The smallest positive value of x (in radians ) ` log_(5) tan theta = log_(5)^(4), log _(4) ( e sin theta ) and [ 0, 8 pi]` is

The smallest positive value of x (in radians) satifying the equation log_(cosx)((sqrt(3))/2sinx)=2+log_(cosx)(tanx) , is

The smallest positive value of x (in radians ) satisfying the equation log_(cos x) ((sqrt(3))/(2) sin x) = 2 + log _(sec x) tan x)

The 7th term of log_(e)(5//4) is

Lt_(x to 1)(log_(5)5x)^(log_(x)5)=

If y = 5^(2(log_(5)(x+1)-log_(5)(3x+1)) then (dy)/(dx) at x = 0 is

Evaluate int_(0)^(pi"/"4) log (1 + tan x ) dx .

If sin h^(-1) (x) = log_(e) (5 + sqrt(26)) then x =