In planetary motion the areal velocity o...

In planetary motion the areal velocity of possition vector of a planet depends of angular velocity `(omega)` and the distance of the planet from sun (r). If so the correct relation for areal velocity is

A

`(dA)/(dt)prop omegar`

B

`(dA)/(dt) prop omega^(2) r`

C

`(dA)/(dt) prop omega r^(2)`

D

`(dA)/(dt) prop sqrt(omega r)`

Text Solution

Verified by Experts

The correct Answer is:

C

`(dA)/(dt)=L/(2m)rArr (dA)/(dt)prop vr prop omegar^(2)`

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Knowledge Check

The escape velocity for a body projected from a planet depends on

A

mass of the body

B

angle of projection

C

mass of the planet

D

radius of the body

In a uniform circular motion , the velocity, position vector and angular velocity are

A

parallel to each other

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mutually prependicular to each other

C

they are co-planer

D

the angle between them is `45^(@)`

Relation between Linear velocity (v) and Angular velocity (omega)

A

`v = r omega`

B

`omega = v omega`

C

`r = v omega`

D

`v = omega/r`

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