1. Find difference quotient of below functions. (a) π¦ = 2π₯3 β 3 (b) π¦ = π₯ β 9 c) π¦ = βπ₯2 β π₯ + 1 2. Given π = [(π£+2)3β8] π£ (π£ β 0), find a. lim π£β0 π b. lim π£β2 π
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Problem set 2
Due date: February 29th Thursday 14:00 (before the class)
You can write your answers by hand or in a word (or Latex) file. You can submit your
assignment in person (written or printed), before the beginning of class on Thursday. Or, you
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calculation.
1. Find difference quotient of below functions.
(a) π¦ = 2π₯3 − 3 (b) π¦ = π₯ − 9 c) π¦ = −π₯2 − π₯ + 1
2. Given π = [(π£+2)3−8]
π£ (π£ ≠ 0), find
a. lim π£→0
π b. lim π£→2
π
3. Check the statements below by each and verify whether they are TRUE or FALSE, and
shortly explain why.
a. When a function π¦ = π(π₯) has the same left-side and right-side limit at π₯ = π, this
function has a limit value at π₯ = π
b. π¦ = |π₯ − 3| has a right-side limit value at π₯ = 3
c. π¦ = |π₯ − 3| has a limit value at π₯ = 3
d. If π¦ = π(π₯) is continuous everywhere, then it is differentiable at any value of π₯.
e. If π¦ = π(π₯) is differentiable everywhere, then it is continuous at any value of π₯.
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4. Solve the following inequalities
a. |π₯ + 1| < 6 b. |4 − 3π₯| < 2
5. Find the limits of the function π = 7 − 9π£ + π£2
a. As π£ → 0 b. As π£ → 3 c. As π£ → −1
6. For a function π¦ = π(π₯) = 3π₯2
(π₯+1) , its derivative is π′(π₯) =
3π₯2+6π₯
(π₯+1)2 . Prove this result.
(You can utilize proof in the textbook and chapter 7 slide)
7. Find π′(1) and π′(2) from the following functions
a. π¦ = π(π₯) = ππ₯3 b. π(π₯) = −5π₯−2 c. π(π₯) = 3
4 π₯
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3 d. π(π€) = −3π€− 1
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8. For a cost function π3 − 3π2 + 10, check the statements below by each and verify
whether they are TRUE or FALSE, and shortly explain why
a. Marginal cost function is ππΆ
ππ = 3π2 − 6π
b. AC is decreasing when 0 < π < 1
c. When π = 5, average cost 10
d. When π = 10, average cost is greater than marginal cost
e. When π = 8, the slope of average cost curve is positive
9. Given the average cost function π΄πΆ = π2 − 4π + 174, find 1) total cost and 2) marginal
cost functions.
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10. Differentiate the following by using the product rule
a. (9π₯2 − 2)(3π₯ + 1) b. (π₯2 + 3)π₯−1 c. (ππ₯ − π)(ππ₯2)
11. Find the derivatives of
a. 6π₯
π₯+5 b.
ππ₯2+π
ππ₯+π
12. Find an inverse of π¦ = √π₯ + 1 (π₯ ≥ 0). And check the domain of the inverse function.
13. Check the statements below by each and verify whether they are TRUE or FALSE, and
shortly explain why.
(a) π₯2 + 2π₯ + 1 has an inverse function when its domain is π₯ ≥ 1
(b) π¦ = −π₯4 + 5 is strictly monotonic when its domain is π₯ > 0
(c) Given π¦ = π(π₯) = π₯3 + 2, ππ₯
ππ¦ =
1
−3π₯2
(d) If π¦ = π(π₯) is a strictly increasing function, then π−1(π₯) is strictly decreasing function
(e) If π¦ = π(π₯) is not a strictly increasing function, then it is a strictly decreasing function
14. Use the chain rule to find ππ¦
ππ₯ for the following
a. π¦ = (3π₯2 − 13)3 b. π¦ = (7π₯3 − 5)9
15. Find ππ¦
ππ₯1 and
ππ¦
ππ₯2 for each of the following functions
a. π¦ = 2π₯1 3 − 11π₯1
2π₯2 + 3π₯2 2 b. π¦ = 7π₯1 + 6π₯1π₯2
2 − 9π₯2 3 c. π¦ =
5π₯1+3
π₯2−2
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16. Find the differential ππ¦, for given functions
a. π¦ = −π₯(π₯2 + 3) b. π¦ = π₯
π₯2+1
17. Find the total differential for each of following functions
a. π = 7π₯2π¦3 b. π = 9π¦3
π₯−π¦ c. π = −5π₯3 − 12π₯π¦ − 6π¦5
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