Answer:
The final temperature at the equilibrium will be 25.73 °C
Step-by-step explanation:
Step 1: Data given
Mass of granite = 10.0 grams
Initial temperature of granite = 77.0 °C
Mass of water = 26.0 grams
Initial temperature of water = 22.0 °C
The specific heat of water = 4.18 J/g°C
The specific heat of granite = 0.790 J/g°C
Step 2: Calculate the final temperature at the equilibrium
Heat lost = Heat gained
Qlost = -Qgained
Qgranite= -Qwater
Q =m* c * ΔT
m(granite) * c(granite) * ΔT(granite) = -m(water) * c(water) * ΔT(water)
⇒with m(granite) = the mass of granite = 10.0 grams
⇒with c(granite) = the specific heat of granite = 0.790 J/g°C
⇒with ΔT(granite) = the change of temperature of granite = T2 - T1 = T2 - 77.0 °C
⇒with m(water) = the mass of water = 26.0 grams
⇒with c(water) = the specific heat of water = 4.18 J/g°C
⇒with ΔT(water) = the change of temperature of water = T2 - T1 = T2 - 22.0 °C
10.0 * 0.790 * (T2 - 77.0) = -26.0 * 4.18 * (T2 - 22.0 )
7.9 * (T2 - 77.0) = -108.68 (T2 - 22.0 )
7.9 T2 - 608.3 = -108.68T2 + 2390.96
116.58T2 = 2999.26
T2 = 25.73 °C
The final temperature at the equilibrium will be 25.73 °C