Answer: The final temperature of both the weight and the water at thermal equilibrium is [tex]50.26^{o}C[/tex].
Explanation:
The given data is as follows.
mass = 7.62 g, [tex]T_{2} = 10.8^{o}C[/tex]
Let us assume that T be the final temperature. Therefore, heat lost by water is calculated as follows.
q = [tex]mC \times \Delta T[/tex]
= [tex]7.62 g \times 4.184 J/^{o}C \times (52.3 - T)[/tex]
Now, heat gained by lead will be calculated as follows.
q = [tex]mC \times \text{Temperature change of lead}[/tex]
= [tex]2.04 \times 0.128 \times (T - 11.0)[/tex]
According to the given situation,
Heat lost = Heat gained
[tex]7.62 g \times 4.184 J/^{o}C \times (52.3 - T)[/tex] = [tex]2.04 \times 0.128 \times (T - 11.0)[/tex]
T = [tex]50.26^{o}C[/tex]
Thus, we can conclude that the final temperature of both the weight and the water at thermal equilibrium is [tex]50.26^{o}C[/tex].
