A particle is projected on an inclined plane with a speed `u` as shown in (Fig. 5.61). Find the range of the particle on the inclined plane.
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A particle is projected along an inclined plane as shown in figure. What is the speed of the particle when it collides at point A ? (g = 10 m/s^2)

A particle is projected along an inclined plane as shown in figure. What is the speed of the particle when it collides at point A ? (g = 10 m//s)

A ball is projected from point A with velocity 20 m/s prependicular to the inclined plane as shown in figure. What is the range of the ball on the inclined plane ?

An inclined plane makes an angle theta_0 = 30^@ with the horizontal. A particle is projected from this plane with a speed of 5 ms^-1 at an angle of elevation beta = 30^@ with the horizontal as shown in (Fig. 5.53). (a) Find the range of the particle on the plane when it strikes the plane. (b) Find the range of the particle for beta = 120^@ . .

An inclined plane makes an angle theta_0 = 30^@ with the horizontal. A particle is projected from this plane with a speed of 5 ms^-1 at an angle of elevation beta = 30^@ with the horizontal as shown in (Fig. 5.53). (a) Find the range of the particle on the plane when it strikes the plane. (b) Find the range of the particle for beta = 120^@ . .

An particle is projected with velocity u on an inclined plane at an angle theta with the plane. If the particle lands on the plane at right its time of flight is (u cosec theta)/(2 g) . Find the angle of inclination of the plane with horizontal.

A particle is projected horizontally with speed u from point A, which is 10 above the ground . If the particle hits the inclined perpendicularly at point B. [ g = 10 m//s^(2)] Find horizontal speed with which the particle was projected

If the particle is projected down onto the inclined plane at same speed and angle with the inclined plane the ratio of the time of flight and time of flight for upward projection is :