The velocity v of a particle at time t i...

The velocity v of a particle at time t is given by `v=at+b/(t+c)`, where a, b and c are constants. The dimensions of a, b, c are respectively :-

`LT^(-2), L and T`

`L^(2), T and LT^(2)`

`LT^(2), LT and L`

`L, LT and T^(2)`

Text Solution

Verified by Experts

The correct Answer is:

`v=at + (b)/(t+c)`
Dimensionally
at = `v rArr a[T] = [LT^(-1)]rArr a = [LT^(-2)]`
`c = t rArr c = [M^(0)L^(0) T^(1)]`
`(b)/(t+c) = v rArr (b)/(T) = [LT^(-1)] rArr b= [M^(0)L^(1)T^(0)]`

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The velocity v of a particle at time t is given by v=at+b/(t+c) , where a, b and c are constants. The dimensions of a, b and c are respectively:-

`LT^(–2)`, L and T

`L^(2)` and `LT^(2)`

`LT^(2)`,LT and L

L,LT anf `T^(2)`

The velocity v of a particle at time A is given by v = at+ (b)/(l +c) where a ,b and c are constant The dimensions of a,b and c are respectively

`[LT^(-2)],[L] and [T]`

`[L^(2)],[T] and [LT^(2)]`

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`[L],[LT] and [T^(2)]`

When a wave transverses in a medium, the displacement of a particle located at distance x at time t is given by y=a sin (bt-cx) where a, b and c are constants of the wave. The dimension of b//c are same as that of:

Wave velocity

Wavelength

Wave amplitude

Wave frequency