- #1
CognitiveNet
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I want to calculate the force generated (as a result of expanding air) from pressure created by heating air up to a maximum temperature of 800 degrees Celsius.
My flywheel with a radius of 0,030m is rotating at a speed of 850RPM and weights 0,27Kg.
Angular velocity: w=850RPM*(2pi/60)=89rad/s
Moment of inertia of the flywheel: I=0,5*m*r^2=0,5*0,27*0,030^2=0,0001215 kgm^2
Kinetic energy: Ek=0,5*I*w^2=0,5*0,0001215*89^2=0,48N
Now I use Thermodynamics to calculate the supplied heat.
The room temperature is 20 degrees Celsius and the piston is 0,020m in diameter.
Area of piston: pi/4 *d^2=pi/4 *0,020^2=pi*10^-4
Force acting on piston due to the pressure inside the cylinder: F=P*A
I'm assuming this force is equal to the kinetic energy stored in the flywheel.
Thus P=F/A=0,47N/pi*10^-4=1527Pa
P1*V1/T1=P2*V2/T2
(Excluding the volumes because I just care about the initial kinetic force)
Pa = Normal atmospheric pressure at 20 degrees Celsius (or 293 Kelvin)
Thus T2=P2*T1/P1=1527Pa*293K/101300Pa=4K IMPOSSIBURU!
But the supplied heat is at least 800 degrees Celsius.
Assuming all of the heat is transferred into the air inside the cylinder, that's equal to 1073K.
Please tell me what's going on here. I have the feeling that I don't know how to calculate how much force the air is acting on the piston, as a result of an increase of pressure due to the increase of temperature.
My flywheel with a radius of 0,030m is rotating at a speed of 850RPM and weights 0,27Kg.
Angular velocity: w=850RPM*(2pi/60)=89rad/s
Moment of inertia of the flywheel: I=0,5*m*r^2=0,5*0,27*0,030^2=0,0001215 kgm^2
Kinetic energy: Ek=0,5*I*w^2=0,5*0,0001215*89^2=0,48N
Now I use Thermodynamics to calculate the supplied heat.
The room temperature is 20 degrees Celsius and the piston is 0,020m in diameter.
Area of piston: pi/4 *d^2=pi/4 *0,020^2=pi*10^-4
Force acting on piston due to the pressure inside the cylinder: F=P*A
I'm assuming this force is equal to the kinetic energy stored in the flywheel.
Thus P=F/A=0,47N/pi*10^-4=1527Pa
P1*V1/T1=P2*V2/T2
(Excluding the volumes because I just care about the initial kinetic force)
Pa = Normal atmospheric pressure at 20 degrees Celsius (or 293 Kelvin)
Thus T2=P2*T1/P1=1527Pa*293K/101300Pa=4K IMPOSSIBURU!
But the supplied heat is at least 800 degrees Celsius.
Assuming all of the heat is transferred into the air inside the cylinder, that's equal to 1073K.
Please tell me what's going on here. I have the feeling that I don't know how to calculate how much force the air is acting on the piston, as a result of an increase of pressure due to the increase of temperature.