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Answer :
The final temperature of the glass-water combination is approximately 267.07°C. When two objects with different temperatures come into contact, heat transfer occurs until they reach thermal equilibrium, where they have the same temperature.
In this case, the glass and water will exchange heat until they reach a common final temperature. To determine this temperature, we can use the principle of heat transfer, which states that the heat gained by one object is equal to the heat lost by the other object.
The heat gained by the glass can be calculated using the equation:
[tex]\(Q_{\text{{glass}}} = m_{\text{{glass}}} \cdot c_{\text{{glass}}} \cdot (T_{\text{{final}}} - T_{\text{{glass}}})\)[/tex]
where [tex]\(m_{\text{{glass}}}\)[/tex] is the mass of the glass, [tex]\(c_{\text{{glass}}}\)[/tex] is the specific heat capacity of glass, [tex]\(T_{\text{{final}}}\)[/tex] is the final temperature, and [tex]\(T_{\text{{glass}}}\)[/tex] is the initial temperature of the glass.
Similarly, the heat lost by the water can be calculated using the equation:
[tex]\(Q_{\text{{water}}} = m_{\text{{water}}} \cdot c_{\text{{water}}} \cdot (T_{\text{{final}}} - T_{\text{{water}}})\)[/tex]
where [tex]\(m_{\text{{water}}}\)[/tex] is the mass of the water, [tex]\(c_{\text{{water}}}\)[/tex] is the specific heat capacity of water, and [tex]\(T_{\text{{water}}}\)[/tex] is the initial temperature of the water.
Since the container is insulated, we can assume that no heat is lost to the surroundings, so the heat gained by the glass is equal to the heat lost by the water:
[tex]\(Q_{\text{{glass}}} = Q_{\text{{water}}}\)[/tex]
Substituting the values and rearranging the equation, we can solve for the final temperature, [tex]\(T_{\text{{final}}}\)[/tex], of the glass-water combination.
To learn more about equilibrium refer:
https://brainly.com/question/18849238
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