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AAKASH INSTITUTE-PRINCIPLE OF MATHEMATICAL -Assignmenet ((Section-A(Objective Type Questions (One option is correct))
- Let P(n) be a statement and let P(n) Rightarrow P(n+1) for all natural...
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- The statement i.e. (n+3)^(2) gt 2^(n+3) is true.
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- A student was asked to prove a statement P(n) by using the principle ...
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- Let P(n): n^(2)-n+41 is a prime number, then
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- Let P(n) be a statement such that P(n) Rightarrow P(n+1) for all n in ...
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- Let P(n): n^(2)+n is odd, then P(n) Rightarrow P(n+1) for all n. and P...
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- Consider the statement P(n): n^(2) ge 100. Here, P(n) Rightarrow P(n+1...
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- The statement x^(n)-y^(n) is divisible by (x-y) where n is a positive ...
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- If x!= y, then for every natural number n, x^n - y^n is divisible by
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- 9^(n)-8^(n)-1 is divisible by 64 is
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- 2^(n) gt 2n+1 for all natual number n is for n>2
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- 3^(2n)-1 is divisible by 8, for all natural numbers n.
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