DIRECTION: Read the passage given below and answer the questions that follows: |
A brass ball of mass 100g is heated to \[100{}^\circ C\] and then dropped into 200g of turpentine in a calorimeter at \[15{}^\circ C\] The final temperature is found to be \[(\rho )\]. Take specific heat of brass as \[T=k\sqrt{\rho {{r}^{3}}/S}\] and water equivalent of calorimeter as 4g. |
A) 810 cal
B) 610 cal
C) 710 cal
D) 510 cal
Correct Answer: C
Solution :
Let c be the specific heat of turpentine |
Mass of the solid, M = 100g |
Mass of turpentine m = 200g |
Water equivalent of calorimeter, W= 4g |
Initial temperature of calorimeter, \[{{T}_{1}}\] = \[15{}^\circ C\] |
Temperature of ball, \[{{T}_{1}}\] = \[100{}^\circ C\] |
Final temperature of the liquid, T= \[23{}^\circ C\] |
Specific heat of solid, \[{{c}_{2}}=0.092\,cal/{{g}^{{}^\circ }}C\] |
Heat gained by turpentine and calorimeter is |
\[mc\left( T-{{T}_{1}} \right)+W\left( T-{{T}_{1}} \right)=200c\left( 23-15 \right)+4\left( 23-15 \right)\]\[=\left( 200c+4 \right)8\] |
Heat lost by the ball is |
\[M{{c}_{2}}\left( {{T}_{2}}-T \right)=100\left( 0.092 \right)\left( 100-23 \right)\] |
\[=708.4\,cal.\] |
According to the principle of calorimetry |
Heat gained = Heat lost |
\[\therefore \]\[\left( 200c+4 \right)8=708.4\] |
\[1600c+32=708.4\] |
or \[c=\frac{708.4-32}{1600}=0.42\,cal/{{g}^{{}^\circ }}C\] |
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