[" Given that "A-=(1,-1)" and locus of "...

[" Given that "A-=(1,-1)" and locus of "B" is "x^(2)+y^(2)=16." If "P],[" divides "AB" in the ratio "3:2" then locus of "P" is "],[[" (a) "(x-2)^(2)+(y-3)^(2)=4,(5x-2)^(2)+(5y+2)^(2)=14],[" (b) "(x+1)^(2)+(y-2)^(2)=4,(5x-2)^(2)+(5y+2)^(2)=14],[" (c) "(x-3)^(2)+(y-2)^(2)=4,],[" (d) "(3x+2)^(2)+(3y-2)^(2)=400]]

Similar Questions

Explore conceptually related problems

Given that A(1,-1) and locus of B is x^(2)+y^(2)=16.1fP divides AB in the ratio 3:2 then locus of P is

A=(2,-1) locus of B is x^(2)+y^(2)=25. If P divides AB in the ratio 1:2 then locus of P is

A line AB meets X-axis at A and Y-axis at B. P(4, -1) divides AB in the ratio 1:2. Find the co-ordinates of A and B.

A line AB meets X-axis at A and Y-axis at B. P(4, -1) divides AB in the ratio 1:2. Find the Coordinates of A and B

The locus given by x^(2)-y^(2)+x+y-1=0 is

The line joning (5,0) and (10costheta,10sintheta) is divided internally in the ratio 2:3 at P. Then locus of P is

Let the foci of the ellipse (x^(2))/(9) + y^(2) = 1 subtend a right angle at a point P . Then the locus of P is _

A line AB meets X-axis at A and Y-axis at B. P(4, -1) divides AB in the ratio 1:2 . (i) Find the coordinates of A and B.

Let P be a point on x^2 = 4y . The segment joining A (0,-1) and P is divided by point Q in the ratio 1:2, then locus of point Q is