The dimension of universal gravitational...

The dimension of universal gravitational constant are

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`[G]=([F][r^2])/([m_1m_2])=([M^1L^1T^(-2)][M^0L^2T^0])/([M^2L^0T^0])=[M^(-1)L^3T^(-2)]`.

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The Energy (E) , angular momentum (L) and universal gravitational constant (G) are chosen as fundamental quantities .The dimensions of universal gravitational constant in the dimensional formula of Planks constant (h) is

`-1`

`5//3`

`1`

The Energy (E) angular momentum (L) and universal gravitational constant (G) are chosen as fundamental quantities. The dimensions of universal gravitational constant in the dimensional formula of Planks constant (h) is

`0`

`-1`

`5//3`

`1`

The energy (E), angular momentum (L) and universal gravitational constant (G) are chosen as fundamental quantities. The dimensions of universal gravitational constant in the dimensional formula of Planck's constant (h) is :

`-1`

`5//3`

`1`

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The dimensions of the universal gravitational constant are

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The dimension of universal gravitational constant are

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The Energy (E) , angular momentum (L) and universal gravitational constant (G) are chosen as fundamental quantities .The dimensions of universal gravitational constant in the dimensional formula of Planks constant (h) is

The Energy (E) angular momentum (L) and universal gravitational constant (G) are chosen as fundamental quantities. The dimensions of universal gravitational constant in the dimensional formula of Planks constant (h) is

The energy (E), angular momentum (L) and universal gravitational constant (G) are chosen as fundamental quantities. The dimensions of universal gravitational constant in the dimensional formula of Planck's constant (h) is :

Similar Questions

NAVNEET PUBLICATION - MAHARASHTRA BOARD-VERY SHORT ANSWER QUESTIONS -GRAVITATION