If x = log p and `y=(1)/(p),` then

Let x and y be the positive real numbers such that log_x y=-(1)/(4) , then value of the expression log_x(xy^5)-log_y""((x^(2))/(sqrt(y))) is (p)/(q) then q is _____________. { where p , q in N and are coprime to each other }

If log_(x)y= (log_(a)y)/(P) then the value of P is

The numbers 1/3, 1/3 log _(x) y, 1/3 log _(y) z, 1/7 log _(x) x are in H.P. If y= x ^® and z =x ^(s ), then 4 (r +s)=

If f(x)=P log |x|+q x^(2)+x has extrema at x=1 and a =-(4)/(3) , then (p , q)-=…

Let P=(5)/((1)/(log_(2)x)+(1)/(log_(3)x)+(1)/(log_(4)x)+(1)/(log_(5)x))and (120)^(P)=32 , then the value of x be :

Curve C_(1):y=ex ln x and C_(2):y=(ln x)/(ex) intersect at point 'p' whose abscissa is less than 1. Find equation of normal to curve C_(1) at point P.

f(x)=((4^(x)-1)^(3))/(sin((x)/(p))log(1+(x^(2))/(3))) is continuous at x=0 and f(0)=12(ln4)^(3) then p=

If f(x)=((4^(x)-1)^(3))/(sin((x)/(p))log(1+(x^(2))/(3))) is cont. at x=0 and f(0)=(6log2)^(3) then p=