Consider a circle , in which a point P is lying inside the circle such that `(PA)(PB)=(PC)(PD)` ( as shown in figure ) .

On the basis of above information , answer the questions
If ` log_(PA) x=2 , log_(PB)x=3, log_(x) PC=4 , ` then ` log_(PD)` x is equal to

Consider a circle , in which a point P is lying inside the circle such that (PA)(PB)=(PC)(PD) ( as shown in figure ) . On the basis of above information , answer the questions Let PA=4 , PB=3 cm and CD is diameter of the circle having the length 8. If PC gt CD , then (PC)/(PD) is equal to

Consider a circle , in which a point P is lying inside the circle such that (PA)(PB)=(PC)(PD) ( as shown in figure ) . On the basis of above information , answer the questions If PA=| cos theta + sin theta | and PB=| cos theta - sin theta | , then maximum value of (PC)(PD) , is equal to

If log_(4)(log_(2)x) + log_(2) (log_(4) x) = 2 , then find log_(x)4 .

If log_(4) x + log_(8)x^(2) + log_(16)x^(3) = (23)/(2) , then log_(x) 8 =

If 3^(log_(2)x)=4^(log_(2)x-1) then x is equal to

If log_(x)a, a^(x//2), log_(b)x are in G.P. then x is equal to

If log_(2) x xx log_(3) x = log_(2) x + log_(3) x , then find x .

If x>1 and log_(2)x,log_(3)x,log_(x)16 are in GP, then what is x equal to ?

(log_(4)x-2)*log_(4)x=(3)/(2)(log_(4)x-1)