MCQ Questions for Class 7 Maths with Answers<\/a> during preparation and score maximum marks in the exam. Students can download the Symmetry Class 7 MCQs Questions with Answers from here and test their problem-solving skills. Clear all the fundamentals and prepare thoroughly for the exam taking help from Class 7 Maths Chapter 14 Symmetry Objective Questions.<\/p>\nSymmetry Class 7 MCQs Questions with Answers<\/h2>\n Students are advised to solve Symmetry Multiple Choice Questions of Class 7 Maths to know different concepts. Practicing the MCQ Questions on Symmetry Class 7 with answers will boost your confidence thereby helping you score well in the exam.<\/p>\n
Explore numerous MCQ Questions of Symmetry Class 7 with answers provided with detailed solutions by looking below.<\/p>\n
Question 1. \nLetter \u2018C\u2019 of the English alphabet have reflectional symmetry (i.e., symmetry related to mirror reflection) about. \n(a) a horizontal mirror \n(b) a vertical mirror \n(c) both \n(d) None of these<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (a) a horizontal mirror<\/p>\n<\/details>\n
\nQuestion 2. \nState the number of lines of symmetry for a quadrilateral. \n(a) 1 \n(b) 0 \n(c) 2 \n(d) None of these<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (b) 0 \nThere is no line about which the figure may be folded.<\/p>\n<\/details>\n
\nQuestion 3. \nHow many lines of symmetries are there in an equilateral triangle? \n(a) 2 \n(b) 3 \n(c) 0 \n(d) 1<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (b) 3<\/p>\n<\/details>\n
\nQuestion 4. \nLetter \u2018G\u2019 of the English alphabet have reflectional symmetry (i.e., symmetry related to mirror reflection) about. \n(a) Neither horizontal nor vertical \n(b) a horizontal mirror \n(c) a vertical mirror \n(d) both<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (a) Neither horizontal nor vertical<\/p>\n<\/details>\n
\nQuestion 5. \nState the number of lines of symmetry for a scalene triangle. \n(a) 1 \n(b) 2 \n(c) 0 \n(d) None of these<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (c) 0 \nIt is an irregular figure.<\/p>\n<\/details>\n
\nQuestion 6. \nWhich of these letters has only rotational symmetry? \n(a) S \n(b) E \n(c) B \n(d) P<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (a) S<\/p>\n<\/details>\n
\nQuestion 7. \nWhich of the following triangles has no line of symmetry? \n(a) An equilateral triangle \n(b) An isosceles triangle \n(c) A scalene triangle \n(d) All of the above<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (c) A scalene triangle<\/p>\n<\/details>\n
\nQuestion 8. \nState the number of lines of symmetry for a parallelogram. \n(a) 0 \n(b) 1 \n(c) 2 \n(d) None of these<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (a) 0 \nThere is no line about which the figure may be folded.<\/p>\n<\/details>\n
\nQuestion 9. \nLetter \u2018H\u2019 of the English alphabet have reflectional symmetry (i.e., symmetry related to mirror reflection) about. \n(a) a vertical mirror \n(b) Both horizontal and vertical \n(c) a horizontal mirror \n(d) Neither horizontal nor vertical<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (b) Both horizontal and vertical<\/p>\n<\/details>\n
\nQuestion 10. \nNumber of lines of symmetry a triangle does not have: \n(a) 3 \n(b) 1 \n(c) 0 \n(d) 2<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (d) 2<\/p>\n<\/details>\n
\nQuestion 11. State the number of lines of symmetry a circle. \n(a) Infinite \n(b) 0 \n(c) 4 \n(d) None of these<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (a) Infinite \nThere are infinite number of lines about which the figure may be folded.<\/p>\n<\/details>\n
\nQuestion 12. \nHow many lines of symmetries are there in regular pentagon? \n(a) 2 \n(b) 3 \n(c) 5 \n(d) 4<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (c) 5<\/p>\n<\/details>\n
\nQuestion 13. \nWhich of the following has both horizontal as well as vertical line of symmetry? \n(a) H \n(b) S \n(c) V \n(d) A<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (a) H<\/p>\n<\/details>\n
\nQuestion 14. \nState the number of lines of symmetry for a rhombus. \n(a) 5 \n(b) 3 \n(c) 2 \n(d) Noun of these<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (c) 2 \nThere are two lines about which the figure may be folded.<\/p>\n<\/details>\n
\nQuestion 15. \nWhich of the following alphabets has line symmetry? \n(a) P \n(b) Q \n(c) Z \n(d) A<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (d) A<\/p>\n<\/details>\n
\nQuestion 16. \nWhich of the following letters have reflection line of symmetry about vertical mirror? \n(a) C \n(b) V \n(c) B \n(d) Q<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (b) V<\/p>\n<\/details>\n
\nQuestion 17. \nState the number of lines of symmetry for an isosceles triangle. \n(a) 0 \n(b) 1 \n(c) 2 \n(d) None of these<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (b) 1 \nAs there is only one face from where it is folded then makes angles of symmetry.<\/p>\n<\/details>\n
\nQuestion 18. \nhat is the order of rotational symmetry of the English alphabet Z? \n(a) 0 \n(b) 1 \n(c) 2 \n(d) 3<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (c) 2<\/p>\n<\/details>\n
\nQuestion 19. \nState the number of lines of symmetry for an equilateral triangle. \n(a) 3 \n(b) 0 \n(c) 1 \n(d) None of these<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (a) 3 \nAs there are three vertex in a triangle.<\/p>\n<\/details>\n
\nQuestion 20. \nHow many lines of symmetries are there in a square? \n(a) 2 \n(b) 3 \n(c) 4 \n(d) 1<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (c) 4<\/p>\n<\/details>\n
\nQuestion 21. \nState the number of lines of symmetry for a square. \n(a) 2 \n(b) 3 \n(c) 4 \n(d) None of these<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (c) 4 \nSquare has a rotational symmetry of order 4.<\/p>\n<\/details>\n
\nQuestion 22. \nLetter \u2018D\u2019 of the English alphabet have reflectional symmetry (i.e., symmetry related to mirror reflection) about. \n(a) a vertical mirror \n(b) a horizontal mirror \n(c) both \n(d) None of these<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (a) a vertical mirror<\/p>\n<\/details>\n
\nQuestion 23. \nHow many lines of symmetries are there in rectangle? \n(a) 2 \n(b) 1 \n(c) 0 \n(d) None of these<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (a) 2<\/p>\n<\/details>\n
\nQuestion 24. State the number of lines of symmetry a regular hexagon. \n(a) 6 \n(b) 5 \n(c) 4 \n(d) None of these<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (a) 6 \nThere are six lines about which the figure may be folded.<\/p>\n<\/details>\n
\nQuestion 25. \nA In A XYZ, XY = XZ and XM\u22a5YZand ZP\u22a5XY. About which of the following is the triangle symmetrical? \n(a) XM \n(b) YN \n(c) ZP \n(d) XZ<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (a) XM<\/p>\n<\/details>\n
\nQuestion 26. \nWhich of these quadrilaterals have both line and rotational symmetries of order more than 3? \n(a) A triangle \n(b) A square \n(c) A kite \n(d) A rectangle<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (b) A square<\/p>\n<\/details>\n
\nQuestion 27. \nState the number of lines of symmetry for a rectangle. \n(a) 5 \n(b) 2 \n(c) 3 \n(d) None of these<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (b) 2 \nThere are two lines about which the figure may be folded.<\/p>\n<\/details>\n
\nQuestion 28. \nWhich of the following alphabets has many lines of symmetry? \n(a) I \n(b) O \n(c) P \n(d) F<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: (b) O<\/p>\n<\/details>\n
\nMatch the following :<\/span><\/p>\nSymmetry related to mirror reflection.<\/p>\n
\n\n\n1. M<\/td>\n (a) A vertical mirror<\/td>\n<\/tr>\n \n2. A<\/td>\n (b) A horizontal mirror<\/td>\n<\/tr>\n \n3. B<\/td>\n (c) Both horizontal and vertical mirror<\/td>\n<\/tr>\n \n4. 0<\/td>\n (d) A vertical mirror<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n\nAnswer<\/span><\/summary>\nAnswer:<\/p>\n
\n\n\n1. M<\/td>\n (d) A vertical mirror<\/td>\n<\/tr>\n \n2. A<\/td>\n (a) A vertical mirror<\/td>\n<\/tr>\n \n3. B<\/td>\n (b) A horizontal mirror<\/td>\n<\/tr>\n \n4. 0<\/td>\n (c) Both horizontal and vertical mirror<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<\/details>\n \nMatch the following :<\/span><\/p>\n\n\n\nRegular Polygon<\/td>\n Number of lines of symmetry<\/td>\n<\/tr>\n \n1. Hexagon<\/td>\n (a) 5<\/td>\n<\/tr>\n \n2. Pentagon<\/td>\n (b) 3<\/td>\n<\/tr>\n \n3. Square<\/td>\n (c) 6<\/td>\n<\/tr>\n \n4. Equilateral triangle<\/td>\n (d) 4<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n\nAnswer<\/span><\/summary>\nAnswer:<\/p>\n
\n\n\nRegular Polygon<\/td>\n Number of lines of symmetry<\/td>\n<\/tr>\n \n1. Hexagon<\/td>\n (c) 6<\/td>\n<\/tr>\n \n2. Pentagon<\/td>\n (a) 5<\/td>\n<\/tr>\n \n3. Square<\/td>\n (d) 4<\/td>\n<\/tr>\n \n4. Equilateral triangle<\/td>\n (b) 3<\/td>\n<\/tr>\n<\/tbody>\n<\/table>\n<\/details>\n \nState whether the given statements are True or False.<\/span><\/p>\nQuestion 1. \nIf a figure has two or more fines of symmetry, should it have rotational symmetry of order more than 1.<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: True<\/p>\n<\/details>\n
\nQuestion 2. \nA parallelogram has both fine and rotational symmetry of order more than 1.<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: False<\/p>\n<\/details>\n
\nQuestion 3. \nWe can have a rotational symmetry of order more than 1 whose angle of rotation is 45\u00b0.<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: True<\/p>\n<\/details>\n
\nQuestion 4. \nWe can have a rotational symmetry of order more than 1 whose angle of rotation is 17\u00b0.<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: False<\/p>\n<\/details>\n
\nFill in the blanks.<\/span><\/p>\n1. If after a rotation, an object looks exactly the same we say that it has a ………… .<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: rotational symmetry<\/p>\n<\/details>\n
\n2. ………. have equal sides and equal angles.<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: regular polygon<\/p>\n<\/details>\n
\n3. A figure has ……….,, if there is a line about which the figure may be folded so that the two parts of the figure will coincide.<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: line symmetry<\/p>\n<\/details>\n
\n4. In a complete turn (of 360\u00b0) the number of times an object looks exactly the same is called the ………. .<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: order of rotational symmetry<\/p>\n<\/details>\n
\n5. Rotation turns an object about a fixed point. This fixed point is the ………. . \nThe angle by which the object rotates is the ……….. .<\/p>\n\nAnswer<\/span><\/summary>\nAnswer: centre of rotation, angle of rotation<\/p>\n<\/details>\n
\nWe believe the knowledge shared regarding NCERT MCQ Questions for Class 7 Maths Chapter 14 Symmetry with Answers Pdf free download has been useful to the possible extent. If you have any other queries regarding CBSE Class 7 Maths Symmetry MCQs Multiple Choice Questions with Answers, feel free to reach us via the comment section and we will guide you with the possible solution.<\/p>\n","protected":false},"excerpt":{"rendered":"
Students can access the NCERT MCQ Questions for Class 7 Maths Chapter 14 Symmetry Pdf free download aids in your exam preparation and you can get a good hold of the chapter. Use MCQ Questions for Class 7 Maths with Answers during preparation and score maximum marks in the exam. Students can download the Symmetry …<\/p>\n
MCQ Questions for Class 7 Maths Chapter 14 Symmetry with Answers<\/span> Read More »<\/a><\/p>\n","protected":false},"author":9,"featured_media":0,"comment_status":"closed","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"site-sidebar-layout":"default","site-content-layout":"default","ast-main-header-display":"","ast-hfb-above-header-display":"","ast-hfb-below-header-display":"","ast-hfb-mobile-header-display":"","site-post-title":"","ast-breadcrumbs-content":"","ast-featured-img":"","footer-sml-layout":"","theme-transparent-header-meta":"default","adv-header-id-meta":"","stick-header-meta":"default","header-above-stick-meta":"","header-main-stick-meta":"","header-below-stick-meta":"","spay_email":""},"categories":[35],"tags":[],"yoast_head":"\nMCQ Questions for Class 7 Maths Chapter 14 Symmetry with Answers - MCQ Questions<\/title>\n \n \n \n \n \n \n \n \n \n \n \n \n \n \n \n\t \n\t \n\t \n