Circle A has a center at (5 ,4 )(5,4) and an area of 16 pi16π. Circle B has a center at (12 ,8 )(12,8) and an area of 9 pi9π. Do the circles overlap? If not, what is the shortest distance between them?

1 Answer
Xr.Shim
May 3, 2018

they don't over lap
the shortest distance between them is sqrt(65) - 7 ~~657 1.062257748

Explanation:

area of Circle A = pi*π (Ra)^2(Ra)2
16piπ = pi * Ra^2πRa2
Ra^2Ra2 = 16
Ra = 4

area of Circle B = pi* Rb^2πRb2
9 pi9π = pi * Rb^2πRb2
9 = Rb^2Rb2
Rb = 3

the distance between the center points is:
sqrt((delta x)^2 + (delta y)^2)(δx)2+(δy)2
delta xδx = Xa - Xb = 5 - 12 = -7
delta yδy = Ya - Yb = 4 - 8 = -4
sqrt((-7)^2 + (-4)^2)(7)2+(4)2 = sqrt(65)65 ~~ 8.062257748

because Ra + Rb < sqrt((delta x)^2 + (delta y)^2)
therefore they didn't overlap.

the shortest distance between them is:
Gap = Distance between 2 center points - Ra - Rb
= sqrt(65) - 4 -3
~~ 1.062257748

keep on learning~

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