The graph in Figure 9-2 represents the:a.
electromagnetic spectrum.
b. action spectrum of photosynthesis.
c. absorption spectra for chlorophylls a and b.
d. process of cyclic electron transport.
e. process of noncyclic electron transport.
Question 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 alt= />"
Quick Reply
