Give an example?

I am giving an example where sum of three perfect squares are sum of other three perfect squares


9^(2) + 2^(2) + 2^(2) = 4^(2) + 3^(2) + 8^(2)


i.e. a^(2) + b^(2) +c^(2) = d^(2) + e^(2) + f^(2)


But here i am getting "b" %26amp; "c" as same.Give an example where "a", "b" ,"c" ,"d", "e" %26amp; "f" are distinct from each other.I would say that there is no such example .What do u say %26amp; why?

Give an example?
with n a perfect square represent n as x^2 + p with prime p = 1 mod 4 and write p = y^2 + z^2. This yields the representation n = x^2 + y^2 + z^2.


the largest n for wicht this is not possible is 9634





How serious are you with your questions ?


see http://answers.yahoo.com/question/index;...





your chooses answer is not an answer
Reply:Good one.....rajesh
Reply:try this


a = 0 d = 2


b = 3 e = 4


c = 6 f = 5





=%26gt; a^(2) + b^(2) +c^(2) = 0+9+36= 45


=%26gt; d^(2) + e^(2) + f^(2) = 4+16+25= 45





so u see there is a counter example to show tht u r wrong if u say there is no such example.