If the largest interval to which x belongs so that the greatest therm in `(1+x)^(2n)` has the greatest coefficient is `(10/11, 11/10)` then n= (A) 9 (B) 10 (C) 11 (D) none of these

If the largest interval to which x belongs so that the greatest term in (1+x)^(2n) has the greatest coefficient is ((10)/(11),(11)/(10)) , then n equals:

The interval in which x must lie so that greatest term in the expansion of (1+x)^(2n) has the greatest coefficient is

The interval in which x must lie so that the greatst term in the expansion of (1 +x)^(2n) has the greatest coefficient,is

The greatest coefficient of (1+x)^10 is

The median of the data is 10 (b) 11 9 (d) None of these

If the greatest term in the expansion of (1+x)^(2n) has the greatest coefficient if and only if xepsilon(10/11, 11/10) and the fourth term in the expansion of (kx+ 1/x)^m is n/4 then find the value of mk.

If the greatest term in the expansion of (1+x)^2n has the greatest coefficient if and only if xepsilon(10/11, 11/10) and the fourth term in the expansion of (kx+ 1/x)^m is n/4 then find the value off mk.

If the greatest term in the expansion of (1+x)^2n has the greatest coefficient if and only if xepsilon(10/11, 11/10) and the fourth term in the expansion of (kx+ 1/x)^m is n/4 then find the value off mk.

Let a_(n)=(10^(n))/(n!) for n=1,2,3, Then the greatest value of n for which a_(n) is the greatest is: (A) 11 (B) 20 (C) 10 (D) 8

If A=[(1,1),(1,0)] and n epsilon N then A^n is equal to (A) 2^(n-1)A (B) 2^nA (C) nA (D) none of these