The potential energy of a particle varies with distance x from a fixed origin as V=( (A√x/x+B) ); where A and B are constants. The dimensions of A B are:

Question

The potential energy of a particle varies with distance x from a fixed origin as V=( (A√x/x+B) ); where A and B are constants. The dimensions of A B are: (A)  [ML5/2T-2]  (B)  [ML2T-2]  (C)  [M3/2L3/2T-2]  (D)  [ML7/2T-2]

Tardigrade Admin · Accepted Answer

Given, v=(A√x/x+B) ?(i) Dimensions of v= dimensions of potentialenergy =[ML2T-2] From Eq. (i), Dimensions ofB= dimensions of x=[M0LTo] ∴ Dimensions of A =( textdimensions textof v× textdimensitons textof (x+B)/ textdimensions textof √x) =([ML2T-2][M0LT0]/[M0L1/2T0]) =[ML5/2T-2] Hence, dimensions ofAB =[ML5/2T-2][M0LT0] =[ML7/2T-2]

Q. The potential energy of a particle varies with distance x from a fixed origin as $V = (\frac{A x}{x + B});$ where A and B are constants. The dimensions of A B are:

$[M L^{5/2} T^{- 2}]$

$[M L^{2} T^{- 2}]$

$[M^{3/2} L^{3/2} T^{- 2}]$

$[M L^{7/2} T^{- 2}]$

Q. The potential energy of a particle varies with distance x from a fixed origin as V=(x+BAx​​); where A and B are constants. The dimensions of A B are:

[ML5/2T−2]

[ML2T−2]

[M3/2L3/2T−2]

[ML7/2T−2]

Q. The potential energy of a particle varies with distance x from a fixed origin as $V = (\frac{A x}{x + B});$ where A and B are constants. The dimensions of A B are:

$[M L^{5/2} T^{- 2}]$

$[M L^{2} T^{- 2}]$

$[M^{3/2} L^{3/2} T^{- 2}]$

$[M L^{7/2} T^{- 2}]$