Which of the following solutions is the most acidic?

Describe the orientation of the slopes with snow on them on the topographic map and the NAIP photo. Is there more snow on north- facing slopes or on south-facing slopes? Which slope receives more direct sunlight? How would this affect the amount of glaciation that would occur on each slope? On which slope would you expect to find more glaciers in the Southern Hemisphere, northfacing or south-facing slopes? Briefly describe the relationship between slope orientation, snow accumulation, glacier formation, and glacial abrasion.

South of Goethe Lake find Mount Goethe on Figure 25.3 (topographic map) and Figure 25.4 (NAIP photo). What will be an ideal response?

Describe nonfoliated metamorphic rocks. What is their appearance? Describe the two types of

nonfoliated metamorphic rocks What will be an ideal response?

The south polar ice sheet can be as much as:

a. 1,000 meters thick. b. 2,000 meters thick. c. 3,000 meters thick. d. 4,000 meters thick.

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