A(2, 0) and B(4, 0) are two given points. A point P moves so that `PA^(2)+PB^(2)=10`. Find the locus of P.

A(2, 0) and B(4, 0) are two given points. A point P moves so that P A 2 + P B 2 = 10 . Find the locus of P.

A (a,0) , B (-a,0) are two points . If a point P moves such that anglePAB - anglePBA = pi//2 then find the locus of P.

A(1,2),B(2,- 3),C(-2,3) are 3 points. A point P moves such that PA^(2)+PB^(2)=2PC^(2) . Show that the equation to the locus of P is 7 x - 7y + 4 = 0 .

A(a,0) , B(-a,0) are two point . If a point P moves such that anglePAB - anglePBA = 2alpha then find the locus of P .

A (-1,0) and B (2,0) are two given points. A point M is moving in such a way that the angle B in the triangle AMB remains twice as large as the angle A. Show that the locus of the point M is a hyperbola. Fnd the eccentricity of the hyperbola.

A(2,3) , B (1,5), C(-1,2) are the three points . If P is a point such that PA^(2)+PB^(2)=2PC^2 , then find locus of P.

If A and B are two fixed points and P is a variable point such that PA + PB = 4 , the locus of P is

A and B are two given points whose coordinates are (-5, 3) and (2, 4) respectively. A point P moves in such a manner that PA : PB = 3:2 . Find the equation to the locus traced out by P .

A(-2, 0) and B(2,0) are two fixed points and P 1s a point such that PA-PB = 2 Let S be the circle x^2 + y^2 = r^2 , then match the following. If r=2 , then the number of points P satisfying PA-PB = 2 and lying on x^2 +y^2=r^2 is

The line joining the points A (-3, -10) and B (-2, 6) is divided by the point P such that (PB)/(AB) = (1)/(5). Find the co-ordinates of P.