Q25 of 168 Page 7

The sum of the areas of two squares is 640 m2. If the difference in their perimeters be 64 m, find the sides of the two squares.

Let the sides of the squares be ‘(X)’cms and ‘(Y) cms.


X2 + Y2 = 640 –––––(i)


Area = (Side)2


Perimeter = 4 (Side)


4X – 4Y = 64


On simplifying further,


X – Y = 16 ––––––(ii)


Squaring the above mentioned equation, i.e., equation (ii)


X2 + Y2 – 2XY = 256


Using the identity of a2 + b2 – 2ab = (a – b)2


Putting the value of equation (i) in equation (ii)


640 – 2XY = 256


2XY = 384


XY = 192


Putting the value of in equation (i)


(Y+16)2 + Y2 = 640


Y2 + 256 + 32Y + Y2 = 640


2Y2 + 32Y – 384 = 0


Y2 + 16Y – 192 = 0


On applying Sreedhracharya formula







X = – 12 or 24.


the side is X = 24 cms (Only positive values), other square’s side is Y=X–16 i.e., 8 cms.


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