If the 6th term in the expansion of`(1/(x^(8/3))+x^2(log)_(10)x)^8` is 5600, then `x` equals

Find the 4^th term in the expansion of (x-2y)^12 .

Find the 6th term in expansion of (2x^2-1//3x^2)^(10)dot

Find the middle term in the expansion of (3 - 1/(2x))^(10)

Find the constant term in the expansion of (x-1//x)^6dot

The middle term in the expansion of (10/x + x/10)^(10) is

If the third term in expansion of (1+x^(log_2x))^5 is 2560 then x is equal to (a) 2sqrt2 (b) 1/8 (c) 1/4 (d) 4sqrt2

The middle term in the expansion of (x/3-2/sqrt(x))^(6) is

Find the 13^(th) term in the expansion of (9x - 1/(3sqrt(x)))^(18) , x != 0 .

The sixth term in the expansion of ( sqrt(2^(log(10-3^x))) + (2^((x-2)log3))^(1/5))^m is equal to 21, if it is known that the binomial coefficient of the 2nd 3rd and 4th terms in the expansion represent, respectively, the first, third and fifth terms of an A.P. (the symbol log stands for logarithm to the base 10) The sum of possible value of x is