[NeedAttention]
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
Answer: A
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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?
The periods between glaciations are separated by warmer ____ stages
a. endothermic b. intercyclic c. interglacial d. thermostatic e. intermontaine
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
Which is not a common particle size for most marine sediments?
A) Clay B) Silt C) Sand D) Pebbles