Two circles have the following equations #(x +5 )^2+(y +6 )^2= 9 # and #(x +2 )^2+(y -1 )^2= 1 #. Does one circle contain the other? If not, what is the greatest possible distance between a point on one circle and another point on the other?

1 Answer
Sep 18, 2016

One circle does not contain the other. Greatest distance #= 11.6158.#

Explanation:

enter image source here

Compare the distance (d) between the centres of the circles to the sum of the radii.

1) If the sum of the radii #>#d, the circles overlap.
2) If the sum of the radii #<#d, then no overlap.
3) If #d+r_B<= r_A#, then Circle A contains Circle B

Given Circle A, centre #(-5,-6)# and radius #r_A=3#
Circle B, centre #(-2,1),# and radius #r_B=1#

The first step here is to calculate d, use the distance formula :
#d=sqrt((x_2-x_1)^2+(y_2-y_1)^2)#

where #(x_1,y_1) and (x_2,y_2)# are 2 coordinate points

here the two points are #(-5,-6)# and #(-2,1)# the centres of the circles

let#(x_1,y_1)=(-5,-6)# and #(x_2,y_2)=(-2,1)#

#d=sqrt(-2-(-5)^2+(1-(-6)^2)#
#=sqrt(3^2+7^2)=sqrt58=7.6158#

Sum of radii = radius of A #(r_A)#+ radius of B #(r_B)# #= 3+1=4#

Since sum of radius #<#d, then no overlap of the circles
no overlap => no containment

Greatest distance = #d#(the yellow segment) #+r_A+r_B#

#= 7.6158+3+1=11.6158#