A particle is moving along the parabola `y^2 = 12x` at the uniform rate of `10 cm//s.` Find the components of velocity parallel to each of the axes when the particle is at the point `(3,6).`

A point is moving along the parabola y^2 = 8x at the rate of 2m/s . The compoenent velocity parallel to the axis , when it is at the point (2,4) is

A particle moves along the parabola y^2=4x . Find the coordinates of the point on the parabola, where the rate of increment of abscissa is twice the rate of increment of the ordinate.

A particle moves along a path y = ax^2 (where a is constant) in such a way that x-component of its velocity (u_x) remains constant. The acceleration of the particle is

A particle moves along a path y = ax^2 (where a is constant) in such a way that x-component of its velocity (u_x) remains constant. The acceleration of the particle is

A point is moving along the cubical parabola 12y = x^(3) . The rate of ordinate is less than the rate of abscissa when

If a particle moves along the parabola y^2= 8x then the co-ordinates of the point on which the rate of change of abscissa is equal to the rate of change of ordinate, is

A particle moves along the parabola y^(2)=4x . Find the co - ordinates of the point on the parabola where the rate of increment of abscissa is twice the rate of increment of the ordinate.

answer any three questions: (iv) a particle moves along the parabola y^2=4x . Find the coordinates of the point on the parabola ,where the rate of increement of abscissa is twice the rate of increement of the ordinate.

A particle moves along the parabolic path y=ax^(2) in such a The accleration of the particle is:

A particle of mass m movies along a curve y=x^(2) . When particle has x-co-ordinate as 1//2 and x-component of velocity as 4 m//s . Then :-