Two circles have the following equations #(x -1 )^2+(y -4 )^2= 64 # and #(x +3 )^2+(y -4 )^2= 9 #. 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 26, 2016

Yes, one circle contains the other.

Explanation:

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Circle A, #(x-1)^2+(y-4)^2=64#, center #(1,4)#, radius #r_A=8#
Circle B, #(x+3)^2+(y-4)^2=9#, center #(-3,4)#, radius #r_B=3#

1) calculate d the distance between the centres of the circles, use the distance formula :
#d=sqrt((x2−x1)^2+(y2−y1))^2#

where #(x1,y1)and(x2,y2)# are #(1,4)#, and #(-3,4)#

#d=sqrt((−3−1)^2+(4-4)^2)=sqrt(16)=4#

2) calculate the sum of the radii #(r_A+r_B)#

Sum of radii =# r_ A + r_B =8+3=11#

3) calculate the difference of the radii #(r_A-r_B)#

Difference of Radii # r_ A- r_B = 8-3=5#

3 )compare the distance d between the centres of the circles to the sum of the radii and to the difference of the radii.

1) If #r_A+r_B >d#, the circles overlap.
2) If #r_A+r_B< d#, then no overlap.
3) If #r_A-r_B >d#, then Circle A contain Circle B.

In our case, since # r_A -r_B >d#,
Hence, Circle B is contained in Circle A.