Use the Second Derivative Test to find the relative extrema, if any, of the function 
a. Rel. max. f(?3) = 22,
rel. min. f(2) = ?73
b. Rel. max. f(?2) = 39,
rel. min. f(3) = ?86
c. Rel. max. f(3) = 86,
rel. min. f(?2) = ?39
d. Rel. max. f(2) = 73,
rel. min. f(?3) = ?22
b. Rel. max. f(?2) = 39,
rel. min. f(3) = ?86
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Simplify.
3 - 
3
A. - 
B. - 
C. 
D. - 7
Solve the problem.The table shows the population of a certain city in various years. The population of the city f(x), in hundreds of thousands, can be modeled by f(x) = axb, where x represents the number of years since 1995. Estimate the population of the city in the year 2021. (You will first need to use regression to estimate the values of a and b).
A. 1,318,550 B. 1,365,641 C. 1,177,277 D. 1,240,963
Graph the function by starting with the graph of the basic function and then using the techniques of shifting, compressing, stretching, and/or reflecting.f(x) = (x + 2)3
A. 
B. 
C. 
D. 
Solve the problem.Suppose a continuous random variable has a joint probability density function given by src="https://sciemce.com/media/4/ppg__hmhbm0603191745__f1q69g6.jpg" style="vertical-align: -23.0px;" />
A. 0.1
B. 0.125
C. 0.4
D. 0.275
Find the probability that a point (x, y) is in the region bounded by 
and 
by evaluating the integral