Answer:
To triple the volume of an ideal gas in value, keeping the temperature constant, the pressure must be reduced by a factor of 3 to maintain the inverse proportionality and the value of k (which is a constant and must not vary).
Step-by-step explanation:
The correct question is with options, as follow:
"Which of the following will cause the volume of an ideal gas to triple in value?
A) Raising the temperature from 25°C to 75°C at constant pressure.
B) Lowering the absolute temperature by a factor of 3 at constant pressure.
C) Raising the absolute temperature by a factor of 3 while increasing the pressure by a factor of 3.
D) Lowering the absolute temperature by a factor of 3 while increasing the pressure by a factor of 3.
E) Lowering the pressure by a factor of 3 while the temperature stays constant."
Pressure and volume are related by Boyle's law, which says:
"The volume occupied by a given gas mass at constant temperature is inversely proportional to the pressure"
Boyle's law is expressed mathematically as:
Pressure * Volume = constant
o P * V = k
In this law, two variables are then related: pressure and volume, so it is assumed that the temperature of the gas and the number of molecules in the gas are constant.
To triple the volume of an ideal gas in value, keeping the temperature constant, the pressure must be reduced by a factor of 3 to maintain the inverse proportionality and the value of k (which is a constant and must not vary). So, is option E.