0.379 J · g⁻¹ · °C⁻¹.
Energy change Q = c · m · ΔT.
Temperature change ΔT = Final Temperature - Initial Temperature.
The final temperature of both brass and water is 32.0 °C. However, the two differ in initial temperature.
Initial temperature
How much energy did water gain in this process?
[tex]Q = c\cdotm \cdot m\cdot \Delta T = 4.18 \times 335 \times 7.0 = 9.80\times 10^{3}\;\text{J}[/tex].
How much energy did brass lose in this process?
The brass cylinder is cooled in a calorimeter. The calorimeter traps heat inside, such that water absorbs all the heat lost from the brass.
[tex]Q(\text{Brass}) = Q(\text{Water})=9.80\times 10^{3}\;\text{J}[/tex].
What's the heat capacity of brass?
[tex]Q = c\cdot m\cdot \Delta T[/tex],
[tex]c = \dfrac{Q}{m\cdot\Delta T} =\dfrac{9.80\times 10^{3}}{410\times 63}=0.379\;\text{J}\cdot\text{g}^{-1}\cdot\textdegree{}\text{C}^{-1}[/tex].
