Question

Two slices of watermelon are cut so that they have the same exact interior angles. Are the watermelon slices congruent?

A. No, because the triangles have the same interior angles, but their side lengths may be different

B. Yes, because the triangles have the same interior angles and the same side lengths

C. Yes, because the triangles only need the same interior angles to be congruent

D. No, because the triangles have the same side lengths, but their interior angles may be different

Answer 1

@Rainluke01

Answer 2

A

Answer 3

https://learning.k12.com/d2l/common/viewFile.d2lfile/Database/MTEwMDE1MTY/G-CO.B.8%20Q2.JPG?ou=437405

If a is congruent to d and b is congruent to e, are the two triangles congruent?

A. Yes, by the SAS postulate


B. Yes, by the SSS postulate


C. No, they are not congruent


D. Yes, by the ASA postulate

Answer 4

B

Answer 5

https://learning.k12.com/d2l/common/viewFile.d2lfile/Database/MTEwMDIxODA/G-CO.B.8%20Q4.JPG?ou=437405

Given: ∠D≅∠C & AD≅BC
Prove: △EDA≅△ECB

___ By the definition of vertical angles, ∠AED and ∠BEC are congruent because
all vertical angles are congruent.

___ It is given that∠D≅∠C and that AD≅BC.

___ △EDA≅△ECB by the Angle-Angle-Side congruence postulate.

1.

2.

3.

Answer 6

2
1
3

Answer 7

Which of the following statements is not correct?

A. The SSS postulate states that if each corresponding side of one triangle is congruent to the corresponding side of another, the triangles are congruent.


B. None of these.


C. The ASA postulate states that if two angles and their common side on one triangle are congruent to the corresponding parts in another, the two triangles are congruent.


D. The SAS postulate states that if 2 angles of a triangle and the side between them are congruent to the corresponding parts in another, the triangles are congruent.

Answer 8

D

Answer 9

D