A line segment has endpoints at $(2, 3)$ $(2 ,3 )$ and $(3, 9)$ $(3 ,9 )$ . If the line segment is rotated about the origin by $\frac{π}{2}$ $( pi)/2$ , translated vertically by $- 8$ $-8$ , and reflected about the x-axis, what will the line segment's new endpoints be?

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A line segment has endpoints at $(2, 3)$ $(2 ,3 )$ and $(3, 9)$ $(3 ,9 )$ . If the line segment is rotated about the origin by $\frac{π}{2}$ $( pi)/2$ , translated vertically by $- 8$ $-8$ , and reflected about the x-axis, what will the line segment's new endpoints be?

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Answer 1 · 2016-12-01T20:52:48

$(2, 3) \to (3, 6) and (3, 9) \to (- 9, 5)$ $(2,3)to(3,6)" and " (3,9)to(-9,5)$

Explanation:

Since there are 3 transformations to be performed here, label the endpoints A (2 ,3) and B (3 ,9)

First Transformation Under a rotation about the origin of $\frac{π}{2}$ $pi/2$

$a point (x, y) \to (- y, x)$ $" a point " (x,y)to(-y,x)$

Hence A(2 ,3) → A'(-3 ,2) and B(3 ,9) → B' (-9 ,3)

Second Transformation Under a translation $((0),(-8))$

$" a point " (x,y)to(x,y-8)$

Hence A'(-3 ,2) → A''(3 ,-6) and B'(-9 ,3) → B''(-9 ,-5)

Third transformation Under a reflection in the x-axis

$" a point " (x,y)to(x,-y)$

Hence A''(3 ,-6) → A'''(3 ,6) and B''(-9 ,-5) → B'''(-9 ,5)

Thus after all 3 transformations.

$(2,3)to(3,6)" and " (3,9)to(-9,5)$

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A line segment has endpoints at $(2, 3)$ $(2 ,3 )$ and $(3, 9)$ $(3 ,9 )$ . If the line segment is rotated about the origin by $\frac{π}{2}$ $( pi)/2$ , translated vertically by $- 8$ $-8$ , and reflected about the x-axis, what will the line segment's new endpoints be?

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Explanation:

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A line segment has endpoints at (2 ,3 )(2,3)(2 ,3 ) and (3 ,9 )(3,9)(3 ,9 ). If the line segment is rotated about the origin by ( pi)/2 π2( pi)/2 , translated vertically by -8 −8-8 , and reflected about the x-axis, what will the line segment's new endpoints be?

1 Answer

Explanation:

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A line segment has endpoints at $(2, 3)$ $(2 ,3 )$ and $(3, 9)$ $(3 ,9 )$ . If the line segment is rotated about the origin by $\frac{π}{2}$ $( pi)/2$ , translated vertically by $- 8$ $-8$ , and reflected about the x-axis, what will the line segment's new endpoints be?