A) \[r=2{{r}_{0}};\,\,l=2{{l}_{0}}\]
B) \[r=2{{r}_{0}};\,\,l={{l}_{0}}\]
C) \[r={{r}_{0}};\,\,l={{l}_{0}}\]
D) \[r={{r}_{0}};\,\,l=2{{l}_{0}}\]
Correct Answer: B
Solution :
Heat conduction through a rod is given by \[H=\frac{\Delta Q}{\Delta t}\] \[=KA\left( \frac{{{T}_{1}}-{{T}_{2}}}{l} \right)\] \[\Rightarrow \] \[H\propto \frac{{{r}^{2}}}{l}\] ... (i) [a] When\[r=2{{r}_{0}};\,\,l=2{{l}_{0}}\] \[H\propto \frac{{{(2{{r}_{0}})}^{2}}}{2{{l}_{0}}}\] \[\Rightarrow \] \[H\propto \frac{2{{r}_{0}}^{2}}{{{l}_{0}}}\] [b] When\[r=2{{r}_{0}};\,\,l={{l}_{0}}\] \[H\propto \frac{{{(2{{r}_{0}})}^{2}}}{{{l}_{0}}}\] \[\Rightarrow \] \[H\propto \frac{4{{r}_{0}}^{2}}{{{l}_{0}}}\] [c] When\[r={{r}_{0}};\,\,l={{l}_{0}}\] \[H\propto \frac{{{r}_{0}}^{2}}{{{l}_{0}}}\] [d] When\[r={{r}_{0}};\,\,l=2{{l}_{0}}\] \[H\propto \frac{{{r}_{0}}^{2}}{2{{l}_{0}}}\] It is obvious that heat conduction will be more in case . Note: It is fact that the temperature of whole rod does not become equal when heat is being continuously supplied due to the reason that temperature difference in the rod for the heat flow is same as we require a potential difference across a resistance for the current flow through it.
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