`2^(n) lt n!` holds true for

The inequality .^(n+1)C_(6)-.^(n)C_(4) gt .^(n)C_(5) holds true for all n greater than ________.

The statement n! gt 2^(n-1), n in N is true for

Let P(n): 2^(n) lt n! , then the smallest positive integer for which P(n) is true is: (i) 1 (ii) 2 (iii) 3 (iv) 4

The values of k, for which |k" "veca|lt|veca| andkveca+(1)/(2)veca is parallel to veca holds true are……..

Let P(n) be the statement: 2^n >= 3n . If P(r) is true, show that P (r + 1) is true. Do you conclude that P(n) is true for all n in N

If (1+px+x^(2))^(n)=1+a_(1)x+a_(2)x^(2)+…+a_(2n)x^(2n) . Which of the following is true for 1 lt r lt 2n

The statement 2^(n) ge n^(2) (where n in N) is true for

Write the following sets in the roster form : B={x|x=2n, n in W and n lt5 }

The set of values of x for which the inequality |x-1|+|x+1|lt 4 always holds true, is

Which of the following is true for n in N ?