This sounds like a flywheel energy problem, not a tidal energy problem.
The kinetic energy of each blade is
(1/2) I w^2 . The moment of inertia of each blade (assuming that it is attached at the axis of rotation) is
I = (1/3) ML^2
L is the length of the blade (15 m)and M is the mass (volume x density)
Set the total rotational energy equal to 10^6 J and solve for the angular velocity w. Remember that there are two blades.
Tidal Energy.
If we model 2 blades as thin uniform steel bars 15.0m long and .25m in diameter, at what rate (radians/second and revolutions per minute) must they spin for a turbine to store 10^6 J of energy? Keep in mind that the density of steel is 7800kg/m^3 and density is equal to mass/volume).
7 answers
How do I determine the volume of the blade so I can find the mass? I'm not quite sure what shape the figure actually is...
Very good question. Since they specify the diameter of the "bars", which I will call D, the blades are cylinders and the volume of each is
(1/4) pi D^2 * L
(1/4) pi D^2 * L
M=7800*[(1/4)*PI*(.25)^2*15]
KE=(1/2[(1/3)M(15)2]w^2=10^6
KE=2.15... x2 (for the two blades)
KE=4.31
would that be in radians or revolutions?
KE=(1/2[(1/3)M(15)2]w^2=10^6
KE=2.15... x2 (for the two blades)
KE=4.31
would that be in radians or revolutions?
Your KE calculation would be in Joules, but you forgot the w^2 in the formula.
You are supposed to be solving for w, which would be in radians per second
You are supposed to be solving for w, which would be in radians per second
I can't seem to find where I've gone wrong...
Volume=(1/4)PI(.25)^2*15=.736...
Mass= V*7800= 5743.2...
I=(1/3)M*15^2=430741.8...
10^6=(1/2)Iw^2
w=sqrt(4.64...)
w=2.15...
w*2[for the 2 blades]=4.309...
I tried the above value and was incorrect.
Volume=(1/4)PI(.25)^2*15=.736...
Mass= V*7800= 5743.2...
I=(1/3)M*15^2=430741.8...
10^6=(1/2)Iw^2
w=sqrt(4.64...)
w=2.15...
w*2[for the 2 blades]=4.309...
I tried the above value and was incorrect.
I can't seem to find where I've gone wrong...
Volume=(1/4)PI(.25)^2*15=.736...
Mass= V*7800= 5743.2...
I=(1/3)M*15^2=430741.8...
10^6=(1/2)Iw^2
w=sqrt(4.64...)
w=2.15...
w*2[for the 2 blades]=4.309...
I tried the above value and was incorrect.
Volume=(1/4)PI(.25)^2*15=.736...
Mass= V*7800= 5743.2...
I=(1/3)M*15^2=430741.8...
10^6=(1/2)Iw^2
w=sqrt(4.64...)
w=2.15...
w*2[for the 2 blades]=4.309...
I tried the above value and was incorrect.