg","PUBLIC_BANNER_IMG":"vm000055.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000055.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":"2019-07-26 09:58:51","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;Angles are classified as straight, right, acute, or obtuse. An angle is a fraction of a 360\u00b0 circle. A straight angle is the same as half of the circle and its measure is 180\u00b0. A right angle is a quarter of a circle and its measure is 90\u00b0. A protractor can be used to measure angles.\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:\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define and identify an acute angle.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define and identify a right angle.\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define and identify an obtuse angle.\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define and identify a straight angle.\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define and identify a reflex angle.\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define and identify a complete angle.\u0026amp;nbsp;\u0026amp;nbsp;\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Classification of Angles","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"735","CATEGORY_ID":"1","CONT_TITLE":"Descriptive Statistics","CONT_SLUG":"descriptive-statistics","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EDescriptive statistics describe, show, or summarize a collected set of data in a meaningful way. Box-and-whisker plots are a common method of summarizing data. In box-and-whisker plots, the ends of the box are the upper and lower quartiles, the median is marked by a vertical line inside the box and the whiskers are the two lines outside the box that extend to the highest and lowest data points.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Display data graphically and interpret box plots.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Recognize, describe, and calculate the upper quartile, median, and lower quartile of a set of data.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000082","TOPIC_ID":"vm000082","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000082.jpg","PUBLIC_BANNER_IMG":"vm000082.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000082.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Descriptive statistics describe, show, or summarize a collected set of data in a meaningful way. Box-and-whisker plots are a common method of summarizing data. In box-and-whisker plots, the ends of the box are the upper and lower quartiles, the median is marked by a vertical line inside the box and the whiskers are the two lines outside the box that extend to the highest and lowest data points.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Display data graphically and interpret box plots.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Recognize, describe, and calculate the upper quartile, median, and lower quartile of a set of data.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Descriptive Statistics","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"734","CATEGORY_ID":"1","CONT_TITLE":"Integers: Multiplication and Division","CONT_SLUG":"integers-multiplication-and-division","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 integer is a whole number that can be positive, negative, or zero. Examples of integers are: -5, 1, 5, 8, and 97. Examples of numbers that are not integers are: -1.43, 1 3\/4, 3.14. To multiply or divide integers with positive or negative signs, always multiply or divide the absolute values and then determine the sign of the answer. The product of two positive integers or two negative integers is positive. The product of a positive integer and a negative integer is negative.\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 integers.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Multiply and divide signed integers.\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.vm000029","TOPIC_ID":"vm000029","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000029.jpg","PUBLIC_BANNER_IMG":"vm000029.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000029.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":"2019-07-26 09:58:51","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;An integer is a whole number that can be positive, negative, or zero. Examples of integers are: -5, 1, 5, 8, and 97. Examples of numbers that are not integers are: -1.43, 1 3\/4, 3.14. To multiply or divide integers with positive or negative signs, always multiply or divide the absolute values and then determine the sign of the answer. The product of two positive integers or two negative integers is positive. The product of a positive integer and a negative integer is negative.\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 integers.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Multiply and divide signed integers.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Integers: Multiplication and Division","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"733","CATEGORY_ID":"1","CONT_TITLE":"Percent and Estimation","CONT_SLUG":"percentage-and-estimation","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\u003EEstimating percentages is easy and can be helpful in situations such as shopping at discount sales. To estamate the value for n% of x, first round both n and x to numbers that are easy to work with. Then multiply the rounded numbers. finally, divide the result by 100.\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 percentage.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Estimate percentage.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Apply the concept of percentage 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.vm000037","TOPIC_ID":"vm000037","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000037.jpg","PUBLIC_BANNER_IMG":"vm000037.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000037.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":"2019-07-26 09:58:51","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;Estimating percentages is easy and can be helpful in situations such as shopping at discount sales. To estamate the value for n% of x, first round both n and x to numbers that are easy to work with. Then multiply the rounded numbers. finally, divide the result by 100.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define percentage.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Estimate percentage.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Apply the concept of percentage 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":"Percentage and Estimation","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"731","CATEGORY_ID":"1","CONT_TITLE":"Percent and Proportion","CONT_SLUG":"percent-and-proportion","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\u003EPercent proportion is when a given part of quantity is compared to its whole quantity using a percent. This can be calculated by using the formula: Percentage = part x100 \/ Base. For example, to find the percent proportion represented by 1\/5, substitute part =1, Base =5 in the formula which produces 20%.\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 percent proportion.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Describe the relationship between percent and proportion.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Apply percent proportions 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.vm000034","TOPIC_ID":"vm000034","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000034.jpg","PUBLIC_BANNER_IMG":"vm000034.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000034.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":"2019-07-26 09:58:51","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;Percent proportion is when a given part of quantity is compared to its whole quantity using a percent. This can be calculated by using the formula: Percentage = part x100 \/ Base. For example, to find the percent proportion represented by 1\/5, substitute part =1, Base =5 in the formula which produces 20%.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define percent proportion.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Describe the relationship between percent and proportion.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Apply percent proportions 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":"The Percent Proportions","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"727","CATEGORY_ID":"1","CONT_TITLE":"Compare and Order Rational Numbers","CONT_SLUG":"rational-numbers-compare-and-order","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 rational number is defined as the ratio of an integer p to some non zero integer q. To compare any two or more rational numbers, they can be converted into like fractions by making their denominators the same.\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 rational numbers.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Compare rational numbers that have the same denominator.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Compare rational numbers that have different denominators.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Place rational numbers in sequence by magnitude.\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.vm000022","TOPIC_ID":"vm000022","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000022.jpg","PUBLIC_BANNER_IMG":"vm000022.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000022.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":"2019-07-26 09:58:51","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 rational number is defined as the ratio of an integer p to some non zero integer q. To compare any two or more rational numbers, they can be converted into like fractions by making their denominators the same.\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;- Explain rational numbers.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Compare rational numbers that have the same denominator.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Compare rational numbers that have different denominators.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Place rational numbers in sequence by magnitude.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Rational Numbers: Compare and Order","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"726","CATEGORY_ID":"1","CONT_TITLE":"Rational Numbers","CONT_SLUG":"rational-numbers","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 rational number is defined as the ratio of an integer p to some non zero integer q. A number that cannot be expressed as a ratio between two integers and is not an imaginary number is known as irrational number. If written in decimal notation, a rational number ends with a finite number of digits to the right of the decimal point, or they can have repetitive digits to the right of the decimal point. 2\/5 and 2\/3 are rational numbers. Irrational numbers have an infinite number of digits to the right of the decimal point, without repetition. Pi and the square root of 2 (\u221a2) are irrational numbers.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify rational numbers in fractional or decimal formats.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify terminating and non-terminating decimals.\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.vm000021","TOPIC_ID":"vm000021","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000021.jpg","PUBLIC_BANNER_IMG":"vm000021.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000021.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":"2019-07-26 09:58:51","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 rational number is defined as the ratio of an integer p to some non zero integer q. A number that cannot be expressed as a ratio between two integers and is not an imaginary number is known as irrational number. If written in decimal notation, a rational number ends with a finite number of digits to the right of the decimal point, or they can have repetitive digits to the right of the decimal point. 2\/5 and 2\/3 are rational numbers. Irrational numbers have an infinite number of digits to the right of the decimal point, without repetition. Pi and the square root of 2 (\u221a2) are irrational numbers.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify rational numbers in fractional or decimal formats.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify terminating and non-terminating decimals.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Rational Numbers","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","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":"2019-07-26 09:58:51","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":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"544","CATEGORY_ID":"1","CONT_TITLE":"Identify and Graph Integers","CONT_SLUG":"identify-and-graph-integers","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 set of integers includes zero, negative and positive numbers without any decimal or fractional parts. To graph integers, we take a number line with 0 in the middle and place all the positive integers on the right side of 0 and all the negative integers on the left side of 0. The integers are placed at equal spaces.\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- Describe positive integers.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Describe negative integers.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Locate positive and negative integers on a number line.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":"ms300149.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300149","TOPIC_ID":"ms300149","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300149.jpg","PUBLIC_BANNER_IMG":"MS300149.jpg","PUBLIC_VIDEO":"pvideo_ms300149.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/L8d9fCkltgY","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","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 set of integers includes zero, negative and positive numbers without any decimal or fractional parts. To graph integers, we take a number line with 0 in the middle and place all the positive integers on the right side of 0 and all the negative integers on the left side of 0. The integers are placed at equal spaces.\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;- Describe positive integers.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Describe negative integers.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Locate positive and negative integers on a number line.\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Identify and Graph Integers","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"542","CATEGORY_ID":"1","CONT_TITLE":"Simplification of a Complex Fraction","CONT_SLUG":"simplify-a-complex-fraction","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 complex fraction is a fraction where the numerator, denominator, or both contain a fraction. For example (2\/3)\/(6\/7).\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify a complex fraction.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Simplify a complex fraction.\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.ms300144","TOPIC_ID":"ms300144","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300144.jpg","PUBLIC_BANNER_IMG":"ms300144.jpg","PUBLIC_VIDEO":"pvideo_ms300144.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/AWnDoYUtReM","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A complex fraction is a fraction where the numerator, denominator, or both contain a fraction. For example (2\/3)\/(6\/7).\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify a complex fraction.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Simplify a complex fraction.\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":"Simplify a Complex Fraction","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","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":"2019-07-26 09:58:51","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"Overview:\u0026lt;br\u0026gt;\u0026lt;br\u0026gt;A 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":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"535","CATEGORY_ID":"1","CONT_TITLE":"Solving Two Step Inequalities","CONT_SLUG":"solve-two-step-inequality","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAn inequality is a sentence built from expressions using one or more of the symbols \r\n\u003C,\u003E, \u2264, or \u2265. Two step inequalities means the system of inequalities which can be solved only in two steps.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Solve inequalities in two steps.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300133","TOPIC_ID":"ss300133","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300133.jpg","PUBLIC_BANNER_IMG":"SS300133.jpg","PUBLIC_VIDEO":"pvideo_ss300133.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/bdkNNR5Anr4","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;An inequality is a sentence built from expressions using one or more of the symbols \u0026amp;lt;, \u0026amp;gt;, \u2264, or \u2265. Two step inequalities means the system of inequalities which can be solved only in two steps.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objective\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Solve inequalities in two steps.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Solve Two Step Inequality","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"532","CATEGORY_ID":"1","CONT_TITLE":"Properties of Quadrilaterals","CONT_SLUG":"properties-of-quadrilaterals","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 quadrilateral is a four sided two dimensional closed figure, made up of straight sides. The sum of all the interior angles is equal to 360 degrees. Different types of quadrilaterals have different properties. For example in parallelogram, opposite sides and angles are equal and the sum of adjacent angles is 180 degree.\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 properties of different quadrilaterals.\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.ms300122","TOPIC_ID":"ms300122","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300122.jpg","PUBLIC_BANNER_IMG":"MS300122.jpg","PUBLIC_VIDEO":"pvideo_ms300122.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/9vST38Cr7Bw","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A quadrilateral is a four sided two dimensional closed figure, made up of straight sides. The sum of all the interior angles is equal to 360 degrees. Different types of quadrilaterals have different properties. For example in parallelogram, opposite sides and angles are equal and the sum of adjacent angles is 180 degree.\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 properties of different quadrilaterals.\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":"Properties of quadrilateral","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","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":"2019-07-26 09:58:51","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;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":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"384","CATEGORY_ID":"1","CONT_TITLE":"Convert Unit Rates","CONT_SLUG":"convert-unit-rates","CONT_TITLE_AR":"Convert unit rates","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EWhen rates are expressed as a quantity of 1, such as 2 feet per second or 5 miles per hour, they are called unit rates. If you have a multiple-unit rate such as 120 students for every 3 buses, and want to find the single-unit rate, write a ratio equal to the multiple-unit rate with 1 as the second term.\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 rates.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find unit rate.\u003C\/div\u003E","CONT_DESC_AR":"\u0026lt;p\u0026gt;The unit rate can be calculated by finding the value of a single unit. For example if the cost of 10 apples is $3 then the cost of 1 apple will be $0.25.\u0026lt;br \/\u0026gt;\nUsing unit rate method we can compare the price of different things.\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 : \u0026amp;nbsp; \u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026amp;bull; identify rates\u0026lt;br \/\u0026gt;\n\u0026amp;bull; find unit rate\u0026lt;\/p\u0026gt;\n","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.ms300117","TOPIC_ID":"ms300117","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300117.jpg","PUBLIC_BANNER_IMG":"MS300117.jpg","PUBLIC_VIDEO":"pvideo_ms300117.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/2vpIBNmS9dY","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","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;When rates are expressed as a quantity of 1, such as 2 feet per second or 5 miles per hour, they are called unit rates. If you have a multiple-unit rate such as 120 students for every 3 buses, and want to find the single-unit rate, write a ratio equal to the multiple-unit rate with 1 as the second term.\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 rates.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Find unit rate.\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":"Convert Unit Rates","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"381","CATEGORY_ID":"1","CONT_TITLE":"Fractions and Decimals","CONT_SLUG":"fractions-and-decimals","CONT_TITLE_AR":"Fractions and Decimals","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA fraction represents the part of a whole. To convert a fraction to a decimal, we need to find a number which we can multiply with denominator of that fraction to make it 10, or 100, or 1000, or any 1 followed by 0s. Then multiply both the top and bottom values by that number.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define decimals, mixed numbers, whole numbers, fractions, place values, and expanded form.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify the whole number and the fractional parts of a decimal.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Recognize connections between decimal numbers and place values.\u003C\/div\u003E","CONT_DESC_AR":"To convert a fraction to a decimal, find a number you can multiply by the bottom of the fraction to make it 10, or 100, or 1000, or any 1 followed by 0s.\u0026lt;br \/\u0026gt;\nThen multiply both the top and bottom values by that number.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\nAfter going through this simulation, you are now able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; recognize and write a fraction\u0026lt;br \/\u0026gt;\n\u0026amp;bull; identify the whole number and the fractional part of a mixed fraction\u0026lt;br \/\u0026gt;\n\u0026amp;bull; compute the place value of digits in a decimal number\u0026lt;br \/\u0026gt;\n\u0026amp;bull; convert a fraction into a decimal.","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.ms300083","TOPIC_ID":"ms300083","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300083.jpg","PUBLIC_BANNER_IMG":"ms300083.jpg","PUBLIC_VIDEO":"pvideo_ms300083.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/jmf66Oggm6I","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","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 fraction represents the part of a whole. To convert a fraction to a decimal, we need to find a number which we can multiply with denominator of that fraction to make it 10, or 100, or 1000, or any 1 followed by 0s. Then multiply both the top and bottom values by that number.\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 decimals, mixed numbers, whole numbers, fractions, place values, and expanded form.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify the whole number and the fractional parts of a decimal.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Recognize connections between decimal numbers and place values.\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":"Fraction and Decimals","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"373","CATEGORY_ID":"1","CONT_TITLE":"Linear Equations in One Variable","CONT_SLUG":"linear-equation-in-one-variable","CONT_TITLE_AR":"Linear Equation in One Variable","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA linear equation in defined as the equation of the form ax = b where a is not equal to zero. An equation in one variable gives a straight line when plotted on a graph.\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 = b.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Write a linear equation in one variable to represent a given statement.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Simplify a linear equation in one variable.\u003C\/div\u003E","CONT_DESC_AR":"An equation in one variable gives a straight line when plotted on a graph.\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; express the linear equation in the form of ax = b\u0026lt;br \/\u0026gt;\n\u0026amp;bull; write a linear equation in one variable to represent a given statement\u0026lt;br \/\u0026gt;\n\u0026amp;bull; simplify the linear equation in one variable","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.hs300054","TOPIC_ID":"hs300054","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_HS300054.jpg","PUBLIC_BANNER_IMG":"hs300054.jpg","PUBLIC_VIDEO":"pvideo_hs300054.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/uohuOst-4-8","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A linear equation in defined as the equation of the form ax = b where a is not equal to zero. An equation in one variable gives a straight line when plotted on a graph.\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives:\u0026lt;\/p\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 = b.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Write a linear equation in one variable to represent a given statement.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Simplify a linear equation in one variable.\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 Equation in One Variable","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"362","CATEGORY_ID":"1","CONT_TITLE":"Types of Triangles","CONT_SLUG":"types-of-triangles","CONT_TITLE_AR":"Types of Triangles","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. On the basis of angles, the triangles are classified as obtuse, acute and right angled triangles. On the basis of sides, triangles are classified as scalene, isosceles and equilateral triangles.\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 explore different types of triangles on the basis of their sides.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify and explore different types of triangles on the basis of their angles.\u003C\/div\u003E","CONT_DESC_AR":"Scalene triangle: a triangle with no equal angles and no equal sides. Isosceles triangle: a triangle having two equal angles and two equal sides.\u0026lt;br \/\u0026gt;\nEquilateral triangle: a triangle having three equal sides and three equal angles of 60\u0026lt;sup\u0026gt;0\u0026lt;\/sup\u0026gt; each.\u0026lt;br \/\u0026gt;\nRight triangle: a triangle with one right angle of 90\u0026amp;deg;.\u0026lt;br \/\u0026gt;\nAcute Triangle: a triangle having all angles less than 90\u0026amp;deg;.\u0026lt;br \/\u0026gt;\nObtuse Triangle: a triangle having an angle greater than 90\u0026amp;deg;.\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;\nAt the end of simulation, you will be familiar with the different types of triangles.","BACKING_FILE":"ms300034.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300034","TOPIC_ID":"ms300034","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300034.jpg","PUBLIC_BANNER_IMG":"ms300034.jpg","PUBLIC_VIDEO":"pvideo_ms300034.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/yNezS9CFPsA","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","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. On the basis of angles, the triangles are classified as obtuse, acute and \u0026amp;nbsp;right angled triangles. On the basis of sides, triangles are classified as scalene, isosceles and equilateral triangles.\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 explore different types of triangles on the basis of their sides.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify and explore different types of triangles on the basis of their angles.\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":"Types of Triangles","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"321","CATEGORY_ID":"1","CONT_TITLE":"Percentage","CONT_SLUG":"percentage","CONT_TITLE_AR":"Percentage","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA percentage is defined as a portion of a whole expressed as a number between 0 and 100 instead of a fraction. The percentage is represented by % sign.\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 percentage.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate percentage.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate discount and discounted price.\u003C\/div\u003E","CONT_DESC_AR":"A percentage is a number or ratio expressed as a fraction of 100. It is often denoted using the percent sign, % or the abbreviations pct, pct, sometimes the abbreviation pc is also used. A percentage is a dimensionless number (pure number).\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:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; define percentage\u0026lt;br \/\u0026gt;\n\u0026amp;bull; calculate percentage\u0026lt;br \/\u0026gt;\n\u0026amp;bull; calculate discount and discounted price","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.ms300037","TOPIC_ID":"ms300037","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300037.jpg","PUBLIC_BANNER_IMG":"MS300037.jpg","PUBLIC_VIDEO":"pvideo_ms300037.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/hOyh3_T4eik","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","CREATED_BY":"0","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A percentage is defined as a portion of a whole expressed as a number between 0 and 100 instead of a fraction. The percentage is represented by % sign.\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 percentage.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Calculate percentage.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Calculate discount and discounted price.\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":"Percentage","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","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":"2019-07-26 09:58:51","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":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","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":"2019-07-26 09:58:51","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":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"237","CATEGORY_ID":"1","CONT_TITLE":"Polygons","CONT_SLUG":"polygons","CONT_TITLE_AR":"Polygons","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA polygon is a two dimensional closed shape formed with straight lines. Triangles, quadrilaterals, pentagons, and hexagons are some of its examples. The first suffix in the name of a polygons tells about the number of sides that the polygon have. For example, in triangle, \u0026#039;tri\u0026#039; means 3 sides.\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 polygons and non polygons.\u003C\/div\u003E","CONT_DESC_AR":"A polygon is any 2-dimensional shape formed with straight lines. Triangles, quadrilaterals, pentagons, and hexagons are all examples of\u0026amp;nbsp;polygons. The name tells you how many sides the shape has. For example, a triangle has three sides, and a quadrilateral has four sides.\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objective\u0026lt;\/strong\u0026gt;\n\u0026lt;p\u0026gt;\u0026lt;br \/\u0026gt;\nAt the end of simulation you will be able to identify polygons.\u0026lt;\/p\u0026gt;\n","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.ms300041","TOPIC_ID":"ms300041","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300041.jpg","PUBLIC_BANNER_IMG":"MS300041.jpg","PUBLIC_VIDEO":"pvideo_ms300041.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/hZrn_cF9g30","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","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 polygon is a two dimensional closed shape formed with straight lines. Triangles, quadrilaterals, pentagons, and hexagons are some of its examples. The first suffix in the name of a polygons tells about the number of sides that the polygon have. For example, in triangle, \u0026#039;tri\u0026#039; means 3 sides.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objective\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify polygons and non polygons.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\r\n","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Polygons","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"206","CATEGORY_ID":"1","CONT_TITLE":"Pie Chart","CONT_SLUG":"pie-chart","CONT_TITLE_AR":"Pie Chart","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA pie chart is a graph in which a circle is divided into sectors and each sector represents a proportion of the whole.\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 sector and pie chart.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify the parts of a pie chart.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Examine pie chart presented in examples.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Recognize that pie chart provide a visual representation of the whole and its parts.\u003C\/div\u003E","CONT_DESC_AR":"A Pie chart is a type of graph in which a circle is divided into sectors and each sector represents a proportion of the whole.\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; define circle graph, sector, and pie chart\u0026lt;br \/\u0026gt;\n\u0026amp;bull; identify the parts of a circle graph\u0026lt;br \/\u0026gt;\n\u0026amp;bull; examine circle graphs presented in examples\u0026lt;br \/\u0026gt;\n\u0026amp;bull; recognize that circle graphs provide a visual presentation of the whole and its parts\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;","BACKING_FILE":"ms300039.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300039","TOPIC_ID":"ms300039","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300039.jpg","PUBLIC_BANNER_IMG":"ms300039.jpg","PUBLIC_VIDEO":"pvideo_ms300039.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/GAUfxh48fsU","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","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 pie chart is a graph in which a circle is divided into sectors and each sector represents a proportion of the whole.\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 sector and pie chart.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify the parts of a pie chart.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Examine pie chart presented in examples.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Recognize that pie chart provide a visual representation of the whole and its parts.\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":"Pie chart","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"198","CATEGORY_ID":"1","CONT_TITLE":"Ratio","CONT_SLUG":"ratio","CONT_TITLE_AR":"Ratio","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA ratio is defined as the relationship between two groups or amounts that expresses how much an amount or group is bigger than the other.\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 ratios.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify equivalent ratios.\u003C\/div\u003E","CONT_DESC_AR":"A ratio is the quantitative relationship between two amounts showing the number of times one value contains or is contained within the other activity to find equal ratios.\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;\nAt the end of simulation you will learn about 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.ms300036","TOPIC_ID":"ms300036","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300036.jpg","PUBLIC_BANNER_IMG":"ms300036.jpg","PUBLIC_VIDEO":"pvideo_ms300036.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/kxaGcnXZL7A","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","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 ratio is defined as the relationship between two groups or amounts that expresses how much an amount or group is bigger than the other.\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 ratios.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify equivalent ratios.\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":"Ratio","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"196","CATEGORY_ID":"1","CONT_TITLE":"Graphing Linear Inequalities in One Variable","CONT_SLUG":"graphing-linear-inequalities-in-one-variable","CONT_TITLE_AR":"Graphing Linear Inequalities in One Variable","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA linear inequality in one variable is defined as an algebraic statement that relates a linear expression (with one variable) with a constant by \u003E, \u003C, \u2265, and \u2264 sign instead of =. For example, x \u2264 5. x + 3 \u003E \u2212 9. a \u2265 \u2212 11. \u003C\/div\u003E \r\n\u003Cdiv\u003EThe graph of a linear inequality in one variable is a number line in which we use open circle for \u003C and \u003E and a closed circle for \u2264 and \u2265. \u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define an inequality in one variable.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Relate a linear equation with a linear inequality in one variable.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Use different methods of graphing an inequality in one variable to find its solution.\u003C\/div\u003E","CONT_DESC_AR":"A linear inequality is an inequality which involves a linear function.\u003C\/br\u003E\r\nA linear inequality contains one of the symbols of inequality, \u003C is less than,  \u003E is greater than.\u003C\/br\u003E\r\n\u2264 is less than or equal to.\u003C\/br\u003E\r\nA linear inequality in one variable can be solved in a similar way as we solved a linear equation with one variable.\u003C\/br\u003E\u003C\/br\u003E\r\n\u003Cstrong\u003ELearning Objectives\u003C\/strong\u003E\u003C\/br\u003E\u003C\/br\u003E\r\nIn this simulation, you will be able to:\u003C\/br\u003E\r\n\u2022 define inequality\u003C\/br\u003E\r\n\u2022 relate linear equations with linear inequality\u003C\/br\u003E\r\n\u2022 use different methods of graphing inequality in one variable to find its solution","BACKING_FILE":"ss300007.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300007","TOPIC_ID":"ss300007","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300007.jpg","PUBLIC_BANNER_IMG":"SS300007.jpg","PUBLIC_VIDEO":"pvideo_ss300007.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/ZXP9i7B47ec","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;A linear inequality in one variable is defined as an algebraic statement that relates a linear expression (with one variable) with a constant by \u0026amp;gt;, \u0026amp;lt;, \u2265, and \u2264\u0026amp;nbsp; sign instead of\u0026amp;nbsp; =. For example, x \u2264 5. x + 3 \u0026amp;gt; \u2212 9. a \u2265 \u2212 11.\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;The graph of a linear inequality in one variable is a number line in which we use open circle for \u0026amp;lt; and \u0026amp;gt; and a closed circle for \u2264 and \u2265.\u0026amp;nbsp;\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Define an inequality in one variable.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Relate a linear equation with a linear inequality in one variable.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Use different methods of graphing an inequality in one variable to find its solution.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Graphing Linear Inequalities in One Variable","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"193","CATEGORY_ID":"1","CONT_TITLE":"Lines and Angles","CONT_SLUG":"lines-and-angles","CONT_TITLE_AR":"Lines and Angles","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA transversal defined as a line or a line segment that intersects two or more other lines or line segments. When a transversal intersects two parallel lines,we will get eight different angles which are classified as corresponding angles, alternate interior angles, alternate exterior angles, vertically opposite angles and linear pair. The corresponding angles, alternate interior angles and alternate exterior angles are equal. The pair of interior angles on the same side of the transversal is supplementary.\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 corresponding angles.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify alternate interior angles.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify alternate exterior angles.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify interior angles formed by the transversal.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify exterior angles formed by the transversal.\u003C\/div\u003E","CONT_DESC_AR":"When a transversal intersects two parallel lines, the corresponding angles are equal.\u0026lt;br \/\u0026gt;\nThe alternate exterior angles are equal.\u0026lt;br \/\u0026gt;\nThe pair of interior angles on the same side of the transversal is supplementary.\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; identify linear pairs of an angle\u0026lt;br \/\u0026gt;\n\u0026amp;bull; learn the concept of vertical opposite angles, corresponding angles, and alternate interior angles\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;","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.ms300033","TOPIC_ID":"ms300033","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300033.jpg","PUBLIC_BANNER_IMG":"MS300033.jpg","PUBLIC_VIDEO":"pvideo_ms300033.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/VaNpb6114iI","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","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 transversal defined as a line or a line segment that intersects two or more other lines or line segments. When a transversal intersects two parallel lines,we will get eight different angles which are classified as corresponding angles, alternate interior angles, alternate exterior angles, vertically opposite angles and linear pair. The corresponding angles, alternate interior angles and alternate exterior angles are equal. The pair of interior angles on the same side of the transversal is supplementary.\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 corresponding angles.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify alternate interior angles.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify alternate exterior angles.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify interior angles formed by the transversal.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify exterior angles formed by the transversal.\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":"Lines and Angles","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"189","CATEGORY_ID":"1","CONT_TITLE":"Venn Diagram","CONT_SLUG":"venn-diagram","CONT_TITLE_AR":"Venn Diagram","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA Venn diagram is a diagram representing mathematical or logical sets pictorially as circles or closed curves within an enclosed rectangle (the universal set), with common elements of the different sets being represented by intersections of the circles.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Form Venn diagrams of sets.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Form Venn diagrams for real life situations.\u003C\/div\u003E","CONT_DESC_AR":"A Venn diagram is a diagram representing mathematical or logical sets pictorially as circles or closed curves within an enclosed rectangle (the universal set), with common elements of the different sets being represented by intersections of the circles.\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;\u0026lt;br \/\u0026gt;\n\u0026lt;strong\u0026gt;Learning Objectives\u0026lt;\/strong\u0026gt;\u0026lt;br \/\u0026gt;\n\u0026lt;br \/\u0026gt;\nIn this topic you will be able to:\u0026lt;br \/\u0026gt;\n\u0026amp;bull; make a Venn diagram of sets\u0026lt;br \/\u0026gt;\n\u0026amp;bull; determine a Venn diagram in real life situations\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;","BACKING_FILE":"ss300004.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ss300004","TOPIC_ID":"ss300004","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_SS300004.jpg","PUBLIC_BANNER_IMG":"SS300004.jpg","PUBLIC_VIDEO":"pvideo_ss300004.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/6cwmDQ6Ajuo","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;div\u0026gt;Overview:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;A Venn diagram is a diagram representing mathematical or logical sets pictorially as circles or closed curves within an enclosed rectangle (the universal set), with common elements of the different sets being represented by intersections of the circles.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;Learning Objectives:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Form Venn diagrams of sets.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Form Venn diagrams for real life situations.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Venn Diagram","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","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":"2019-07-26 09:58:51","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":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","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":"2019-07-26 09:58:51","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":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"179","CATEGORY_ID":"1","CONT_TITLE":"Bar Graph","CONT_SLUG":"bar-graph","CONT_TITLE_AR":"Bar Graph","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA bar graph is represented by a diagram in which the numeric values are represented by the height or length of lines or rectangles of equal width.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define a bar graph.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify the components of bar graph.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain a plotted bar graph.\u003C\/div\u003E","CONT_DESC_AR":"Bar graph is a diagram in which the numerical values of variables are represented by the height or length of lines or rectangles of equal width.\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; define bar graph, title, label, and scale\u0026lt;br \/\u0026gt;\n\u0026amp;bull; identify the parts of a bar graph\u0026lt;br \/\u0026gt;\n\u0026amp;bull; examine a bar graph\u0026lt;br \/\u0026gt;\n\u0026amp;bull; interpret information from a bar graph\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;","BACKING_FILE":"ms300044.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300044","TOPIC_ID":"ms300044","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300044.jpg","PUBLIC_BANNER_IMG":"ms300044.jpg","PUBLIC_VIDEO":"pvideo_ms300044.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/WebewklcTI8","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","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 bar graph is represented by a diagram in which the numeric values are represented by the height or length of lines or rectangles of equal width.\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 a bar graph.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Identify the components of bar graph.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Explain a plotted bar graph.\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":"Bar Graph","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"177","CATEGORY_ID":"1","CONT_TITLE":"Types of Quadrilaterals","CONT_SLUG":"types-of-quadrilaterals","CONT_TITLE_AR":"Types of Quadrilateral","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EA quadrilateral is a four sides closed figure. A quadrilateral is called a parallelogram, if both pairs of its opposite sides are parallel. A parallelogram is called a rectangle if all of its angles are right angles. A rhombus is a simple quadrilateral whose four sides are of same length. A square is a quadrilateral, such that it has four equal sides and four equal angles of 90 degrees. A quadrilateral with at least one pair of parallel sides is known as a trapezium. A kite is a quadrilateral whose four sides can be grouped into two pairs of equal length sides that are adjacent to each other.\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 a quadrilateral.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Differentiate between different types of quadrilaterals.\u003C\/div\u003E","CONT_DESC_AR":"Different types of quadrilaterals are introduced with a definition and its properties, along with the diagram.\u0026lt;br \/\u0026gt;\nA quadrilateral is called a parallelogram, if both pairs of its opposite sides are parallel.\u0026lt;br \/\u0026gt;\nA parallelogram is called a rectangle if all of its angles are right angles.\u0026lt;br \/\u0026gt;\nA rhombus is a simple quadrilateral whose four sides are of same length.\u0026lt;br \/\u0026gt;\nA square is a quadrilateral, such that it has four equal sides and four equal angles are of 90-degrees.\u0026lt;br \/\u0026gt;\nA quadrilateral with at least one pair of parallel sides is known as a trapezium.\u0026lt;br \/\u0026gt;\nA kite is a quadrilateral whose four sides can be grouped into two pairs of equal-length sides that are adjacent to each other.\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; explore and identify quadrilaterals\u0026lt;br \/\u0026gt;\n\u0026amp;bull; differentiate types of quadrilater","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.ms300028","TOPIC_ID":"ms300028","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300028.jpg","PUBLIC_BANNER_IMG":"ms300028.jpg","PUBLIC_VIDEO":"pvideo_ms300028.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/A_Z3ZAAkY8g","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A quadrilateral is a four sides closed figure. A quadrilateral is called a parallelogram, if both pairs of its opposite sides are parallel. A parallelogram is called a rectangle if all of its angles are right angles. A rhombus is a simple quadrilateral whose four sides are of same length. A square is a quadrilateral, such that it has four equal sides and four equal angles of 90 degrees. A quadrilateral with at least one pair of parallel sides is known as a trapezium. A kite is a quadrilateral whose four sides can be grouped into two pairs of equal length sides that are adjacent to each other.\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 a quadrilateral.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Differentiate between different types of quadrilaterals.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Types of Quadrilateral","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"25","CATEGORY_ID":"1","CONT_TITLE":"Finding Square Root and Cube Root","CONT_SLUG":"finding-square-root-and-cube-root","CONT_TITLE_AR":"Finding Square root and Cube root","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThe square root of a number is a value that, when multiplied by itself, gives the number. For 4 \u00d7 4 = 16, the square root of 16 will be 4. Similarly, the cube root of a number when used in a multiplication three times, gives that number. Example: 3 \u00d7 3 \u00d7 3 = 27, so the cube root of 27 is 3.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the square root.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the cube root.\u003C\/div\u003E","CONT_DESC_AR":"The square root of a number is a value that, when multiplied by itself, gives the number.\u0026lt;br \/\u0026gt;\nExample: 4 \u0026amp;times; 4 = 16, so the square root of 16 is 4.\u0026lt;br \/\u0026gt;\nSimilarly the cube root of a number is a special value that, when used in a multiplication three times, gives that number. Example: 3 \u0026amp;times; 3 \u0026amp;times; 3 = 27, so the cube root of 27 is 3.\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- identify the square root\u0026lt;br \/\u0026gt;\n- identify the properties of square root\u0026lt;br \/\u0026gt;\n- identify the cube root\u0026lt;br \/\u0026gt;\n- identify the properties of cube root\u0026lt;br \/\u0026gt;\n\u0026amp;nbsp;","BACKING_FILE":"ms300084.apk","FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":"","MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.ms300084","TOPIC_ID":"ms300084","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300084.jpg","PUBLIC_BANNER_IMG":"MS300084.jpg","PUBLIC_VIDEO":"pvideo_ms300084.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/5rGDhg1xAng","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;h3\u0026gt;Overview:\u0026lt;\/h3\u0026gt;\u0026lt;br\u0026gt;\u0026lt;div\u0026gt;The square root of a number is a value that, when multiplied by itself, gives the number. For 4 \u00d7 4 = 16, the square root of 16 will be 4. Similarly, the cube root of a number when used in a multiplication three times, gives that number. Example: 3 \u00d7 3 \u00d7 3 = 27, so the cube root of 27 is 3.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;h3\u0026gt;Learning Objectives:\u0026lt;\/h3\u0026gt;\u0026lt;br\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Find the square root.\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Find the cube root.\u0026lt;\/div\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Finding Square root \u0026 Cube Root","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"},{"CONT_ID":"18","CATEGORY_ID":"1","CONT_TITLE":"Proportion","CONT_SLUG":"proportion","CONT_TITLE_AR":"Proportion","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E\u003Cbr\u003E\u003C\/div\u003E \r\n\u003Cdiv\u003EA proportion is defined as a notation used to represent that the two ratios are equal. It can be written in two ways: two equal fractions, or, using a colon, a:b = c:d.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E\u003Cbr\u003E\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explore and identify proportion.\u003C\/div\u003E","CONT_DESC_AR":"A proportion is a name we give to a statement that two ratios are equal.\u003C\/br\u003E\r\nIt can be written in two ways: two equal fractions, or, using a colon, a:b = c:d.\u003C\/br\u003E\u003C\/br\u003E\r\n\u003Cstrong\u003ELearning Objective:\u003C\/strong\u003E\u003C\/br\u003E\u003C\/br\u003E\r\n- At the end of this simulation you will be able to explore and identify proportion.","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.ms300060","TOPIC_ID":"ms300060","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_MS300060.jpg","PUBLIC_BANNER_IMG":"ms300060.jpg","PUBLIC_VIDEO":"pvideo_ms300060.mp4","PUBLIC_VIDEO_URL":"https:\/\/youtu.be\/OIo9FigGb3A","DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-26 09:58:51","CREATED_BY":"1","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;h3\u0026gt;Overview:\u0026lt;\/h3\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;A proportion is defined as a notation used to represent that the two ratios are equal. It can be written in two ways: two equal fractions, or, using a colon, a:b = c:d.\u0026lt;\/div\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;h3\u0026gt;Learning Objectives:\u0026lt;\/h3\u0026gt;\u0026lt;div\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;\u0026lt;div\u0026gt;After completing this module, you will be able to:\u0026lt;\/div\u0026gt;\u0026lt;div\u0026gt;- Explore and identify proportion.\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":"Proportion","ADMSUBJECT_ID":"1356","ADMCOURSE_ID":"384","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":"Form 1","COUNTRY_ID":"343","SHORT_NAME":"Malaysia (KSSM) - Updated","DOMAIN_NAME":"STEM"}],"levelObject":[],"contData":{"CONT_ID":"767","CATEGORY_ID":"1","CONT_TITLE":"Quadrilaterals","CONT_SLUG":"quadrilaterals","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 quadrilateral is a four-sided closed figure. It is called a parallelogram, if both pairs of opposite sides are parallel. A quadrilateral with at least one pair of parallel sides is known as a trapezium or trapezoid. A kite is a quadrilateral whose four sides can be grouped into two pairs of equal length sides that are adjacent to each other.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define the types of quadrilaterals by their sides and angles.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Classify quadrilaterals by their sides and angles.\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.vm000002","TOPIC_ID":"vm000002","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000002.jpg","PUBLIC_BANNER_IMG":"vm000002.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000002.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":"2018-08-03 10:27:07","CREATED_BY":"2143","UPDATED_ON":"2024-10-08 08:20:32","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 quadrilateral is a four-sided closed figure. It is called a parallelogram, if both pairs of opposite sides are parallel. A quadrilateral with at least one pair of parallel sides is known as a trapezium or trapezoid. 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