The number of positive integers satisfying the inequality `C(n+1,n-2) - C(n+1,n-1)<=100` is

The number of positive integers satisfying the inequality ""^(n+1)C_(n-2)-""^(n+1)C_(n-1) le50 is :

The numbers 1,3,6,10,15,21,28"..." are called triangular numbers. Let t_(n) denote the n^(th) triangular number such that t_(n)=t_(n-1)+n,AA n ge 2 . The number of positive integers lying between t_(100) and t_(101) are:

The positive integer value of n >3 satisfying the equation 1/(sin(pi/n))=1/(sin((2pi)/n))+1/(sin((3pi)/n))i s

The inequality n ! > 2^(n-1) is true:

Let n denote the number of all n-digit positive integers formed by the digits 0, 1 or both such that no consecutive digits in them are 0. Let b_n = the number of such n-digit integers ending with digit 1 and c_n = the number of such n-digit integers ending with digit 0. The value of b_6 , is

The number of real negative terms in the binomial expansion of (1+i x)^(4n-2),n in N ,x >0 is n b. n+1 c. n-1 d. 2n

If there are three square matrix A, B, C of same order satisfying the equation A^2=A^-1 and B=A^(2^n) and C=A^(2^((n-2)) , then prove that det .(B-C) = 0, n in N .