[NeedAttention]

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


Answer: A

Environmental & Atmospheric Sciences

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The periods between glaciations are separated by warmer ____ stages

a. endothermic b. intercyclic c. interglacial d. thermostatic e. intermontaine

Environmental & Atmospheric Sciences

This figure depicts the growth of cloud droplets by [INSERT FIGURE 7-2. NO CAPTION]

A) collision-coalescence B) condensation C) the Bergeron process D) entrainment

Environmental & Atmospheric Sciences

Use the two maps in Figure 4.5 to plot a great circle route between San Francisco (west coast of the United States, where you can see small details of San Francisco Bay) and London (southern England at the 0° prime meridian). The straight line on the gnomonic projection will show the shortest route between the two cities. Transfer the coordinates of this route over to the Mercator map and connect with a line plot to show the route’s track. Note the route arching over southern Greenland on the Mercator.

What will be an ideal response?

Environmental & Atmospheric Sciences

Which is not a common particle size for most marine sediments?

A) Clay B) Silt C) Sand D) Pebbles

Environmental & Atmospheric Sciences