Answer:
The temperature of the cup of of coffee is reduced by 1 °C
Explanation:
The cup of coffee (system 1) and silver spoon (system 2) can be considered an isolated system for this problem, so the exchange of heat to the outside is zero:
Q₁ + Q₂ = 0 = m₁c₁ΔT₁ + m₂c₂ΔT₂
m₁c₁(Tfinal - Tinitial₁) + m₂c₂(Tfinal - Tinitial₂) = 0
The equation is rearranged to solve for Tfinal, which will be the same for both systems:
m₁c₁(Tfinal) - m₁c₁(Tinitial₁) + m₂c₂(Tfinal) - m₂c₂(Tinitial₂) = 0
m₁c₁(Tfinal) + m₂c₂(Tfinal) = m₁c₁(Tinitial₁) + m₂c₂(Tinitial₂)
Substituting in some values at this point gives:
(180g)(4.190Jg⁻¹K⁻¹)(Tfinal) + (45g)(0.25Jg⁻¹K⁻¹)(Tfinal) = (180g)(4.190Jg⁻¹K⁻¹)(95 + 273.15 K) + (45g)(0.25Jg⁻¹K⁻¹)(25 + 273.15 K)
(754.2JK⁻¹)(Tfinal) + (11.25JK⁻¹)(Tfinal) = 277658.73J + 3354.1875J
(765.45JK⁻¹)(Tfinal) = 281012.9175J
Tfinal = 367.12K = (367.12 - 273.15)C = 94C
The temperature of the cup of coffee was reduced by 1 degree Celsius
