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

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

The maximum value of sin theta cos theta is :

The maximum value of sin theta cos theta is :

Find the maximum and minimum value of cos^(2) theta- 6 sin theta cos theta + 3 sin^(2) theta + 2 .

The diameter of the nine point circle of the triangle with vertices (3, 4), (5 cos theta, 5 sin theta) and (5 sin theta, -5 cos theta) , where theta in R , is

Let f(theta)= sin theta - cos^(2) theta-1 , where theta in R and m le f(theta) le M . The value of (4m+13) is equal to

The method of eliminating 'theta' from two given equations involving trigonometrical functions of 'theta' . By using given equations involving 'theta' and trigonometrical identities, we shall obtain an equation not involving 'theta' . On the basis of above information answer the following questions. If tan theta + sin theta=m and tan theta - sin theta=n , then (m^(2)-n^(2))^(2) is

Find the maximum and minimum values of 7 cos theta+ 24 sin theta .

The length of the chord joining the points (4 cos theta 4 sin theta) and (4 cos (theta+60^@),4 sin (theta+60^@)) of the circle x^2+y^2=16 is :