If in the expansion of `(a+x)^(n),P and Q` represent the sum of odd and even terms respectively, then `P^(2)-Q^(2)` equals

In the expansion of (1+x)^(n) the coefficients of pth and (p+1)^(th) terms are respectively p and q then p+q =

In the expansion of (1+x)^(n) , coefficients of 2^(text (nd )) 3^(rd) and 4^(th) terms are in A.P., then n =

The fourth seventh and tenth terms of a G.P. are p,q,r respectively, then :

If A is the sum of the odd terms and B is the sum of even terms in the expansion of (x+a)^(n) then A^(2)-B^(2) =

Show that the coefficient of the middle term in the expansion of (1+x)^(2n) is equal to the sum of the coefficients of two middle terms in the expansion of (1 + x)^(2n-1)

If the pth, qth and rth terms of a G.P. are , l,m,n respectively , then l^(q-r)m^(r-p)n^(p-q) is :

If in an A.P. S_(n) = qn^(2) and S_(m) = qm^(2) , where S_(r ) denotes the sum of r terms of the A.P. , then S_(q) equals :

If p rarr(~ p vv q) is false then the truth values of p and q are respectively

If p to (~p vv q) is given to be a false statement then the truth values of p and q respectively.

The 13^(th) term in the expansion of (x^(2) + (2)/(x))^(n) is independent of x , then the sum of the divisors of n is