Points A and B are at $(2 ,6 )$ and $(6 ,9 )$ , respectively. Point A is rotated counterclockwise about the origin by $pi$ and dilated about point C by a factor of $1/2$ . If point A is now at point B, what are the coordinates of point C?

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Points A and B are at $(2 ,6 )$ and $(6 ,9 )$ , respectively. Point A is rotated counterclockwise about the origin by $pi$ and dilated about point C by a factor of $1/2$ . If point A is now at point B, what are the coordinates of point C?

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Answer 1 · 2018-07-31T13:13:29

$C=(14,24)$

Explanation:

$"under a counterclockwise rotation about the origin of "pi$

$• " a point "(x,y)to(-x,-y)$

$A(2,6)toA'(-2,-6)" where A' is the image of A"$

$vec(CB)=color(red)(1/2)vec(CA')$

$ulb-ulc=1/2(ula'-ulc)$

$ulb-ulc=1/2ula'-1/2ulc$

$1/2ulc=ulb-1/2ula'$

$color(white)(1/2ulc)=((6),(9))-1/2((-2),(-6))$

$color(white)(1/2ulc)=((6),(9))-((-1),(-3))=((7),(12))$

$ulc=2((7),(12))=((14),(24))$

$rArrC=(14,24)$

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Points A and B are at $(2 ,6 )$ and $(6 ,9 )$ , respectively. Point A is rotated counterclockwise about the origin by $pi$ and dilated about point C by a factor of $1/2$ . If point A is now at point B, what are the coordinates of point C?

1 Answer

Explanation:

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Humanities

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Points A and B are at (2 ,6 )(2 ,6 ) and (6 ,9 )(6 ,9 ), respectively. Point A is rotated counterclockwise about the origin by pi pi and dilated about point C by a factor of 1/2 1/2 . If point A is now at point B, what are the coordinates of point C?

1 Answer

Explanation:

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Points A and B are at $(2 ,6 )$ and $(6 ,9 )$ , respectively. Point A is rotated counterclockwise about the origin by $pi$ and dilated about point C by a factor of $1/2$ . If point A is now at point B, what are the coordinates of point C?