Evaluate : `(n!)/(n - r!),` when (i) `n = 6, r = 2
(ii) n = 9, r = 5,`

Evaluate (n!)/((n-r)!) , when n = 9, r = 5

Evaluate (n!)/((n-r)!) , when n = 6, r = 2

Evaluate (n!)/(r!(n-r)!) , when n = 5, r = 2.

Evaluate sum_(r=1)^(n)rxxr!

If ((n),(r)) = ((n),(r+2)), then r = …… ,

Show that a_(1), a_(2) ,……, a_(n) …. Form an AP where a_(n) is defined as below: (i) a_(n) = 3 + 4n , (ii) a_(n) = 9-5n Also find the sum of the first 15 terms in each case.

if ((n),(r)) + ((n),(r-1)) = ((n + 1),(x)), then x = ....

Prove that the greatest value of .^(2n)C_(r)(0 le r le 2n) is .^(2n)C_(n) (for 1 le r le n) .

Let R be a relation from N to N defined by R={(a,b): a, b in N and a=b^(2)). Are the following true? (i) (a,a) in R," for all " a in N (ii) (a,b) in R," implies "(b,a) in R (iii) (a,b) in R, (b,c) in R" implies "(a,c) in R . Justify your answer in each case.

If {:((n),(r)):}=(n!)/(k), then K =.......