1 Answer

Guruprasad J Rao · Answer 1 · 2020-08-25T22:01:17+0000

Answer:

Is required a 0.8 inches diameter steel shaft.

Step-by-step explanation:

With the power P and the rotating speed n (RPM), we can find the torque applied:

T = P/N

Before calculating the torque, we convert the power and rotating speed units:

$P = 14\ HP * 550\ ((lb.ft)/(s))/(HP) *(12\ in)/(ft) = 92400\ (lb.in)/(s)$

$n=2400\ RPM .(2\pi/60(rad)/(s))/(RPM)= 251(rad)/(s)$

Replacing the values, the torque obtained is:

$T = (92400\ lb.in/s)/(251\ rad/s) = 368\ \ lb.in$

Then the maximum shearing stress will be located at the edge of the shat at the Maximus radius:

$Smax =\ (T.R)/(J)$

Here J is the moment of inertia and R a radius. For a solid shaft, it is calculated by:

$J =(\pi.D^4)/(32)$

Where D is shaft's diameter. Replacing the expression of J in

$Smax =(T.R)/((\pi.D^4)/(32))$

As the radius is half of the diameter:

$Smax =(T.D)/((2*\pi.D^4)/(32\\) ) = (16T)/(\pi.D^3)$

For the maximum stress of 3.5 ksi (3500 psi = 3500\ lb/in^2) and the calculated torque:

$Smax = (16.368\ lb.in)/(3500\ lb/in^2*\pi.D^3)$

Solving for D:

$D =\sqrt[3]{16.368\ lb.in / (3500\pi\ lb/in^2)}} = 0.8\ in$

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