The root mean square velocity of molecules of gas is:
- A
Proportional to square root of temperature ().
- B
Inversely proportional to square root of temperature ().
- C
Proportional to square root of temperature ().
- D
Proportional to temperature ().
The root mean square velocity of molecules of gas is:
Proportional to square root of temperature ().
Inversely proportional to square root of temperature ().
Proportional to square root of temperature ().
Proportional to temperature ().
Correct answer:B
Standard Method
Given: The question asks how root mean square velocity depends on temperature.
Find: The correct proportionality of with .
The solution states that the root mean square velocity is given by
where is the universal gas constant, is temperature in Kelvin, and is molar mass.
From this formula,
Therefore, the root mean square velocity is proportional to the square root of temperature.
The solution concludes with "The Correct Option is B", but the worked relation matches option C in the listed options. Hence there is a discrepancy between the option label shown in the solution and the actual statement proved by the working. The defensible correct choice from the given options is C.
Discrepancy Note
The answer key says (3) and the solution working gives , both of which correspond to option C. However, the solution says "The Correct Option is B". Since the working is the primary source and clearly supports , the conceptually correct answer is option C.
A common mistake is confusing with . This is wrong because the formula has temperature inside a square root. Use and read the proportionality carefully.
Another mistake is choosing the inverse square root dependence . This is incorrect because increasing temperature increases molecular speed, not decreases it. Check the direct dependence of inside the square root.
Get unlimited AI-adaptive practice, mastery tracking, and an AI tutor that explains every step — free to start.