{"pkgId":"62","subjectId":"1290","fullwidthLayout":false,"contentData":{"PACKAGE_NAME":"Cambridge (IGCSE) Curriculum Full Access","PACKAGE_SLUG":"cambridge-igcse-full","PACKAGE_IMG":"file_1354445030_1592481030.png","ADMCOURSE_ID":"369","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","STANDARD_NAME":"Cambridge (IGCSE)","ADMSUBJECT_ID":"1290","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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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":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A 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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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":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A 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":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","DOMAIN_NAME":"STEM"},{"CONT_ID":"759","CATEGORY_ID":"1","CONT_TITLE":"Volume of Composite Solids","CONT_SLUG":"volume-of-composite-solids","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EObjects that are composed of two or more basic three-dimensional shapes are called composite solids. The volume of a composite solid is equal to the sum of the volumes of each component.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify shapes that are composite solids.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify the shapes that form a composite solid.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate the volume of a composite solid.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000061","TOPIC_ID":"vm000061","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000061.jpg","PUBLIC_BANNER_IMG":"vm000061.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000061.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Objects that are composed of two or more basic three-dimensional shapes are called composite solids. The volume of a composite solid is equal to the sum of the volumes of each component.\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify shapes that are composite solids.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify the shapes that form a composite solid.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Calculate the volume of a composite solid.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Volume of Composite Solids","ADMSUBJECT_ID":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","DOMAIN_NAME":"STEM"},{"CONT_ID":"758","CATEGORY_ID":"1","CONT_TITLE":"Cross Sections","CONT_SLUG":"cross-sections","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 cross section is the intersection of a plane with a three-dimensional object. It can also be defined as a surface or a shape exposed by making a straight cut through a shape. For example, the horizontal cross section of a cylinder is a circle and its vertical cross section is a rectangle.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define the concept of cross section for three-dimensional objects.\u003C\/div\u003E \r\n\u003Cdiv\u003E- State the meaning of horizontal and vertical cross sections.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify the cross sections of three-dimensional objects.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000076","TOPIC_ID":"vm000076","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000076.jpg","PUBLIC_BANNER_IMG":"vm000076.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000076.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A cross section is the intersection of a plane with a three-dimensional object. It can also be defined as a surface or a shape exposed by making a straight cut through a shape. For example, the horizontal cross section of a cylinder is a circle and its vertical cross section is a rectangle.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define the concept of cross section for three-dimensional objects.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- State the meaning of horizontal and vertical cross sections.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify the cross sections of three-dimensional objects.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Cross Sections","ADMSUBJECT_ID":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","DOMAIN_NAME":"STEM"},{"CONT_ID":"757","CATEGORY_ID":"1","CONT_TITLE":"Types of Relations","CONT_SLUG":"types-of-relations","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 relation between two sets is defined as the collection of ordered pairs containing one object from each set. For example, a relation from a set A to a set B is a set of ordered pairs \u003Cx, y\u003E where x is an element of A and y is an element of B. There are three types of relations: reflexive, symmetric, and transitive. A relation that is reflexive, symmetric, and transitive is known as an equivalence relation.\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 reflexive relations.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define and identify symmetric relations.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define and identify transitive relations.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define and identify equivalence relations.\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.vm000016","TOPIC_ID":"vm000016","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000016.jpg","PUBLIC_BANNER_IMG":"vm000016.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000016.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":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A relation between two sets is defined as the collection of ordered pairs containing one object from each set. For example, a relation from a set A to a set B is a set of ordered pairs \u0026amp;lt;x, y\u0026amp;gt; where x is an element of A and y is an element of B. There are three types of relations: reflexive, symmetric, and transitive. A relation that is reflexive, symmetric, and transitive is known as an equivalence relation.\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 reflexive relations.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define and identify symmetric relations.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define and identify transitive relations.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define and identify equivalence relations.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Types of Relations","ADMSUBJECT_ID":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","DOMAIN_NAME":"STEM"},{"CONT_ID":"755","CATEGORY_ID":"1","CONT_TITLE":"Relationship Between Zeros and Factors of the Polynomial","CONT_SLUG":"relationship-between-zeroes-and-factors-of-the-polynomial","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 zero of a polynomial is where the polynomial is equal to zero or where the y value equals zero. If k is the zero of a polynomial p(x), then (x-k) will be the factor of p(x).\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 geometrical meaning of the zeroes of a polynomial.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define the term \u2018factor\u2019.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain the relationship between zeroes and factors of a polynomial.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify the factors of a polynomial from graph.\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.vm000014","TOPIC_ID":"vm000014","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000014.jpg","PUBLIC_BANNER_IMG":"vm000014.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000014.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":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A zero of a polynomial is where the polynomial is equal to zero or where the y value equals zero. If k is the zero of a polynomial p(x), then (x-k) will be the factor of p(x).\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 geometrical meaning of the zeroes of a polynomial.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define the term \u2018factor\u2019.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Explain the relationship between zeroes and factors of a polynomial.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify the factors of a polynomial from graph.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Relationship between Zeroes and Factors of the Polynomial","ADMSUBJECT_ID":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","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":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A 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":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","DOMAIN_NAME":"STEM"},{"CONT_ID":"748","CATEGORY_ID":"1","CONT_TITLE":"Sum of Arithmetic Progression","CONT_SLUG":"sum-of-arithmetic-progression","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003ETo find the sum of all the n terms of an arithmetic progression, apply the formula for sum of n terms, Sn= (n \/ 2)(2 a + (n - 1) d). the arithmetic mean between two numbers a and b is (a + b) \/ 2 and if the sequence is a, A1, A2, A3, A4, b then A1, A2, A3, A4 are four arithmetic means between a and b.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Define the term arithmetic progression.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Explain the properties of an arithmetic progression.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Insert arithmetic means between two numbers.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Apply the nth term formula.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Calculate the sum of terms in an arithmetic progression.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000007","TOPIC_ID":"vm000007","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000007.jpg","PUBLIC_BANNER_IMG":"vm000007.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000007.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;To find the sum of all the n terms of an arithmetic progression, apply the formula for sum of n terms, Sn= (n \/ 2)(2 a + (n - 1) d). the arithmetic mean between two numbers a and b is (a + b) \/ 2 and if the sequence is a, A1, A2, A3, A4, b then A1, A2, A3, A4 are four arithmetic means between a and b.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Define the term arithmetic progression.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Explain the properties of an arithmetic progression.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Insert arithmetic means between two numbers.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Apply the nth term formula.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Calculate the sum of terms in an arithmetic progression.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Sum of Arithmetic Progression","ADMSUBJECT_ID":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","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":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;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":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","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":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;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":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","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":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A 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":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","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":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;A 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":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","DOMAIN_NAME":"STEM"},{"CONT_ID":"739","CATEGORY_ID":"1","CONT_TITLE":"Slope","CONT_SLUG":"slope","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThe general equation of a straight line is y = mx + c, where m is the slope, and c is the value where the line cuts the y-axis. Slope is calculated as the ratio of rise\/run. Rise value is calculated as (y2 - y1) and run value as (x2 - x1).\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Identify the rise and run of a slope.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the slope of a line.\u003C\/div\u003E \r\n\u003Cdiv\u003E- State the slope of a vertical line and a horizontal line.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000051","TOPIC_ID":"vm000051","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000051.jpg","PUBLIC_BANNER_IMG":"vm000051.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000051.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;The general equation of a straight line is y = mx + c, where m is the slope, and c is the value where the line cuts the y-axis. Slope is calculated as the ratio of rise\/run. Rise value is calculated as (y2 - y1) and run value as (x2 - x1).\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Identify the rise and run of a slope.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the slope of a line.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- State the slope of a vertical line and a horizontal line.Overview:\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Slope","ADMSUBJECT_ID":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","DOMAIN_NAME":"STEM"},{"CONT_ID":"737","CATEGORY_ID":"1","CONT_TITLE":"Convert Between Systems","CONT_SLUG":"convert-between-system","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThere are two main systems for measuring length, weight, and capacity: the customary system and the metric system. The customary measurement system measures length in inches, feet, yards, and miles; capacity in cups, pints, quarts, and gallons; and weight in pounds, and tons. the metric system measures length in centimeters, meters, and kilometers; capacity in liters; and weight in grams and kilograms.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Convert units from customary to metric systems and vice versa.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Convert units within the customary system.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Convert units within the metric system.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000025","TOPIC_ID":"vm000025","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000025.jpg","PUBLIC_BANNER_IMG":"vm000025.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000025.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;There are two main systems for measuring length, weight, and capacity: the customary system and the metric system. The customary measurement system measures length in inches, feet, yards, and miles; capacity in cups, pints, quarts, and gallons; and weight in pounds, and tons. the metric system measures length in centimeters, meters, and kilometers; capacity in liters; and weight in grams and kilograms.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning objectives:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Convert units from customary to metric systems and vice versa.\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Convert units within the customary system.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Convert units within the metric system.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Convert between Systems","ADMSUBJECT_ID":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","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":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;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":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","DOMAIN_NAME":"STEM"},{"CONT_ID":"729","CATEGORY_ID":"1","CONT_TITLE":"Slope and Similar Triangles","CONT_SLUG":"slope-and-similar-triangles","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThe slope or steepness of a non-vertical line is the same between any two points along that line.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EIf we draw a right triangle using two points on any line and then draw another right triangle using two other points on the same line, the triangles formed will be similar to each other because the slope of the line remains same at all of the points.The ratio of the corresponding sides of similar triangles remains equal.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the slope of a straight line.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the slope of a straight line using similar triangles.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Use similar triangles to determine if a line is straight or sloped.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000052","TOPIC_ID":"vm000052","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000052.jpg","PUBLIC_BANNER_IMG":"vm000052.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000052.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;The slope or steepness of a non-vertical line is the same between any two points along that line.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;If we draw a right triangle using two points on any line and then draw another right triangle using two other points on the same line, the triangles formed will be similar to each other because the slope of the line remains same at all of the points.The ratio of the corresponding sides of similar triangles remains equal.\u0026amp;nbsp;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning objectives:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the slope of a straight line.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the slope of a straight line using similar triangles.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Use similar triangles to determine if a line is straight or sloped.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Slope and Similar Triangles","ADMSUBJECT_ID":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","DOMAIN_NAME":"STEM"},{"CONT_ID":"728","CATEGORY_ID":"1","CONT_TITLE":"Distance Between Two Parallel Lines","CONT_SLUG":"distance-between-two-parallel-lines","CONT_TITLE_AR":"","CONT_DESC":"\u003Ch3\u003EOverview:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EThe distance between two parallel lines is the length of the perpendicular segment between them. It doesn\u0026#039;t matter which perpendicular line is selected, because all the perpendicular lines have the same length. The distance between two parallel lines can be calculated by using the distance formula D= |c1 - c2I \/ (\u221a1 + m\u00b2) where c1 and c2 are the y-intercepts and m is the slope of two parallel lines.\u003C\/div\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Ch3\u003ELearning Objectives:\u003C\/h3\u003E \r\n\u003Cdiv\u003E \r\n \u003Cbr\u003E \r\n\u003C\/div\u003E \r\n\u003Cdiv\u003EAfter completing this module, you will be able to:\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the distance between two parallel lines, given two points.\u003C\/div\u003E \r\n\u003Cdiv\u003E- Find the distance between two parallel lines, given their slope intercept form.\u003C\/div\u003E","CONT_DESC_AR":"","BACKING_FILE":null,"FILE_UID":null,"SCORM_COURSE_ID":null,"CONT_SRC":null,"MOD_FILES":null,"FOLDER_NAME":null,"CONTTYPE_ID":"9","ANDROID_PKG":"com.umety.vr.vm000054","TOPIC_ID":"vm000054","IS_PUBLISH":"Y","IS_PUBLIC":"Y","CONT_PRICE":null,"PUBLIC_IMG":"thumb_vm000054.jpg","PUBLIC_BANNER_IMG":"vm000054.jpg","PUBLIC_VIDEO":"en_us_pvideo_vm000054.mp4","PUBLIC_VIDEO_URL":null,"DIST":null,"SHOW_ON_HOME":"N","CONTROLLER_REQUIRED":"Y","DOMAIN":"3","CONCEPT":"0","STATUS":"A","EXPIRY_DAYS":null,"CREATED_ON":"2019-07-08 06:14:14","CREATED_BY":"2143","UPDATED_ON":"0000-00-00 00:00:00","UPDATED_BY":"2","CONT_ORDER":"0","X_ROTATION":null,"Y_ROTATION":null,"Z_ROTATION":null,"BG_COLOR":"0x000000","X_POSITION":null,"Y_POSITION":null,"Z_POSITION":null,"TEMP_DESC":"\u0026lt;p\u0026gt;Overview:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;The distance between two parallel lines is the length of the perpendicular segment between them. It doesn\u0026#039;t matter which perpendicular line is selected, because all the perpendicular lines have the same length. The distance between two parallel lines can be calculated by using the distance formula D= |c1 - c2I \/ (\u221a1 + m\u00b2) where c1 and c2 are the y-intercepts and m is the slope of two parallel lines.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;Learning Objectives::\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;\u0026lt;br\u0026gt;\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;After completing this module, you will be able to:\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the distance between two parallel lines, given two points.\u0026lt;\/p\u0026gt;\u0026lt;p\u0026gt;- Find the distance between two parallel lines, given their slope intercept form.\u0026lt;\/p\u0026gt;","IS_ANALYTICS":"Y","VR_ENABLE":"Y","VR_SESSION_ENABLE":"Y","YOUTUBE_URL":null,"CONT_TYPE":"VR Module","CAT_NAME":"Distance between Two Parallel Lines","ADMSUBJECT_ID":"1290","ADMCOURSE_ID":"369","DISPLAY_NAME":"Mathematics","DISPLAY_NAME_AR":"","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"","SUBJECT_DESC":"Description","SUBJECT_DESC_AR":"","SUBJECT_IMG":"","SUBJECT_BANNER_IMG":null,"SUBJECT_PRICE":null,"IS_FEATURED":"N","COURSE_NAME":"Additional Topics","COUNTRY_ID":"296","SHORT_NAME":"Cambridge (IGCSE)","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. 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","DISPLAY_NAME":"CBSE - Grade 8 - Mathematics","DISPLAY_NAME_AR":"CBSE - Grade 8 - Mathematics","SUBJECT_IMG":"594.jpg","ADMSUBJECT_ID":"594","SUBJECT_NAME":"Mathematics","SUBJECT_NAME_AR":"Mathematics","ADMCOURSE_ID":"195","COURSE_NAME":"Grade 8","COUNTRY_ID":"288","STANDARD_ID":"288","SHORT_NAME":"CBSE","LANG_ID":null,"LOCALE_TITLE":null,"LOCALE_DESC":null,"DIR":null,"LANG_NAME":null,"DOMAIN_NAME":"STEM","DOMAIN_DESC":"STEM"},"checkLang":["English - US","\u0639\u0631\u0628\u064a","Espa\u00f1ol","Ti\u1ebfng Vi\u1ec7t"],"devices":["UmetyVR","WebXR"]}