Answer:
the angle of twist of B with respect to D is -1.15°
the angle of twist of C with respect to D is 1.15°
Explanation:
The missing diagram that is supposed to be added to this image is attached in the file below.
From the given information:
The shaft is made of A992 steel. It has a diameter of 1 in and is supported by bearing at A and D.
For the Modulus of Rigidity G = 11 × 10³ Ksi = 11 × 10⁶ lb/in²
The objective are :
1) To determine the angle of twist of B with respect to D
Considering the Polar moment of Inertia at the shaft [tex]J\tau[/tex]
shaft [tex]J\tau[/tex] = [tex]\dfrac{\pi}{2}r^4[/tex]
where ;
r = 1 in /2
r = 0.5 in
shaft [tex]J \tau[/tex] = [tex]\dfrac{\pi}{2} \times 0.5^4[/tex]
shaft [tex]J\tau[/tex] = 0.098218
Now; the angle of twist at B with respect to D is calculated by using the expression
[tex]\phi_{B/D} = \sum \dfrac{TL}{JG}[/tex]
[tex]\phi_{B/D} = \dfrac{T_{CD}L_{CD}}{JG}+\dfrac{T_{BC}L_{BC}}{JG}[/tex]
where;
[tex]T_{CD} \ \ and \ \ L_{CD}[/tex] are the torques at segments CD and length at segments CD
[tex]{T_{BC} \ \ and \ \ L_{BC}}[/tex] are the torques at segments BC and length at segments BC
Also ; from the diagram; the following values where obtained:
[tex]L_{BC}}[/tex] = 2.5 in
[tex]J\tau[/tex] = 0.098218
G = 11 × 10⁶ lb/in²
[tex]T_{BC[/tex] = -60 lb.ft
[tex]T_{CD[/tex] = 0 lb.ft
[tex]L_{CD[/tex] = 5.5 in
[tex]\phi_{B/D} = 0+ \dfrac{[(-60 \times 12 )] (2.5 \times 12 )}{ (0.9818)(11 \times 10^6)}[/tex]
[tex]\phi_{B/D} = \dfrac{[(-720 )] (30 )}{1079980}[/tex]
[tex]\phi_{B/D} = \dfrac{-21600}{1079980}[/tex]
[tex]\phi_{B/D} =[/tex] − 0.02 rad
To degree; we have
[tex]\phi_{B/D} = -0.02 \times \dfrac{180}{\pi}[/tex]
[tex]\mathbf{\phi_{B/D} = -1.15^0}[/tex]
Since we have a negative sign; that typically illustrates that the angle of twist is in an anti- clockwise direction
Thus; the angle of twist of B with respect to D is 1.15°
(2) Determine the angle of twist of C with respect to D.Answer unit: degree or radians, two decimal places
For the angle of twist of C with respect to D; we have:
[tex]\phi_{C/D} = \dfrac{T_{CD}L_{CD}}{JG}+\dfrac{T_{BC}L_{BC}}{JG}[/tex]
[tex]\phi_{C/D} = 0+\dfrac{T_{BC}L_{BC}}{JG}[/tex]
[tex]\phi_{B/D} = 0+ \dfrac{[(60 \times 12 )] (2.5 \times 12 )}{ (0.9818)(11 \times 10^6)}[/tex]
[tex]\phi_{C/D} = \dfrac{21600}{1079980}[/tex]
[tex]\phi_{C/D} =[/tex] 0.02 rad
To degree; we have
[tex]\phi_{C/D} = 0.02 \times \dfrac{180}{\pi}[/tex]
[tex]\mathbf{\phi_{C/D} = 1.15^0}[/tex]
