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 question: Let PA=4 , PB=3 cm and CD is diameter of the circle having the length 8 cm. If PC gt PD , 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) 7 = x , then log_(7) 16 is equal to

The solution set of log_(x)2 log_(2x)2 = log_(4x) 2 is :

The number of solutions of : log_(4) (x - 1)= log_(2) (x - 3) is :

log_(2)(log_(3)(log_(2)x))=1 , then the value of x is :

If (4)^(log_(9) 3)+(9)^(log_(2) 4)=(10)^(log_(x) 83) , then x is equal to

If y = log (log x), then (d^(2)y)/(dx^(2)) is equal to

PA and PB are two tangents drawn from point P to circle of radius 5 . A line is drawn from point P which cuts at C and D such that PC=5 and PD=15 and angleAPB= theta . On the basis of above information answer the questions . Number of solution(s) of the equation log_(cos theta )(x+2)=2+3 log_((x+2)) sin""((5 theta )/(2)) is

If y = log (log x) then (d^(2)y)/(dx^(2)) is equal to