Question

Consider the efficiency of Carnot's engine is given by \(η=\frac {αβ}{sinθ}log_e\frac {βx}{kT}\), where \(α\) and \(β\) are constants. If \(T\) is temperature, \(k\) is Boltzman constant, \(θ\) is angular displacement and \(x\) has the dimensions of length. Then, choose the incorrect option.

• A. Dimensions of \(β\) is same as that of force.
• B. Dimension of \(α^{-1}x\) is same as that of energy.
• C. Dimension of \(η^{-1} sinθ\) is same as that of \(αβ\).
• D. Dimensions of \(α\) is same as that of \(β\)

Answer 1

The Correct Option is D

Here , \(βx\) will be having the units of energy. 

So \(β\) will have same dimensions of force.

\(αβ=η=sin θ\) =Dimentionless \(η^{-1}sinθ =αβ\) =D.L.

So \(α^{-1}\) will have the dimensions of force. 

So \(α^{-1}x\) will have the dimensions of energy.