Final answer:
The initial temperature of the copper is 22.6554°C.
Step-by-step explanation:
To find the initial temperature of the copper, we can use the formula for heat transfer: q = mcΔT, where q is the heat transferred, m is the mass of the substance, c is the specific heat capacity, and ΔT is the change in temperature.
First, let's find the heat transferred from the copper to the water:
The heat transferred from the copper to the water is equal to the heat gained by the water: qcopper = qwater.
- Using the formula q = mcΔT, we can calculate the heat gained by the water: qwater = mcΔT.
- Substituting the given values, we have: qcopper = (108.7g)(0.380J/g・°C)(Ti - 22.2°C).
We can assume that the heat transferred is conserved, so qcopper = qwater.
By equating the two expressions for the heat transferred, we can solve for the initial temperature of the copper, Ti:
(108.7g)(0.380J/g・°C)(Ti - 22.2°C) = (400.0g)(4.18J/g・°C)(22.2°C - 20.7°C).
Simplifying and solving for Ti, we get:
Ti - 22.2°C = (400.0g)(4.18J/g・°C)(22.2°C - 20.7°C) / (108.7g)(0.380J/g・°C)
Ti - 22.2°C = 0.4554°C
Ti = 22.2°C + 0.4554°C
Ti = 22.6554°C