Answer:
(a) 3347 J; (b) 3043 J; (c) 58 J/K; (d) 35.5 °C
Explanation:
(a) Heat lost by copper
The formula for the heat lost or gained by a substance is
q =mCΔT
ΔT = T₂ - T₁= 30.3 °C - 100.4 °C = -70.1 °C = -70.1 K
q = 124.0 g × 0.385 J·K⁻¹g⁻¹ × (-70.1 K) = -3347 J
The negative sign shows that heat is lost.
The copper block has lost 3347 J.
(b) Heat gained by water
ΔT = 30.3 °C - 25.1 °C = 5.2 °C = 5.2 K
q = 140.0 g × 4.18 J·K⁻¹g⁻¹ × 5.2 K = 3043 J
The water has gained 3043 J.
(c) Heat capacity of calorimeter
Heat lost by Cu = heat gained by water + heat gained by calorimeter
The temperature change for the calorimeter is the same as that for the water.
ΔT = 5.2 K
[tex]\begin{array}{rcl}\text{3347 J} & = & \text{3043 J} + C \times \text{5.2 K}\\\text{304 J} & = & 5.2C \text{ K}\\C & = & \dfrac{\text{304 J}}{\text{5.2 K}}\\\\& = & \text{58 J/K}\\\end{array}[/tex]
The heat capacity of the calorimeter is 58 J/K.
(d) Final temperature of water
[tex]\begin{array}{rcl}\text{Heat lost by copper } + \text{Heat gained by water}& = &0 \\\text{Heat lost by copper}& = &-\text{Heat gained by water} \\m_{\text{Cu}}C_{\text{Cu}}\Delta T_{\text{Cu}}& = & -m_{\text{w}}C_{\text{w}}\Delta T_{\text{w}}\\\end{array}\\[/tex]
[tex]\begin{array}{rcl}\text{124.0 g} \times \text{0.385 J$\cdot$K$^{-1}$g$^{-1}$}\times \Delta T_{\text{Cu}}& = & -\text{140.0 g} \times 4.18 \text{ J$\cdot$ K$^{-1}$g$^{-1}$}\times \Delta T_{\text{w}}\\\text{47.7 J$\cdot$K$^{-1}$}\times \Delta T_{\text{Cu}}& = &-\text{585 J$\cdot$ K$^{-1}$g}\times \Delta T_{\text{w}}\\\Delta T_{\text{Cu}} & = & -12.26\Delta T_{\text{w}}\\\end{array}[/tex]
[tex]\begin{array}{rcl}\Delta T_{\text{f}} - 100.4 \, ^{\circ}\text{C} & = & -12.26(\Delta T_{\text{f}} - 30.3\, ^{\circ}\text{C})\\\Delta T_{\text{f}} - 100.4 \, ^{\circ}\text{C} & = & -12.26\Delta T_{\text{f}} + 371\, ^{\circ}\text{C}\\13.26\Delta T_{\text{f}} & = & 471\, ^{\circ}\text{C}\\\Delta T_{\text{f}} & = & 35.5\, ^{\circ}\text{C}\\\end{array}[/tex]
The final temperature of the water would be 35.5 °C.
