Physics, asked by ramesh123417, 10 months ago

choose the correct statement? a] Any object on the earth is pulled towards its centre by the earth. b] Any object moves towards the centre of the earth with an acceleration is no other force acts on the object. c] The acceleration due to gravity has a magnitude 9.8 m s power -2 on the surface of the earth. d] acceleration due to gravity is scalar. [hint: It is more than one correct option. ]​

Answers

Answered by Anonymous
13

Answer

The acceleration which is gained by an object because of gravitational force is called its acceleration due to gravity. Its SI unit is m/s2. Acceleration due to gravity is a vector, which means it has both a magnitude and a direction. The acceleration due to gravity at the surface of Earth is represented by the letter g. It has a standard value defined as 9.80665 m/s2 (32.1740 ft/s2).[1] However, the actual acceleration of a body in free fall varies with location.

Contents

1 Why heavier objects do not fall faster than lighter objects

2 Surface acceleration

3 Altitude

4 References

Why heavier objects do not fall faster than lighter objects

Isaac Newton worked out that resultant force equals mass times acceleration, or in symbols, {\displaystyle F=ma}{\displaystyle F=ma}. This can be re-arranged to give {\displaystyle a={\frac {F}{m}}\ }{\displaystyle a={\frac {F}{m}}\ }. The bigger the mass of the falling object, the greater the force of gravitational attraction pulling it towards Earth. In the equation above, this is {\displaystyle F}F. However, the amount of times the force gets bigger or smaller is equal to the number of times the mass gets bigger or smaller, having the ratio remain constant. In every situation, the {\displaystyle {\frac {F}{m}}\ }{\displaystyle {\frac {F}{m}}\ } cancels down to the uniform acceleration of around 9.8 m/s2. This means that, regardless of their mass, all freely falling objects accelerate at the same rate.

Consider the following examples:

{\displaystyle a={\frac {49\,\mathrm {N} }{5\,\mathrm {kg} }}\ =9.8\,\mathrm {N/kg} =9.8\,\mathrm {m/s^{2}} }{\displaystyle a={\frac {49\,\mathrm {N} }{5\,\mathrm {kg} }}\ =9.8\,\mathrm {N/kg} =9.8\,\mathrm {m/s^{2}} }

{\displaystyle a={\frac {147\,\mathrm {N} }{15\,\mathrm {kg} }}\ =9.8\,\mathrm {N/kg} =9.8\,\mathrm {m/s^{2}} }{\displaystyle a={\frac {147\,\mathrm {N} }{15\,\mathrm {kg} }}\ =9.8\,\mathrm {N/kg} =9.8\,\mathrm {m/s^{2}} }

Surface acceleration

Depending on the location, an object at the surface of Earth falls with an acceleration between 9.76 and 9.83 m/s2 (32.0 and 32.3 ft/s2).[2]

Earth is not exactly spherical.[3] It is similar to a "squashed" sphere, with the radius at the equator slightly larger than the radius at the poles. This has the effect of slightly increasing gravitational acceleration at the poles (since we are close to the centre of Earth and the gravitational force depends on distance) and slightly decreasing it at the equator.[4] Also, because of centripetal acceleration, the acceleration due to gravity is slightly less at the equator than at the poles.[3] Changes in the density of rock under the ground or the presence of mountains nearby can affect gravitational acceleration slightly.[5]

Altitude

Change in gravitational acceleration with the height of an object

The acceleration of an object changes with altitude. The change in gravitational acceleration with distance from the centre of Earth follows an inverse-square law.[6] This means that gravitational acceleration is inversely proportional to the square of the distance from the centre of Earth. As the distance is doubled, the gravitational acceleration decreases by a factor of 4. As the distance is tripled, the gravitational acceleration decreases by a factor of 9, and so on.[6]

{\displaystyle {\mbox{gravitational acceleration}}\ \propto \ {\frac {1}{{\mbox{distance}}^{2}}}\ }{\displaystyle {\mbox{gravitational acceleration}}\ \propto \ {\frac {1}{{\mbox{distance}}^{2}}}\ }

{\displaystyle {\mbox{gravitational acceleration}}\ \times {{\mbox{distance}}^{2}}\ ={k}}{\displaystyle {\mbox{gravitational acceleration}}\ \times {{\mbox{distance}}^{2}}\ ={k}}

At the surface of the Earth, the acceleration due to gravity is roughly 9.8 m/s2 (32 ft/s2). The average distance to the centre of the Earth is 6,371 km (3,959 mi).

{\displaystyle {k}={\mbox{9.8}}\ \times {{\mbox{6371}}^{2}}}{\displaystyle {k}={\mbox{9.8}}\ \times {{\mbox{6371}}^{2}}}

Using the constant {\displaystyle k}k, we can work out gravitational acceleration at a certain altitude.

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