How often should a low efficiency panel filter be changed?
What will be an ideal response?
Monthly
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Diving ducks must perform a "takeoff run" along the surface of the water to get airborne
a. True b. False Indicate whether the statement is true or false
If a transmission jumps out of one gear this is the likely cause:
a. loose countershaft bearings b. low oil level c. defective synchronizer or detent mechanism d. input shaft is bent
Which of the following would result when a diesel fuel is cooled to its cloud point?
A. it will not ignite B. forms wax crystals that can plug filters C. converts into a wax constituency D. it vaporizes
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