Dear mathhelp participants,
The ideal gas law states that
PV = nRT,
where P is pressure (in atmospheres), V is volume (in liters), n is the number of moles of gas atoms (a mole contains 6.02 x 1023 atoms), R is the gas constant (0.08206 L atm mol–1 K–1). Suppose 5 moles of helium is contained in a cylinder whose volume is decreasing at the rate of 2 L/sec, while the pressure is increasing at the rate of ½ atmosphere per second. How fast is the temperature changing when the pressure is 4 atm, the volume is 100 liters, and the temperature is 300K?
All I know is that n is constant
I got 102.36 as my answer
Thanks in advance
The ideal gas law states that
PV = nRT,
where P is pressure (in atmospheres), V is volume (in liters), n is the number of moles of gas atoms (a mole contains 6.02 x 1023 atoms), R is the gas constant (0.08206 L atm mol–1 K–1). Suppose 5 moles of helium is contained in a cylinder whose volume is decreasing at the rate of 2 L/sec, while the pressure is increasing at the rate of ½ atmosphere per second. How fast is the temperature changing when the pressure is 4 atm, the volume is 100 liters, and the temperature is 300K?
All I know is that n is constant
I got 102.36 as my answer
Thanks in advance