If A is a square matrix that |A|= 2, than for any positive integer n ,`|A^(n)|=`

If A is a nilpotent matrix of index 2, then for any positive integer n ,A(I+A)^n is equal to A^(-1) b. A c. A^n d. I_n

If A is a square matrix of order n, then |adj A|=

If Aa n dB are square matrices of the same order and A is non-singular, then for a positive integer n ,(A^(-1)B A)^n is equal to A^(-n)B^n A^n b. A^n B^n A^(-n) c. A^(-1)B^n A^ d. n(A^(-1)B^A)^

Derivative of f(x)=x^n is nx^(n-1) for any positive integer n.

If A is a square matrix of order 3 such that |A|=2,t h e n|(a d jA^(-1))^(-1)| is ___________.

Prove that n^(2)-n divisible by 2 for every positive integer n.

Prove that (n !)^2 < n^n n! < (2n)! , for all positive integers n.

Use the Principle of Mathematical Induction to verify that, for n any positive integer, 6 ^n −1 is divisible by 5 .

If x and y are positive real numbers and m, n are any positive integers, then Prove that (x^n y^m)/((1+x^(2n))(1+y^(2m))) lt =1/4

If a_(1), a_(2) …… a_(n) = n a_(n - 1) , for all positive integer n gt= 2 , then a_(5) is equal to