The most common form of reproduction among prokaryotes is (budding/binary/snapping) fission
What will be an ideal response?
binary
Bloom's Taxonomy: Knowledge
Section: Survey of Archaea
Learning Outcome: 11.3
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
The numerical value of the free energy change indicates how fast a reaction will reach equilibrium.
Answer the following statement true (T) or false (F)
The difference between gross primary productivity and net primary productivity is
a. the amount of sunlight reflected by plants. b. the rate of photosynthesis of autotrophs. c. determined by the amount of energy used for plant life processes. d. the rate of herbivorous consumption of autotrophs. e. negligible.
In ________ selection, individuals intermediate in a phenotypic distribution have greater reproductive success.
A. balancing B. negative frequency-dependent C. directional D. stabilizing E. disruptive