Apologies for posting this yesterday to another blog. 
1. Page 37, #17a,b,c. [Hint: "increasing at a constant rate" means the same thing as "increasing linearly."]
2. Page 82. Look at the data in question 17. Recall that when data changes by about the same percentage difference across equal intervals, an exponential model may be a good choice. If the 1st differences are close to each other, a quadratic model may be a good choice. If the 2nd differences are close to each other, a quadratic model may be a good choice.
a) Find the percent differences for this data:
From age 40 to age 45, the death rate increased by what percentage?
From age 45 to age 50, the death rate increased by what percentage?
From age 50 to age 55, the death rate increased by what percentage?
From age 55 to age 60, the death rate increased by what percentage?
From age 60 to age 65, the death rate increased by what percentage?
b) Find the 2nd differences for this data (remember, the 2nd differences are the 1st differences of the 1st differences. There will only be four 2nd differences for the 6 numbers here.
c) Find the 1st difference for this data.
d) Rank the three possible models (exponential, quadratic, and linear) from best choice to worst choice based on your calculations.
e) [more challenging] Using a calculator if you need, but without Excel and without calculating the actual model, estimate the death rate at age 70 assuming an exponential model. Do this again, assuming a quadratic model.
3. Page 126: Consider the graph in exercise 30. Write T for temperature and E for emergence, so the function graphed is E(T). Label points on the graph as follows:
a) Label as P the inflection point between temperature 15 and temperature 25.
b) Label at Q the point where E”(T) appears to have the smallest value (most negative).
c) At P, is E(T) positive, negative, or zero?
d) At P, is E'(T) positive, negative, or zero?
e) At what point is E'(T) the largest (the most positive)?
f) Estimate the slope of the graph when T = 20.
The following questions cover topics we spent relatively little time on in class. On Friday’s exam, you will have a choice among these problems, so if you know one of the topics better than the others, you can choose it
4. Page 275, #7 and #15
5. Page 253, #23a,b.
6. Let H(t) represent housing prices t months into this year (1 = January 2008; 2 – February), Earlier this year, housing prices were falling at a steady rate. Can you say whether H'(1) is positive, negative, or zero ( t = 1 means’ January.
Later, from March until June, prices were not only falling from month to month, they were falling faster and faster each month. Can you say whether H”(4) is positive, negative, or zero?
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