Which of the following is true of shaded-pole motors?
a. They are small, inexpensive, and powerful.
b. They have a low starting torque, a low efficiency, and a high noise level.
c. They have a lower line current, are higher efficiency, and are very quiet.
d. They have a larger current, a lower total impedance, and a higher reactance.
[Ques. 2] The stationary magnet of a DC motor is represented by the _____.
a. armature
b. field poles
c. commutator
d. rotor
[Ques. 3] Which of the following motors is the best installation choice for an application requiring adjustable speeds?
a. DC
b. Split-phase
c. Synchronous
d. Capacitor-start
[Ques. 4] 
[Ques. 5] uONN4aHhyGXyFNwZmbmuqdTUO4F5m
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 alt= />
Letter E is pointing to a(n) _____.
a. soleplate
b. optional header design
c. partition wall assembly
d. sole plate"
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