Circle A has a radius of 1 1 and a center of (8 ,2 )(8,2). Circle B has a radius of 4 4 and a center of (5 ,3 )(5,3). If circle B is translated by <-2 ,5 ><−2,5>, does it overlap circle A? If not, what is the minimum distance between points on both circles?
1 Answer
no overlap, min. distance ≈ 2.81
Explanation:
What we have to do here is
color(blue)"compare"compare the distance (d ) between the centres of the circles to thecolor(blue)"sum of the radii".sum of the radii. • If sum of radii > d , then circles overlap
• If sum of radii < d , then no overlap
Before calculating d, we require to find the 'new ' centre of B under the given translation, which does not change the shape of the circle, only it's position.
Under the translation
((-2),(5))
(5,3)to(5-2,3+5)to(3,8)larr" new centre of B" To calculate d, use the
color(blue)"distance formula"
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)|)))
where(x_1,y_1),(x_2,y_2)" are 2 coordinate points" The 2 points here are (8 ,2) and (3 ,8)
let
(x_1,y_1)=(8,2)" and " (x_2,y_2)=(3,8)
d=sqrt((3-8)^2+(8-2)^2)=sqrt(25+36)=sqrt61≈7.81 sum of radii = radius of A + radius of B = 1 + 4 = 5
Since sum of radii < d , then there is no overlap
min. distance between points = d - sum of radii
=7.81-5=2.81
graph{(y^2-4y+x^2-16x+67)(y^2-16y+x^2-6x+57)=0 [-32.05, 32.03, -16, 16.04]}
