The value of x, for which the ninth term in the
expansion of `{sqrt(10)/((sqrt(x))^(5log _(10)x ))+ x.x^(1/(2log_(10)x))}^(10)`
is 450 is equal to

A possible value of 'x', for which the ninth term in the expansion of { 3 ^(log _(3) sqrt(25 ^(x - 1) + 7))+ 3 ^(((1)/(8))log_(3) ^((5^(x-1)+1)))}^(10) in the increasing powers of 3^((-(1)/(8))log_(3) ^((5^(x - 1)+1))) is equal to 180 is

If the third term in the expansion of (1/x + x^(log_(10) x) )^5 is 100, find x .

For what value of x is the ninth term in the expansion of (3^(log_(3)sqrt(25^(x-1))+7)+3^(-(1)/(8)log_(3)(5^(x-1)+1)))^(10) is equal to 180

If the third term in the expansion of ((1)/(x)+_(x)log_(10x))^(5) is 1000, then find x

If the 6th term in the expansion of [(1)/(x^((8)/(3)))+x^(2)log_(10)x]^(8) is 5600, then x=

If x+log_(10)(1+2^(x))=xlog_(10)5+log_(10)6 then x is equal to

x^(log_(10)((y)/(z))).y^(log_(10)((z)/(x))).z^(log_(10)((x)/(y))) is equal to :