The germ layers are formed in which stage?

The six carbons of the glucose molecule that enter the cell respiration pathway end up in/as ________ by the end of the process.

Fill in the blank(s) with the appropriate word(s).

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

Discuss the function of hair cells as sensory receptors, and identify two different locations and/or organs that utilize

these receptors What will be an ideal response?

As discussed in the previous question, much effort has been devoted to classification of natural communities, and this effort continues today. Which American ecologist would have found the "pigeonholing" of natural communities into discrete classes most satisfying from a philosophical perspective?

A) R. H. Whittaker B) H. A. Gleason C) F. E. Clements D) J. Braun-Blanquet