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 traed out by `P`.

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 and B are two given points whose co- ordinates 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 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. What curve does it represent?

The coordinates of the point A and B are (a,0) and (-a,0), respectively.If a point P moves so that PA^(2)-PB^(2)=2k^(2), when k is constant,then find the equation to the locus of the point P.

The coordinates of the point A and B are (a,0) and (-a ,0), respectively. If a point P moves so that P A^2-P B^2=2k^2, when k is constant, then find the equation to the locus of the point P .

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.

The coordinates of the point A and B are (a,0) and (-a ,0), respectively. If a point P moves so that P A^2-P B^2=2k^2, when k is constant, then find the equation to the locus of the point Pdot

The coordinates of the point A and B are (a,0) and (-a ,0), respectively. If a point P moves so that P A^2-P B^2=2k^2, when k is constant, then find the equation to the locus of the point Pdot