Which of the following best matches the description?Region with rooted vegetation in a freshwater ecosystem.

A. biochemical oxygen demand
B. littoral zone
C. savanna
D. pelagic
E. pioneer community
F. benthic
G. desert
H. phytoplankton
I. grassland
J. deciduous forest
K. euphotic
L. boreal forest
M. periphyton
N. tundra
O. marsh


Answer: B

Environmental & Atmospheric Sciences

You might also like to view...

During clear sky conditions, the sky is normally blue in the middle of the day, and some combination of red, yellow and orange at sunrise and sunset. This suggests that

A) the sun is close to perihelion. B) atmospheric path length is related to sky color. C) the date is close to one of the solstices. D) the date is close to one of the equinoxes.

Environmental & Atmospheric Sciences

[NeedAttention]

src="data:image/png;base64,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

Environmental & Atmospheric Sciences

Why is cleavage always associated with flattening strain (oblate strain ellipsoids)?

What will be an ideal response?

Environmental & Atmospheric Sciences

The tropopause is the boundary between ________

the troposphere and the stratosphere tropical and polar air masses the troposphere and mesosphere two layers of high ozone concentration

Environmental & Atmospheric Sciences