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In the diagram below, line segment AB has endpoints at A(-2,-6) and B( 3,-1) .Draw A'B' the image of AB after a counterclockwise rotation of 90° about the origin. Give the coordinates of its endpoints below. Is A'B' congruent to AB? Explain.

In the diagram below, line segment AB has endpoints at A(-2,-6) and B( 3,-1) .Draw-example-1
User Naved Ahmad
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1 Answer

25 votes
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By definition, you know that when a point is rotated 90 degrees counterclockwise about the origin, point A (x, y) becomes A'(- y, x).

Then, if you rotate 90 degrees counterclockwise about the origin the points A and B you get:


\begin{gathered} A(-2,6)\rightarrow A^(\prime)(-6,-2) \\ B(3,-1)\rightarrow B^(\prime)(-(-1),3)=B^(\prime)(1,3) \end{gathered}

Now graphing points A and B and their respective rotations you have

Now, to know if the segments AB and A'B 'are congruent, you can find a measure of each one of them using the distance formula, which is


d=\sqrt[]{(x_2-x_1)^2+(y_2-y_1)^2}

So, for the measure of segments AB you have


\begin{gathered} (x_1,y_1)=(-2,-6) \\ (x_2,y_2)=(3,-1) \\ d_(AB)=\sqrt[]{(3-(-2))^2+(-1-(-6))^2} \\ d_(AB)=\sqrt[]{(3+2)^2+(-1+6)^2} \\ d_(AB)=\sqrt[]{(5)^2+(5)^2} \\ d_(AB)=\sqrt[]{25+25} \\ d_(AB)=\sqrt[]{50} \\ d_(AB)=7.07 \end{gathered}

For the measure of segments A'B' you have


\begin{gathered} (x_1,y_1)=(-6,-2) \\ (x_2,y_2)=(1,3) \\ d_(A^(\prime)B^(\prime))=\sqrt[]{(1-(-6))^2+(3-(-2))^2} \\ d_(A^(\prime)B^(\prime))=\sqrt[]{(1+6)^2+(3+2)^2} \\ d_(A^(\prime)B^(\prime))=\sqrt[]{(7)^2+(5)^2} \\ d_(A^(\prime)B^(\prime))=\sqrt[]{49+25} \\ d_(A^(\prime)B^(\prime))=\sqrt[]{74} \\ d_(A^(\prime)B^(\prime))=8.6 \end{gathered}

Then, as you can see, the segments AB and A'B'do not have the same measure and therefore are not congruent.

In the diagram below, line segment AB has endpoints at A(-2,-6) and B( 3,-1) .Draw-example-1
User Tim Malseed
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