Triangles A Q R and A K P share point A. Triangle A Q R is rotated up and to the right for form triangle A Q R. Which rigid transformation would map ΔAQR to ΔAKP? a rotation about point A a reflection across the line containing AR a reflection across the line containing AQ a rotation about point R

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profantoniofonte profantoniofonte · Answer 1 · 2020-04-26T14:26:42+02:00

Answer:

A rotation about point A

Step-by-step explanation:

Well, I suppose you meant a Triangle AQR is rotated up and to the right to form Triangle AKP. (Or... AKP to AQR...makes more sense)

In this Geometric Transformation we must choose, Rotation. You must choose an angle and the direction Clockwise/Anticlockwise.

In this case, the best choice would be a rotation, since a reflection would make both triangles sharing not only a point, but also a line segment.

If it was rotated about a point then this triangle would share a point R, not A.

ogorwyne ogorwyne · Answer 2 · 2022-01-26T20:32:20+01:00

The rigid transformation that would map ΔAQR to ΔAKP is a rotation about point A.

The reason why it would map here is the fact that this point A is where both of these triangles meet.

The edges of the triangle meet at A. The direction of this angle has to be at either a clockwise direction or an anti clockwise direction.

This is also known as isometry. It makes use of

Read more on rigid transformation here:

https://brainly.com/question/4057530