Solve the problem.Suppose that an insect population density, in thousands, during year n can be modeled by the recursively defined sequence:
.Use technology to graph the sequence for n = 1, 2, 3, . . . , 20 . Describe what happens to the population density function.
A. The insect population stabilizes near 11.65 thousand.
B. The insect population stabilizes near 12.58 thousand.
C. The insect population increases every year.
D. The insect population stabilizes near 8.45 thousand.
Answer: A
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Convert to a logarithmic equation.100.8451 = 7
A. 10 = log 9 0.8451 B. 0.8451 = log 10 7 C. 0.8451 = log 9 10 D. 7 = log 10 0.8451
Solve the problem.If n(A) = 37, n(B) = 52, and n(A ? B) = 70, find n(A ? B).
A. 38 B. 89 C. 19 D. 51
Find a function P(x) of least possible degree, having real coefficients, with the given zeros.4 + , 4 -
, and 3
A. P(x) = x3 - 11x2 + 34x - 30 B. P(x) = x3 + 11x2 + 34x - 30 C. P(x) = x3 - 13x2 + 34x + 32 D. P(x) = x3 - 13x2 + 34x + 30
Fill in the blank with one of the words or phrases listed below.A(n)
is one whose numerator is less than its denominator.
A. mixed number B. composite number C. proper fraction D. improper fraction