In figure, the angle of inclination of the inclined plane is `30^@`. Find the horizontal velocity `V_0` so that the particle hits the inclined plane perpendicularly.
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Determine the horizontal velocity v_0 with which a stone must be projected horizontally from a point P, so that it may hit the inclined plane perpendicularly. The inclination of the plane with the horizontal is theta and point P is at a height h above the foot of the incline, as shown in the figure.

A stone must be projected horizontally from a point P, which is h meter above the foot of a plane inclined at an angle theta with horizontal as shown in figure . Calculate the velocity v of the stone so that in may hit the incline plane perpendiculary.

A projectile is fired with a velocity v at right angle to the slope inclined at an angle theta with the horizontal. The range of the projectile along the inclined plane is

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. .

At what angle should a ball be projected up an inclined plane with a velocity v_0 so that it may hit the incline normally. The angle of the inclined plane with the horizontal is prop . .

A particle is projected from the inclined plane at angle 37^(@) with the inclined plane in upward direction with speed 10m//s . The angle of inclined plane with horizontal is 53^(@) . Then the maximum height attained by the particle from the inclined plane will be-

A bullet is fired from the bottom of the inclined plane at angle theta = 37^@ with the inclined plane. The angle of incline is 30^@ with the horizontal. Find the (a) position of the maximum height of the bullet from the inclined plane , (b) time of light , ( c) range along the incline , (d) the value of theta at which the range will be maximum , ( e) maximum range.

A block is given velocity 10 m/s along the fixed inclined as shown in figure from the bottom of the inclined plane. Find the total distance travelled along the inclined plane. If the coefficient of friction is equal to 0.5

If the angle of inclination of the inclined plane is sin^(-1) ((1)/(2)) when the body just starts sliding find the angle of repose and coefficient of static friction between the body and the inclined plane.

A projectile is projected with speed u at an angle of 60^@ with horizontal from the foot of an inclined plane. If the projectile hits the inclined plane horizontally, the range on inclined plane will be.