A line segment has endpoints at (7 ,3 )(7,3) and (1 ,2 )(1,2). The line segment is dilated by a factor of 3 3 around (3 ,4 )(3,4). What are the new endpoints and length of the line segment?
1 Answer
Explanation:
Label the endpoints A(7 ,3) and B(1 ,2).
Label the centre of dilatation C(3 ,4)
CtoA" is the translation" ((x_A-x_C),(y_A-y_C))
=((7-3),(3-4))=((4),(-1))
rArrCtoA'=3((4),(-1))=((12),(-3)) Now add the components of the translation to the coordinates of C to obtain the coordinates of the image A'.
rArrA'=(3+12,4-3)=(15,1) Repeat the process to find B'
CtoB" is the translation " ((x_B-x_C),(y_B-y_C))
=((1-3),(2-4))=((-2),(-2))
rArrCtoB'=3((-2),(-2))=((-6),(-6)) Add the components of the translation to the coordinates of C to obtain the coordinates of the image B'.
rArrB'=(3-6,4-6)=(-3,-2) To calculate the length of the segment use the
color(blue)"distance formula"
color(orange)"Reminder " color(red)(bar(ul(|color(white)(2/2)color(black)(d=sqrt((x_2-x_1)^2+(y_2-y_1)^2))color(white)(2/2)|)))
color(white)(xxxxx)" where" (x_1,y_1),(x_2,y_2)" are 2 coordinate points" The 2 points here are (15 ,1) and (-3 ,-2)
let
(x_1,y_1)=(15,1)" and " (x_2,y_2)=(-3,-2)
d=sqrt((-3-15)^2+(-2-1)^2)=sqrt(324+9)≈18.248
