Acceleration due to Gravity
 

Vertical Motion under Gravity for A-Levels



Let's assume a body falls freely in an airless space and is therefore not hindered by the air resistance during its fall. The motion of this body is uniformly accelerated. Acceleration when falling is denoted by instead of (from the word gravity). We call it gravitational acceleration, it can also be called free-fall acceleration.


Gravitational acceleration is not constant but changes slightly. Let's list some factors that affect the magnitude of the (Earthly) gravitational acceleration:

  • latitude (it is slightly greater at the Earth's poles than at the equator);

  • altitude (with falling altitude);

  • soil composition (heavy minerals under the Earth's surface slightly increase )


In our calculations, we will consider that the Earth's gravitational acceleration is equal to:




In the exercises, depending on the accuracy of the other data, we will round to a whole number (), to one decimal place, () or to two decimal places as above.


Example

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Since a body moves in a vertical direction during a free fall or vertical throw, we will denote the distance covered by () instead of .


The gravitational acceleration on the Earth's surface is the same for all bodies. Let us denote it by . Then a body falls freely with acceleration which is given as:




All equations and all graphs already known from the chapter, Uniformly accelerated motion are also applicable to the vertical motion under gravity, except that instead of the notation , we use the notation and instead of the notation , we use . The exact derivation of the formulas can be found in the chapter, Uniformly accelerated motion, we just repeat them here.


Free fall



In free fall, the body has an initial velocity of 0 and then increases with the gravitational acceleration :




The graph of the change in velocity against the time is as shown below:


Figure 1: Free fall



The final velocity (Figure 1) when falling to the ground is:




The height that the body covers during the fall is the average speed times the time , or the area under the speed-time graph (the area of the region coloured green in Figure 1):




The time it takes to fall through the height is:




The final speed after falling through the height is given as:




Let's repeat the formulas for free fall:








Example

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Vertical downward throw



If we throw the body vertically downwards, it means we give it an initial velocity , then its velocity increases due to gravitational acceleration (see Figure 2). The velocity-time graph, formulas, and derivations are the same as for uniformly accelerated motion with an initial velocity , only that we replace the acceleration with , and the distance with .


Figure 2: Vertical downward throw



Just before the body falls to the ground, it reaches the final velocity which is given as:




The fall height is calculated by multiplying the average fall speed by the fall time :




where the average speed is given as:




The distance travelled can also be calculated as the area under the velocity-time graph:




The final velocity, depending on the height from which the body falls, is given as:




When a body is thrown vertically downwards at an initial velocity , the following general formulas apply:


The final speed of the body in time is given as:




The height of fall of the body in time is given as:




The final velocity in terms of the height is given as:




Example

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Vertical upward throw



If the body is thrown vertically upwards by giving it an initial velocity , the velocity of the body decreases, as it is acted upon by gravitational acceleration, which is in the opposite direction to the motion of the body. After a certain time , the body reaches its maximum height and stops.


The motion of the body is uniformly decelerating as we have learned in the chapter, Uniformly accelerated motion, and the graph of velocity against time is given as:


Figure 3: Vertical upward throw



The graphs and formulas we learned from the chapter, Uniformly decelerated motion (more precisely, the case where the body has an initial velocity that decreases with time) remain the same, we just replace the acceleration with and distance with .


Formulas describing vertical upward throw:


The final speed as a function of time is given as:




The time is given as:




The height of the body in time is given as:




The maximum height reached by the body is the area under the velocity-time graph and this is given as:




The initial speed required to reach a certain height is given as:




The final speed of the body in terms of the height is given as:




Example

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