- #1
Ipodbob
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Hello all this is my first post so i hope i can give you the relevant data in the correct format, also thank you for any assistance :)
I am to find the OD of a hollow shaft when the shafts ID is 0.75 of the OD dimension, the shaft transmits 3MW at 200Rpm. The Shear stress max is 55 MN/m2 and the modulus of rigidity is 80 GN/m2. The OD can be no larger than 270mm / 0.27m.
Power = 2.Pi.N.T/60 n = 200rpm
Torque = (p.60)/(2.Pi.N)
Torque applied = 143.2 KNm
J (second moment of area) = Pi(D4-d4)/32
I now know i can use Ta/J = τ/r and transpose that,
Ta/J = 2τ/OD
Subbing J so i can then transpose the equation to find the D(OD), by changing out the d(ID) and r for OD parameters.
Ta/[Pi/32(D4-(0.75.D)4)] = 2τ/D
I need to transpose this equation for D (the outer diameter) but I'm stuck, i hope this makes sense. The problem is i have calculated all the the answer assuming the max size of 0.27 which is strong enough to transmit the torque but i realize now i need to find the outer diameter with the figures i have given above.
Regards
I am to find the OD of a hollow shaft when the shafts ID is 0.75 of the OD dimension, the shaft transmits 3MW at 200Rpm. The Shear stress max is 55 MN/m2 and the modulus of rigidity is 80 GN/m2. The OD can be no larger than 270mm / 0.27m.
Power = 2.Pi.N.T/60 n = 200rpm
Torque = (p.60)/(2.Pi.N)
Torque applied = 143.2 KNm
J (second moment of area) = Pi(D4-d4)/32
I now know i can use Ta/J = τ/r and transpose that,
Ta/J = 2τ/OD
Subbing J so i can then transpose the equation to find the D(OD), by changing out the d(ID) and r for OD parameters.
Ta/[Pi/32(D4-(0.75.D)4)] = 2τ/D
I need to transpose this equation for D (the outer diameter) but I'm stuck, i hope this makes sense. The problem is i have calculated all the the answer assuming the max size of 0.27 which is strong enough to transmit the torque but i realize now i need to find the outer diameter with the figures i have given above.
Regards
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