Concept explainers
For each of the following sets of volume/temperature data, calculate the missing quantity. Assume that the pressure and the mass of gas remain constant.
Interpretation:
Final temperature of gas should be determined.
Concept Introduction:
Charles’s law: It is also known as temperature volume relationship. It states that volume of given mass of gas is directly proportional to its temperature.
Answer to Problem 32QAP
Final temperature of gas is
Explanation of Solution
Relation between volume and temperature is given by Charles’s law.
Charles’s law states that volume of given mass of gas is directly proportional to its temperature. As temperature increases volume also increases.
Mathematical expression is:
Initial volume of gas (
Initial temperature of gas
Final Volume of gas (
Substituting the values in Charles’s equation,
Converting to degree Celsius:
Interpretation:
Final temperature of gas should be determined.
Concept Introduction:
Charles’s law : It is also known as temperature volume relationship. It states that volume of given mass of gas is directly proportional to its temperature.
Answer to Problem 32QAP
Final temperature of gas is
Explanation of Solution
Relation between volume and temperature is given by Charles’s law.
Charles’s law states that volume of given mass of gas is directly proportional to its temperature. As temperature increases volume also increases.
Mathematical expression is:
Initial volume of gas (
Initial temperature of gas
Final volume of gas
Substituting the values in Charles’s equation,
Or
(Converting Kelvin to Celsius:
Interpretation:
Final volume of gas should be determined.
Concept Introduction:
Charles’s law: It is also known as temperature volume relationship. It states that volume of given mass of gas is directly proportional to its temperature.
Answer to Problem 32QAP
Final volume of gas is
Explanation of Solution
Relation between volume and temperature is given by Charles’s law.
Charles’s law states that volume of given mass of gas is directly proportional to its temperature. As temperature increases volume also increases.
Mathematical expression is:
Initial volume of gas (
Initial temperature of gas
Final temperature of gas
Substituting the values in Charles’s equation,
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Chapter 13 Solutions
Introductory Chemistry: A Foundation
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