Angle-Side Relationship Theorem QuizVersión en línea Test your knowledge on the Angle-Side Relationship Theorem with these 10 questions! por Mark Masloski 1 What is the Angle-Side Relationship Theorem? a It states that in a triangle, if two sides are proportional to two sides of another triangle, then the angles opposite those sides are congruent. b It states that in a triangle, if two angles are congruent to two angles of another triangle, then the sides adjacent to those angles are proportional. c It states that in a triangle, if two angles are congruent to two angles of another triangle, then the sides opposite those angles are proportional. d It states that in a triangle, if two sides are proportional to two sides of another triangle, then the included angles are congruent. 2 What does the Angle-Side Relationship Theorem imply about the angles of similar triangles? a The angles opposite the proportional sides are supplementary. b The angles adjacent to the proportional sides are supplementary. c The angles adjacent to the proportional sides are congruent. d The angles opposite the proportional sides are congruent. 3 If triangle ABC is similar to triangle DEF, and angle A is congruent to angle D, what can be concluded? a The sides opposite angles B and E are proportional. b The sides adjacent to angles B and E are proportional. c The sides opposite angles A and D are proportional. d The sides adjacent to angles A and D are proportional. 4 If triangle ABC is similar to triangle DEF, and side AB is proportional to side DE, what can be concluded? a Angle A is congruent to angle D. b Angle B is congruent to angle E. c Angle A is supplementary to angle D. d Angle B is supplementary to angle E. 5 In triangle ABC, if angle A is congruent to angle B, what can be concluded? a Side AC is congruent to side BC. b Side AB is proportional to side BC. c Side AC is proportional to side BC. d Side AB is congruent to side BC. 6 If triangle ABC is similar to triangle DEF, and side AB is proportional to side DE, what can be concluded? a Side AC is congruent to side DF. b Side AC is proportional to side DF. c Side BC is proportional to side DE. d Side BC is congruent to side DE. 7 If triangle ABC is similar to triangle DEF, and angle A is congruent to angle D, what can be concluded? a Angle B is congruent to angle E. b Angle C is congruent to angle F. c Angle B is supplementary to angle E. d Angle C is supplementary to angle F. 8 In triangle ABC, if angle A is congruent to angle B, what can be concluded? a Angle C is congruent to angle B. b Angle C is supplementary to angle B. c Angle C is congruent to angle A. d Angle C is supplementary to angle A. 9 If triangle ABC is similar to triangle DEF, and side AB is proportional to side DE, what can be concluded? a Side BC is congruent to side EF. b Side AC is congruent to side DE. c Side AC is proportional to side DE. d Side BC is proportional to side EF. 10 If triangle ABC is similar to triangle DEF, and angle A is congruent to angle D, what can be concluded? a The ratios of the corresponding angles are proportional. b The ratios of the corresponding sides are proportional. c The ratios of the corresponding angles are equal. d The ratios of the corresponding sides are equal.
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