The minimum and maximum velocities of a projectile are `10ms^(-1)` and `20ms^(-1)` respectively. Find the horizontal range and maximum height `(g=10ms^(-2))`

The minimum and maximum velocities of a projectile are 10 ms^(-1) and 20 ms^(-1) respectively. The horizontal range and maximum height are respectively (g=10 ms^(-2) )

Consider a horizontal surface moving vertically upward with velocity 2ms^(-1) . A small ball of mass 2 kg is moving with velocity (2hati-2hatj)ms^(-1) If the coefficient of restitution and coefficient of friction are (1)/(2) and (1)/(3 respectively, find the horizontal velocity ("in "ms^(-1)) of the ball after the collision.

The maximum height attained by a ball projected with speed 20 ms^(-1) at an angle 45^(@) with the horizontal is [take g = 10 ms^(-2) ]

The velocity of projection of oblique projectile is (6hati+8hatj)ms^(-1) The horizontal range of the projectile is

The maximum transverse velocity and maximum transverse acceleration of a harmonic wave in a one - dimensional string are 1 ms^(-1) and 1 ms^(-2) respectively. The phase velocity of the wave is 1 ms^(-1) . The waveform is

(A): The maximum horizontal range of projectile is proportional to square of velocity. (R): The maximum horizontal range of projectile is equal to maximum height at tained by projectile

At a height of 15 m from ground velocity of a projectile is v = (10hati+ 10hatj) . Here hatj is vertically upwards and hati is along horizontal direction then (g = 10 ms^(-1) )

A particle is projected at an angle of 45^(@) with a velocity of 9.8 ms^(-1) . The horizontal range will be (Take, g = 9.8 ms^(-2))

Assertion At height 20 m from ground , velocity of a projectile is v = (20 hati + 10 hatj) ms^(-1) . Here, hati is horizontal and hatj is vertical. Then, the particle is at the same height after 4s. Reason Maximum height of particle from ground is 40m (take, g = 10 ms^(-2))

One of the rectangular components of a velocity of 20 ms^(-1) is 10 ms^(-1) . Find the other component.