Congruence of Triangles, Chapter 7 Class 7 Maths MCQs Advertisement 1. Two angles are congruent if they have a. unequal measures b. different name c. equal measures d. same nameABCDYour comments:Question 1 of 152. Which of the following is not a congruence criterion? a. SSS b. SAS c. None of these d. ASAABCDYour comments:Question 2 of 153. If a then AB is equal to a. None of these b. QR c. PR d. PQABCDYour comments:Question 3 of 154. If △DEF ≅ △BCA, then the part of △BCA that correspond to ∠E is a. None of these b. ∠B c. ∠A d. ∠CABCDYour comments:Question 4 of 155. If △DEF ≅ △ACB, then the part of △ACB that correspond to ∠F is a. ∠B b. ∠A c. ∠C d. None of theseABCDYour comments:Question 5 of 156. △ABC and △PQR are congruent under the correspondence: ABC ↔ RQP, then the part of △ABC that correspond to ∠P is a. ∠C b. ∠B c. ∠A D. None of theseABCDYour comments:Question 6 of 157. △ABC and △PQR are congruent under the correspondence: ABC ↔ RQP, then the part of △ABC that correspond to ∠Q is a. ∠A b. ∠B c. ∠C d. None of theseABCDYour comments:Question 7 of 158. △ABC and △PQR are congruent under the correspondence: ABC ↔ RPQ, then the part of △ABC that corresponds to PQ is a. BC b. AC c. AB d. None of these ABCDYour comments:Question 8 of 159. △ABC and DPQR are congruent under the correspondence: BCA ↔ RPQ, then the part of △ABC that correspond to PQ is a. CB b. BA c. CA d. None of theseABCDYour comments:Question 9 of 1510. △ABC and △PQR are congruent under the correspondence: BAC ↔ RPQ, then the part of △ABC that correspond to PR is a. BC b. AC c. AB d. None of theseABCDYour comments:Question 10 of 1511. In △ABC and △PQR, AB = 4 cm, BC = 5 cm, AC = 6 cm and PQ = 4 cm, QR = 5 cm, PR = 6 cm, then which of the following is true? a. △ABC ≅ △QRP b. △ABC ≅ △PQR c. △ABC ≅ △RQP d. None of theseABCDYour comments:Question 11 of 1512. What is the side included between the angles A and B in △ABC? a. None of these b. AC c. AB d. BCABCDYour comments:Question 12 of 1513. In the below quadrilateral ABCD, AD = BC and ∠DAB = ∠CBA. If △ABD ≅ △BAC. The relation between ∠ABD and ∠BAC is a. ∠ABD = ∠BAC b. ∠ABD > ∠BAC c. None of these d. ∠ABD < ∠BACABCDYour comments:Question 13 of 1514. In the quadrilateral ABCD, AC = AD and AB bisect ∠A and △ABC ≅ △ABD. The relation between BC and BD is a. BC < BD b. BC = BD c. BC > BD d. None of theseABCDYour comments:Question 14 of 1515. In the below figure, AC and BD are equal perpendiculars to line segment AB. If △BOC ≅ △AOD, then the relation between OC and OD is a. OD < OC b. OD > OC c. OD = 1/2 OC d. OD = OCABCDYour comments:Question 15 of 15 Loading...
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