A higher-order trend surface model can generally better approximate a more complex surface.
Answer the following statement true (T) or false (F)
True
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
For a family from St. Louis, Missouri considering a drive to Las Vegas, Nevada, the Ozark entertainment center of Branson, Missouri presents an intervening opportunity
Indicate whether this statement is true or false.
________ is the change in velocity with respect to time
Fill in the blank(s) with the appropriate word(s).
Maintaining good soil quality involves
A. planting different crops in a field in different years. B. adding new organic matter in the form of manure or by incorporating crop residue into the soil. C. practices that limit compaction of the soil. D. All of these statements are correct.