Mechanical Engineering Principles

(Dana P.) #1
TORQUE 111

Power P= 2 πnT(from above),from which,


torque, T=


P
2 πn

Nm

where power,P = 2 .50 kW=2500 W and speed,
n= 1000 /60 rev/s Thus,


torque, T=


P
2 πn

=

2500

2 π

(
1000
60

)

=

2500 × 60
2 π× 1000

= 23 .87 N m

Problem 6. An electric motor develops a
power of 5 hp and a torque of 12.5 N m.
Determine the speed of rotation of the motor
in rev/min.

Power, P= 2 πnT,from which,


speed n=


P
2 πT

rev/s

where power, P=5hp= 5 × 745. 7


= 3728 .5W

and torqueT= 12 .5Nm.


Hence, speedn=


3728. 5
2 π( 12. 5 )

= 47 .47 rev/s

The speed of rotation of the motor
= 47. 47 × 60 =2848 rev/min.


Problem 7. In a turning-tool test, the
tangential cutting force is 50 N. If the mean
diameter of the work-piece is 40 mm,
calculate (a) the work done per revolution of
the spindle, (b) the power required when the
spindle speed is 300 rev/min.

(a) Work done=Tθ,whereT= Fr


ForceF =50 N, radiusr=

40
2

=20 mm=
0 .02 m and angular displacement,θ=1 rev=
2 πrad.

Hence, work done per revolution of
spindle=Frθ=( 50 )( 0. 02 )( 2 π)= 6 .28 J

(b) Power,P= 2 πnT, where torque,T=Fr=

( 50 )( 0. 02 )=1 N m and speed,n=

300
60

=
5 rev/s.

Hence,power required,P= 2 π( 5 )( 1 )
= 31 .42 W.

Problem 8. A pulley is 600 mm in diameter
and the difference in tensions on the two
sides of the driving belt is 1.5 kN. If the
speed of the pulley is 500 rev/min, determine
(a) the torque developed, and (b) the work
done in 3 minutes.

(a) TorqueT =Fr, where forceF = 1 .5kN=
1500 N, and

radiusr=

600
2

=300 mm= 0 .3m.

Hence,torque developed=( 1500 )( 0. 3 )
=450 N m
(b) Work done=Tθ, where torqueT=450 N m
and angular displacement in 3 minutes
=( 3 × 500 )rev=( 3 × 500 × 2 π)rad.
Hence,work done=( 450 )( 3 × 500 × 2 π)=
4. 24 × 106 J= 4 .24 MJ

Problem 9. A motor connected to a shaft
develops a torque of 5 kN m. Determine the
number of revolutions made by the shaft if
the work done is 9 MJ.

Work done=Tθ, from which, angular displace-
ment,

θ=

work done
torque

Work done=9MJ= 9 × 106 J

and torque=5kNm=5000 N m.

Hence, angular displacement,

θ=

9 × 106
5000

=1800 rad.

2 πrad=1 rev, hence,

the number of revolutions made by the shaft

=

1800
2 π

= 286 .5revs
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