Points A and B are at #(4 ,1 )# and #(8 ,5 )#, respectively. Point A is rotated counterclockwise about the origin by #pi/2 # 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
Feb 27, 2018

#C=(17,6)#

Explanation:

#"under a counterclockwise rotation about the origin of "pi/2#

#• " a point "(x,y)to(-y,x)#

#rArrA(4,1)toA'(-1,4)" where A' is the image of A"#

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

#rArrulb-ulc=1/2(ula'-ulc)#

#rArrulb-ulc=1/2ula'-1/2ulc#

#rArr1/2ulc=ulb-1/2ula'#

#color(white)(rArr1/2ulc)=((8),(5))-1/2((-1),(4))#

#color(white)(rArr1/2ulc)=((8),(5))-((-1/2),(2))=((17/2),(3))#

#rArrulc=2((17/2),(3))=((17),(6))#

#rArrC=(17,6)#