If `k in R_o then det{a d j(k I_n)}` is equal to
a. `K^(n-1)`
b. `K^(n(n-1))`
c. `K^n`
d. `k`

If A is a 3x3 matrix and det (3A) = k {det(A)} , k is equal to

Three six-faced dice are thrown together. The probability that the sum of the numbers appearing on the dice is k(3 le k le 8) , is a. ((k-1)(k-2))/(432) b. (k(k-1))/(432) c. (k^2)/(432) d. None of these

Let A be an nth-order square matrix and B be its adjoint, then |A B+K I_n| is (where K is a scalar quantity) a. (|A|+K)^(n-2) b. (|A|+K)^n c. (|A|+K)^(n-1) d. none of these

The numbers 1,2,3,.., n are arranged in a random order. The probability that the digits 1,2,3,..,k(n gt k) appears as neighbours in that order is a. ((n-k)!)/(n!) b. ((n-k+1)!)/(.n!) c. (n-k)/(,^nC_k) c. (k!)/(n!)

If a + b = k, when a, b gt o and S(k, n) = sum _(r=0)^(n) r^(2) (""^(n) C_(r) ) a^(r) cdot b^(n-r) , then

If A of order n xx n and det A = k, then find det (adj A).

If ^n-1C_r=(k^2-3)^n C_(r+1),then k in

The value of the positive integer n for which the quadratic equation sum_(k=1)^n(x+k-1)(x+k)=10n has solutions alpha and alpha+1 for some alpha is

If N_k= {k_n: n in N} , find N_3 nn N_5 and N_4 nn N_6 .

Let f(x)=(a_(2k)x^(2k)+a_(2k-1)x^(2k-1)+...+a_(1)x+a_(0))/(b_(2k)x^(2k)+b_(2k-1)x^(2k-1)+...+b_(1)x+b_(0)) , where k is a positive integer, a_(i), b_(i) in R " and " a_(2k) ne 0, b_(2k) ne 0 such that b_(2k)x^(2k)+b_(2k-1)x^(2k-1)+...+b_(1)x+b_(0)=0 has no real roots, then