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 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 a. 4 or 7 b. 4 or 2 c. 2 or 3 d. 7 or 8

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 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 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.

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.

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)| .

The fixed point P on the curve y=x^(2)-4x+5 such that the tangent at P is perpendicular to the line x+2y-7=0 is given by

The tangent at a point P on the curve y =ln ((2+ sqrt(4-x ^(2)))/(2- sqrt(4-x ^(2))))-sqrt(4-x ^(2)) meets the y-axis at T, then PT^(2) equals to :

The tangent at a point P on the curve y =ln ((2+ sqrt(4-x ^(2)))/(2- sqrt(4-x ^(2))))-sqrt(4-x ^(2)) meets the y-axis at T, then PT^(2) equals to :