prove that f(x+y)=f(xy) is a constant function
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when we put x=0 we will get f(y)=f(0)
same as put y=0 we get f(x)=f(0)
so that
f(x+y)=c (c=const)
hence the above function is constant.
same as put y=0 we get f(x)=f(0)
so that
f(x+y)=c (c=const)
hence the above function is constant.
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