A parabola of latus rectum `l` touches a fixed equal parabola. The axes of two parabolas are parallel. Then find the locus of the vertex of the moving parabola.

A parabola, of latus-rectum l, touch a fixed equal parabola, the axes of two parabola, being parallel. Prove that the locus of the vertex of the moving parabola is a parabola of latus rectum 2l.

A parabola with latusrectum 8 touches a fixed equal parabola. The axes of two parabola are parallel then the locus of the vertex of moving parabola is A) a circle with radius 4 B) a parabola C) a conic with latusrectum 16 D) a circle with centre at vertex of parabola

If parabola of latus rectum touches a fixed equal parabola, the axes of the two curves being parallel, then the locus of the vertex of the moving curve is

If parabola of latus rectum l touches a fixed equal parabola, the axes of the two curves being parallel, then the locus of the vertex of the moving curve is

If parabola of latus rectum touches a fixed equal parabola,the axes of the two curves being parallel,then the locus of the vertex of the moving curve is

If the focus of a parabola is (2, 3) and its latus rectum is 8, then find the locus of the vertex of the parabola.

If the focus of a parabola is (2, 3) and its latus rectum is 8, then find the locus of the vertex of the parabola.

If the focus of a parabola is (2, 3) and its latus rectum is 8, then find the locus of the vertex of the parabola.

If the focus of a parabola is (2, 3) and its latus rectum is 8, then find the locus of the vertex of the parabola.

If the focus of a parabola is (2,3) and its latus rectum is 8, then find the locus of the vertex of the parabola.