?What is the best description of the operation of a microbubble air separator?

A. ?It creates areas of reduced pressure using a coalescing media.
B. ?It creates areas of increased pressure using a coalescing media.
C. ?It uses a float-type air vent to allow air to escape naturally.
D. ?It consolidates small bubbles into large ones by narrowing the length of the pipe.


Answer: A

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A system is described by . Classify this system as to homogeneity and additivity.

What will be an ideal response?

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