JEE Main 2022 (Online) 24th June Morning Shift | Gravitation Question 112 | Physics

JEE Main 2022 (Online) 24th June Morning Shift

MCQ (Single Correct Answer)

-1

The approximate height from the surface of earth at which the weight of the body becomes $${1 \over 3}$$ of its weight on the surface of earth is :

[Radius of earth R = 6400 km and $$\sqrt 3 $$ = 1.732]

3840 km

4685 km

2133 km

4267 km

JEE Main 2021 (Online) 1st September Evening Shift

MCQ (Single Correct Answer)

-1

Four particles each of mass M, move along a circle of radius R under the action of their mutual gravitational attraction as shown in figure. The speed of each particle is :

JEE Main 2021 (Online) 1st September Evening Shift Physics - Gravitation Question 115 English

JEE Main 2021 (Online) 1st September Evening Shift Physics - Gravitation Question 115 English

$${1 \over 2}\sqrt {{{GM} \over {R(2\sqrt 2 + 1)}}} $$

$${1 \over 2}\sqrt {{{GM} \over R}(2\sqrt 2 + 1)} $$

$${1 \over 2}\sqrt {{{GM} \over R}(2\sqrt 2 - 1)} $$

$$\sqrt {{{GM} \over R}} $$

JEE Main 2021 (Online) 31st August Evening Shift

MCQ (Single Correct Answer)

-1

If R_E be the radius of Earth, then the ratio between the acceleration due to gravity at a depth 'r' below and a height 'r' above the earth surface is : (Given : r < R_E)

$$1 - {r \over {{R_E}}} - {{{r^2}} \over {R_E^2}} - {{{r^3}} \over {R_E^3}}$$

$$1 + {r \over {{R_E}}} + {{{r^2}} \over {R_E^2}} + {{{r^3}} \over {R_E^3}}$$

$$1 + {r \over {{R_E}}} - {{{r^2}} \over {R_E^2}} + {{{r^3}} \over {R_E^3}}$$

$$1 + {r \over {{R_E}}} - {{{r^2}} \over {R_E^2}} - {{{r^3}} \over {R_E^3}}$$

JEE Main 2021 (Online) 31st August Morning Shift

MCQ (Single Correct Answer)

-1

The masses and radii of the earth and moon are (M₁, R₁) and (M₂, R₂) respectively. Their centres are at a distance 'r' apart. Find the minimum escape velocity for a particle of mass 'm' to be projected from the middle of these two masses :

$$V = {1 \over 2}\sqrt {{{4G({M_1} + {M_2})} \over r}} $$

$$V = \sqrt {{{4G({M_1} + {M_2})} \over r}} $$

$$V = {1 \over 2}\sqrt {{{2G({M_1} + {M_2})} \over r}} $$

$$V = {{\sqrt {2G} ({M_1} + {M_2})} \over r}$$

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