When 2^301 is divided by 5, the least po...

When `2^301` is divided by 5, the least positive remainder is

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DISHA PUBLICATION-CHAPTERWISE NUMERIC INTEGER ANSWER QUESTIONS-CHAPTER 4

1 1^(n+2)+1 2^(2n+1) is divisible by 133.
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If n is a positive integer, then 2.4^(2n + 1) + 3^(3n+1) is divisible...
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When 2^301 is divided by 5, the least positive remainder is
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4 1^n-1 4^n is a multiple of 27
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Prove by using the principle of mathematical induction that for all n ...
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For every natural number n, n (n ^(2) -1) is divisible by
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Prove that 2. 7^n+3. 5^n-5is divisible by 24, for all n in N.
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7^(2n) + 2^(3n-3).3^(n-1) is divisible by 25
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Let P(n):2^n<(1xx2xx3xxxxn) . Then the smallest positive integer for w...
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If m and n are any two odd positive integers with n< m, then the large...
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For every natural number n, 3 ^(2n+2)-8n -9 is divisible by 8
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Find the remainder when 5^(99) is divided by 13.
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For all positive intergral values of n, 3 ^(2n)-2n +1 is divisible by
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The remainder when 5^(4n) is divided by 13, is
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