Question

A Carnot engine with efficiency $50 \%$ takes heat from a source at $600 \,K$ In order to increase the efficiency to $70 \%$, keeping the temperature of sink same, the new temperature of the source will be :

• A. $900 K$
• B. $300 K$
• C. $1000 K$
• D. $360 K$

Answer 1

The Correct Option is C

1. Efficiency of a Carnot engine: \[ \eta = 1 - \frac{T_{\text{sink}}}{T_{\text{source}}}. \] 
2. For 50\% efficiency: \[ 0.5 = 1 - \frac{T_{\text{sink}}}{600}. \] 
\[ T_{\text{sink}} = 300 \, \text{K}. \] 
3. For 70\% efficiency: \[ 0.7 = 1 - \frac{300}{T_{\text{source}}}. \] 
\[ \frac{300}{T_{\text{source}}} = 0.3. \] 
\[ T_{\text{source}} = \frac{300}{0.3} = 1000 \, \text{K}. \] 
Thus, the new temperature of the source is 1000 K. The efficiency of a Carnot engine depends on the temperatures of the heat source and sink. Increasing efficiency requires increasing the temperature of the source while keeping the sink temperature constant.