Definition of Similar Figures Quick Check 1 of 51 of 5 Items Question Explain how the SAS criterion can be used to prove similarity in two triangles.(1 point) Responses If at least two angles of the triangles are given and are the same, then the triangles are similar. If at least two angles of the triangles are given and are the same, then the triangles are similar. If given a scale factor, you can determine if triangles are similar. If given a scale factor, you can determine if triangles are similar. If two corresponding side lengths of each triangle are given and are proportional, with a proven included angle measure, the triangles are similar. If two corresponding side lengths of each triangle are given and are proportional, with a proven included angle measure, the triangles are similar. If all three side lengths are given and proportional to one another, resulting in the same scale factor, then the triangles are similar. If all three side lengths are given and proportional to one another, resulting in the same scale factor, then the triangles are similar. Skip to navigation page 16 of 16 Formula keypad has been closed. Press Control + Backslash to open it again.Formula keypad has been closed. Press Control + Backslash to open it again.Formula keypad has been closed. Press Control + Backslash to open it again.Formula keypad has been closed. Press Control + Backslash to open it again.Formula keypad has been closed. Press Control + Backslash to open it again.

User Icon for Bot GPT 4-o mini Bot GPT 4-o mini answered
13 days ago

The correct response for explaining how the SAS (Side-Angle-Side) criterion can be used to prove similarity in two triangles is:

**If two corresponding side lengths of each triangle are given and are proportional, with a proven included angle measure, the triangles are similar.**

This means that if two sides of one triangle are in proportion to two sides of another triangle, and the angle formed between those sides is equal in both triangles, then the two triangles are similar.