The distance a free falling object has traveled can be modeled by the equation, `d=(1)/(2)at^(2)` where a is acceleration due to gravity and t is the amount of time the object has fallen. What is t in terms of a and d?

The displacement of a body is given by s=(1)/(2)g t^(2) where g is acceleration due to gravity. The velocity of the body at any time t is

The displacement of a body is given by s=(1)/(2)g t^(2) where g is acceleration due to gravity. The velocity of the body at any time t is

An object lauched upwards at an angle has parabolic motion. The height h, of a projectile at time t is given by the equation h =1/2 at ^(2) + v _(y)t + h _(0), where a is the acceleration due to gravity, v _(v) is the vertical component of the velocity, and h _(0) is the initial height. Which of the following equations correctly represents the object's acceleration due to gravity in terms of the other variables ?

The approximate height h of an object launched vertically upward after an elapsed time t is represented by the equation h=(1)/(2)at^(2)+v_(o)t+h_(o) , where a is acceleration due to gravity, v_(o) is the object's initial velocity, and h_(o) is the objects initial height. the table aabove gives the acceleration due to gravity on Earth's moon and several planets. If two identical objects launched vertically upward at an initial velocity of 40m/s from the surfaces of Mars and Earth's moon approximately how many more seconds will it take for the moon projectile to return to the ground than the Mars projectile?

If g is acceleration due to gravity , then the vertical distance travelled by a projectile in time t is equal to

If the acceleration due to gravity on 3.8 ms^-2 , then what would be the weight object on mars which has a mass of 10 kg on moon.

Find ratio of acceleration due to gravity g at depth d and at height h where d=2h

The distance S an object travles under the influence of gravity in time t seconds is given by S(t)=(1)/(2)"gt"^(2)+at+b where, (g is the acceleration due to gravity), a, b, are constants. Check if the function S(t) is one-one.