The equation of a bisector of the angle between the lies `y-q=(2a)/(1-a^(2))(x-p)and y-q=(2b)/(1-b^(2))(x-p)`is

Find the distance between the points P(x_(1),y_(1),z_(1)) and Q(x_(2),y_(2),z_(2))

If (x_(1),y_(1))&(x_(2),y_(2)) are the ends of a diameter of a circle such that x_(1)&x_(2) are the roots of the equation ax^(2)+bx+c=0 and y_(1)&y_(2) are the roots of the equation py^(2)=qy+c=0. Then the coordinates of the centre of the circle is: ((b)/(2a),(q)/(2p))(-(b)/(2a),(q)/(2p))((b)/(a),(q)/(p)) d.none of these

A straight line intersects the same branch of the hyperbola (x^(2))/(a^(2))-(y^(2))/(b^(2))=1 in P_(1) and P_(2) and meets its asymptotes in Q_(1) and Q_(2) . Then, P_(1)Q_(2)-P_(2)Q_(1) is equal to

If (x_1, y_1)&(x_2, y_2) are the ends of diameter of a circle such that x_1&x_2 are the roots of the equation a x^2+b x+c=0 and y_1&y_2 are the roots of the equation p y^2+q y+c=0 . Then the coordinates f the centre of the circle is: (b/(2a), q/(2p)) (b) (-b/(2a),=q/(2p)) (b/a , q/p) (d) None of these

The point of injtersection of the line x/p+y/q=1 and x/q+y/p=1 lies on the line

The line y=x+rho (p is parameter) cuts the ellipse (x^(2))/(a^(2))+(y^(2))/(b^(2))=1 at P and Q, then prove that mid point of PQ lies on a^(2)y=-b^(2)x .

In DeltaPQR , the equation of the internal angle bisector of angle Q is y = x and the equation of side PR is 3x-y=2 . If coordinates of P are (3, 2) and 2PQ = RQ , then the coordinates of Q are

If P(theta),Q(theta+(pi)/(2)) are two points on the ellipse (x^(2))/(a^(2))+(y^(2))/(b^(2))=1 and a is the angle between normals at P and Q, then