Prove that for n in N ,10^n+3. 4^(n+2)+...

Prove that for `n in N ,10^n+3. 4^(n+2)+5` is divisible by `9` .

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Prove by using the principle of mathematical induction that for all n in N, 10^(n)+3.4^(n+2)+5 is divisible by 9

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10^n+3(4^(n+2))+5 is divisible by (n in N)

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10^n+3(4^(n+2))+5 is divisible by (n in N)

10^n+3(4^(n+2))+5 is divisible by (n in N)

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