Class 11 Physics Gravitation Acceleration Due to Gravity and its Variation

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Write the equation of gravitational acceleration which is used for any height $h$ from the surface of the Earth.

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(N/A) The gravitational acceleration $g$ at a height $h$ above the surface of the Earth is given by the formula:
$g_h = g \left( \frac{R_e}{R_e + h} \right)^2$
Where:
$g_h$ is the acceleration due to gravity at height $h$.
$g$ is the acceleration due to gravity at the Earth's surface $(g \approx 9.8 \ m/s^2)$.
$R_e$ is the radius of the Earth.
$h$ is the height above the Earth's surface.

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Acceleration Due to Gravity and its Variation

The acceleration due to gravity at an altitude $h$ above the Earth's surface is half of its value on the surface of the Earth. If the radius of the Earth $R = 4000 \ mile$,the altitude $h$ is approximately ......... $mile$.

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If the radius of the Earth were to shrink by half,its mass remaining the same,what would be the weight of an object on its surface?

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The mass of a planet is $\frac{1}{9}$ of the mass of the Earth and its radius is half that of the Earth. If a body weighs $9 \ N$ on the Earth,its weight on the planet would be ........ $N$.

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If the mass of Earth is $80$ times that of a planet and its diameter is double that of the planet,and $g$ on Earth is $9.8 \ m/s^2$,then the value of $g$ on that planet is ........ $m/s^2$.

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$A$ body weighs $500 \,N$ on the surface of the earth. At what distance below the surface of the earth will it weigh $250 \,N$ (in $\,km$)? (Radius of earth, $R = 6400 \,km$)

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Write the equation of gravitational acceleration which is used for any height $h$ from the surface of the Earth.

Similar Questions

The acceleration due to gravity at an altitude $h$ above the Earth's surface is half of its value on the surface of the Earth. If the radius of the Earth $R = 4000 \ mile$,the altitude $h$ is approximately ......... $mile$.

If the radius of the Earth were to shrink by half,its mass remaining the same,what would be the weight of an object on its surface?

The mass of a planet is $\frac{1}{9}$ of the mass of the Earth and its radius is half that of the Earth. If a body weighs $9 \ N$ on the Earth,its weight on the planet would be ........ $N$.

If the mass of Earth is $80$ times that of a planet and its diameter is double that of the planet,and $g$ on Earth is $9.8 \ m/s^2$,then the value of $g$ on that planet is ........ $m/s^2$.

$A$ body weighs $500 \,N$ on the surface of the earth. At what distance below the surface of the earth will it weigh $250 \,N$ (in $\,km$)? (Radius of earth, $R = 6400 \,km$)

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