Let P and Q are two points on the curve `y=log_((1)/(2))(x-0.5)+log_2sqrt(4x^(2)-4x+1)` and P is also on the circle `x^(2)+y^(2)=10`. Q lies inside the given circle such that its abscissa is an integer.
Q. `OP*OQ`, O being the origin is

Let P,Q are two points on the curve y=log_((1)/(2))(x-0.5)+log_(2)sqrt(4x^(2)4x+1) and P is also on the x^(2)+y^(2)=10,Q lies inside the given circle such that its abscissa is an integer.

Let P and Q are two points on curve y=log_((1)/(2))(x-(1)/(2))+log_(2) sqrt(4x^(2)-4x+1) and P is also on x^(2)+y^(2)=10 . Q lies inside the given circle such that its abscissa is integer. find the largest possible value of |vec(PQ)| .

Let P and Q are two points on curve y=log_((1)/(2))(x-(1)/(2))+log_(2) sqrt(4x^(2)-4x+1) and P is also on x^(2)+y^(2)=10 . Q lies inside the given circle such that its abscissa is integer. Find the smallest possible value of vec(OP)*vec(OQ) where 'O' being origin.

P(sqrt2,sqrt2) is a point on the circle x^2+y^2=4 and Q is another point on the circle such that arc PQ= 1/4 circumference. The co-ordinates of Q are

The least distance between two points P and Q ,where P lies on the circle x^(2)+y^(2)-8x-10y+37=0 and Q lies on the circle , x^(2)+y^(2)+16x+55=0 is equal to

P and Q are two points on the line x-y+1=0. If OP=OQ=6 then length of median through O is

Tangent to the curve y=x^(2)+6 at a point P(1, 7) touches the circle x^(2)+y^(2)+16x+12y+c=0 at a point Q. Then the coordinates of Q are

Two tangents OP & OQ are drawn from origin to the circle x^(2)+y^(2)-x+2y+1=0 then the circumcentre of Delta OPQ is

If the line px+qy=1 touches the circle x^(2)+y^(2)=r^(2), prove that the point (p,q) lies on the circle x^(2)+y^(2)=r^(-2)