A) the curve for \[{{V}_{1}}\]has greater slope than that for \[{{V}_{2}}\]
B) the curve for \[{{V}_{2}}\]has greater slope than that for \[{{V}_{1}}\]
C) both curves have same slope
D) the curves intersect at some point other than T = 0
Correct Answer: A
Solution :
As \[{{\theta }_{1}}>{{\theta }_{2}}\Rightarrow \tan {{\theta }_{1}}>\tan {{\theta }_{2}}\] \[{{\left( \frac{T}{p} \right)}_{1}}>{{\left( \frac{T}{p} \right)}_{2}}\] Also from \[pV=\mu RT,\frac{T}{p}\propto V\Rightarrow {{V}_{1}}>{{V}_{2}}\] So, the curve for \[{{V}_{1}}\]has greater slope the than that for \[{{V}_{2}}.\]You need to login to perform this action.
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