The equation of parabola whose vertex and focus lie on the axis of x at distances a and `a_1` from the origin respectively, is

The equation of the parabola whose vertex and focus lie on the axis of x at distances a and a_1 from the origin, respectively, is

The equation of the parabola whose vertex and focus lie on the axis of x at distances a and a_1 from the origin, respectively, is (a) y^2-4(a_1-a)x (b) y^2-4(a_1-a)(x-a) (c) y^2-4(a_1-a)(x-a) (d) n o n e

The equation of the parabola whose vertex and focus lie on the axis of x at distances a and a_1 from the origin, respectively, is (a) y^2-4(a_1-a)x (b) y^2-4(a_1-a)(x-a) (c) y^2-4(a-a_1)(x-a) (d) none of these

The equation of the parabola whose vertex and focus lie on the axis of x at distances a and a_1 from the origin, respectively, is (a) y^2-4(a_1-a)x (b) y^2-4(a_1-a)(x-a) (c) y^2-4(a_1-a)(x-a) (d) n o n e

The equation of the parabola whose vertex and focus lie on the axis of x at distances a and a_(1) from the origin,respectively,is y^(2)-4(a_(1)-a)xy^(2)-4(a_(1)-a)(x-a)y^(2)-4(a_(1)-a)(x-a)1) none of these

show that the equation of the parabola whose vertex and focus are on the x -axis at distances a and a' from the origin respectively is y^(2) = 4 (a'-a) (x - a )

Prove that the equation of the parabola whose vertex and focus are on the X-axis at a distance a and a'from the origin respectively is y^2=4(a'-a)(x-a)

Prove that the equation of the parabola whose vertex and focus are on the X-axis at a distance a and a'from the origin respectively is y^2=4(a'-a)(x-a)

Prove that the equation of the parabola whose vertex and focus are on the X-axis at a distance a and a'from the origin respectively is y^2=4(a'-a)(x-a)