For any natural number $n, 4^{n}$ cannot end with which of the following?

None of the above

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Solution

The correct option is B 0
For $n = 1,$
$4^{n} = 4^{1} = 4.$
For $n = 2,$
$4^{n} = 4^{2} = 16.$
For the number $4^{n}$ to end with digit zero for any natural number $n,$ it should be divisible by both 2 and 5. This means that the prime factorisation of $4^{n}$ should contain the prime numbers 2 and 5. But, this is not possible because $4 = 2^{2}$ so 2 is the only prime in the factorisation of $4^{n} .$ Since 5 is not present in the prime factorization, so there is no natural number $n$ for which $4^{n}$ ends with the digit zero.

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