Find an angle  whose rate of increase twice is twice the rate of decrease of its cosine.

Find an angle theta , whose rate of increase is twice as the rate of decrease of its cosine.

Find an angle theta (i) Which increases twice as fast as its cosine. (ii) Whose rate of increase twice is twice the rate of decrease of its consine.

Find an angle theta (i) Which increases twice as fast as its cosine.(ii) Whose rate of increase twice is twice the rate of decrease of its consine.

Find the coordinates of the position of a particle moving along the parabola y^(2) = 4x at which the rate of increase of the abscissa is twice the rate of increase of the ordinate.

If the rate of increase of (x^(2))/(2)-2x+5 is twice the rate of decrease of it then x is

Find an angle which increases twice as fast as its cosine.

If the rate of decrease of x^(2)/2-2x+5 is twice the rate of decrease of x, then x =

Find an angle , which increases twice as fast as it sine.

For what values of x is the rate of increase of x^3-5x^2+5x+8 is twice the rate of increase of x ?

Find an angle theta , which increases twice as fast as it sine.