The pressure P and volume V of a gas are related by the equation p^5v^7=c where c is a constant. At a certain instant of time, the pressure is 100 lb/ft^2, the volume is 4ft^3 and the pressure is decelerating at a rate of 5 lb/ft^2/sec. Find the rate of change at which the volume is changing.
The pressure P and volume V of a gas are related by the equation p^5v^7=c where c is a constant. At a certain instant of time, the pressure is 100 lb/ft^2, the volume is 4ft^3 and the pressure is dece...
When air expands adiabatically (without gaining or losing heat), its pressure P and volume V are related by the equation PV 1.4 = C, where is a constant. Suppose that at a certain instant the volume is 500 cm and the pressure is 80 kPa and is decreasing at a rate of 10 kPa/min. At what rate is the volume increasing at this instant? (Round your answer to the nearest whole number.) cm/min When air expands adiabatically (without gaining or...
The pressure P and volume V of a certain amount of steam in an adiabatic process (a process in which the heat in the system does not change due to proper insulation) fairly follows the equation PVY K where y and K are constants. In an adiabatic experiment, the volume of a certain amount of steam confined in a tank is gradually increased, resulting in a decrease in gas pressure. Using the above equation and linear regression, find the values...
deal gases obey the equation PV nRT, where P is the pressure of the gas, V is its volume, n is the number of moles of gas, T is its temperature, and the constant R-8.314 KPa-liters-mol-1 kelvin-1 (a) Find the exac t change in volume of O, gas as the pressure increases from 12.00 to 12.01 KPa, the temperature decreases from 300.0 to 299.9 degrees kelvin, and the number of moles of 0, gas changes from 1.03 to 1.01 moles....
Boyle's law states that when a sample of gas is compressed at a constant temperature, the pressure P and volume V satisfy the equation PV=C, where C is a constant. Suppose that at a certain instant the volume is 200 cm^3, the pressure is 80kPa and the pressure is increasing at a rate of 30 kPa/min. At what rate is the volume decreasing at this instant? My No Ask Your Teacher 16. -10.12 points Scale TR 30.017 ML tai v...
Problem 7. (1 point) When air expands adiabatically (without gaining or losing heat), its pressure P and volume V are related by the equation PV 14 = C where C is a constant. Suppose that at a certain instant the volume is 340 cm, and the pressure is 97 kPa (kPa = kiloPascals) and is decreasing at a rate of 15 kPa/minute. At what rate is the volume increasing at this instant? The volume is increasing at cm/min Problem 5....
2. Derive an expression for (as) for a gas with the equation of state: P(V-nB) = nRT, where B is a constant. 2. Derive an expression for (as) for a gas with the equation of state: P(V-nB) = nRT, where B is a constant.
The ideal gas law (PV=nRT) describes the relationship among pressure P, volume V, temperature T, and molar amount n. Fix n and V When n and V are fixed, the equation can be rearranged to take the following form where k is a constant: PT=nRV=k or (PT)initial=(PT)final This demonstrates that for a container of gas held at constant volume, the pressure and temperature are directly proportional.The relationship is also called Gay-Lussac's law after the French chemist Joseph-Louis Gay-Lussac, one of...
The van der Waals equation gives a relationship between the pressure p (atm), volume V(L), and temperature T(K) for a real gas: .2 where n is the number of moles, R 0.08206(L atm)(mol K) is the gas con- stant, and a (L- atm/mol-) and b (L/mol) are material constants. Determine the volume of 1.5 mol of nitrogen (a .39 L2 atm/mol2. b = 0.03913 L/mol) at temperature of 350 K and pressure of 70 atm. The van der Waals equation...
A monatomic ideal gas has C p = 5R/2. In a constant pressure process at p = 2.00x105 Pa, the volume of 0.500 moles of the gas is increased from 3.00x10-3 m3 to 9.00x10-3 m3 . For this process, the change in the internal energy of the gas is
(25 pts) We have a tank of volume V which contains an ideal gas at constant temperature T and initial pressure Po. There is a small hole in the tank and gas leaks out at a velocity of (RT)5, We can use a molar density 1. Recall that mols in tanke ρν and molar rate out-pud where u-velocity and A - area of hole. Derive the differential equation for P vs t (hint it's a simple exponential) a. drop in...