f(x)=ax
⇒f(1)=a=3
so f(x)=3x
i=1∑nf(i)=363
⇒3+32+.....3n=363
23(3n−1)=363
3n=243⇒n=5
Suppose that a function f:R→R satisfies f(x+y)=f(x)f(y) for all x,yϵR and f(1)=3. If i=1∑nf(i)=363, then n is equal to ..... .
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