1. A particle projected from a point meets the horizontal plane through the point of projectin after travelling a horizontal distance a, and in the course of its trajectory attains a greatest height b above the point of projection.
Find the horizontal and vertical components of the velocity in terms of a and b. Show that when it has described a horizontal distance x, it has attained a height of 4bx(a-x) / a^2
2. A batsman hits a scricket ball "off his toes" towards a fieldsman who is 65m away. The ball reaches a maximum height of 4.9m and the horizontal component of its velocity is 28m/s.
Find the constant speed with which the fieldsman must run forward, starting at the instant the ball is hit, in order to catch the ball at a height of 1.3m above the ground. (g=9.8)
ANS: 7m/s
3. Find the speed and direction of a particle which, when projected from a point 15m above the horizontal ground, just cleans the top of a wall 26.25 m high and 30m away.
ANS: 25m/s, 36*52*
Thanks so much ~~
Find the horizontal and vertical components of the velocity in terms of a and b. Show that when it has described a horizontal distance x, it has attained a height of 4bx(a-x) / a^2
2. A batsman hits a scricket ball "off his toes" towards a fieldsman who is 65m away. The ball reaches a maximum height of 4.9m and the horizontal component of its velocity is 28m/s.
Find the constant speed with which the fieldsman must run forward, starting at the instant the ball is hit, in order to catch the ball at a height of 1.3m above the ground. (g=9.8)
ANS: 7m/s
3. Find the speed and direction of a particle which, when projected from a point 15m above the horizontal ground, just cleans the top of a wall 26.25 m high and 30m away.
ANS: 25m/s, 36*52*
Thanks so much ~~