Velocity-time curve for a body projected vertically upwards:-

The escape velocity for a body projected vertically upwards from the surface of the earth is 11.2 km s^(-1) . If the body is projected in a direction making an angle 45^@ with the vertical, the escape velocity will be

The escape velocity of a body projected vertically upward from the earth's surface is 11.2 " kms"^(-1) . If the body is projected in a direction making 30^(@) angle to the vertical, its escape velocity in this case will be

With what velocity a body of mass m be projected vertically upwards so that it may be able to reach a height nR above earth's surface

A body is projected vertically upwards wth a velocity u=5m//s . After time t another body is projected vertically upward from the same point with a velocity v=3m//s . If they meet in minimum time duration measured from the projection of first body, then t=k/g sec find k (where g is gravitatio acceleration).

A body is projected with the velocity u_1 from the point (A) as shown in Fig. 2. (d). 37. At the same time another body is projected vertically upwards with the velocity u_2 from the point (B) .What should be the value of u_1//u_1 for both the bodies to collide ? .

A particle is situated at a height 3 R from the earth surface . The velocity with which it should be projected vertically upward so that it does not return to earth is

(A):Body projected vertically up or down from the top of a tower with same velocity will reach the ground with same velocity. (R ):Both the bodies projected vertically up and town will have same displacement and acceleration.

A stone is dropped from a height 300 m and at the same time another stone is projected vertically upwards with a velocity of 100m//sec . Find when and where the two stones meet.

Two balls A and B are projected from the same location simultaneously. Ball A is projected vertically upwards and ball B at 30^@ to the vertical. They reach the ground simultaneously. The velocities of projection of A and B are in the ratio