If the `4^(th)` term of `{sqrt(x^((1)/(1+log_(10)x)))+root(12)(x)}^(6)` is equal to `200`, `x gt 1`and the logarithm is common logarithm, then`x` is not divisible by
(a)`2` (b)`5` (c)`10` (d)`4`

If the fourth term in the expansion of {sqrt(1/(""_"x^log(x+1)"}'+1/(x^12)}^6 is equal to 200 and x >1, then find x

Find the 10^("th")" term of "(1-(3x)/(4))^(4//5)

The 6th term of expansion of (x-1/x)^(10) is

If the fourth term in the binomial expansion of (sqrt ((1)/(x ^( 1 + log _10x) )) + x ^((1)/(12)) ) ^ 6 is equal to 200 , and x gt 1 , then the value of x is : A. 10 ^ 4 B. 10 ^(3) C. 100 D. None of these

Domain of (sqrt(x^(2)-4x+3)+1) log_(5)""((x)/(5))+(1)/(x)(sqrt(8x-2x^(2)-6)+1) le 1 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

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

If a gt 1, x gt 0 and 2^(log_(a)(2x))=5^(log_(a)(5x)) , then x is equal to

If the 6th term in the expansion of (1/(x^(8/3))+x^2(log)_(10)x)^8 is 5600, then x equals 1 b. (log)_e 10 c. 10 d. x does not exist

The function f(x)=log_(10)(x+sqrt(x^(2))+1) is