The focus of this worksheet is further practice of the review skills from Sections 3.1-5.5. If you have not already completed those problem sets in MyLab, you may find the content of those sections useful here.
Your regular problem sets in MyMathLab require only a correct answer to assess your mastery of the skill. However, proper and complete communication of your mathematical techniques and practices are also important skills. One of the goals of the worksheet exercises is to compel you to practice those written communication skills. So, unless otherwise stated, in order to receive full credit, you must not only determine the correct answer, you must clearly present correct relevant work leading to that correct answer.
A correct answer with insufficient or incorrect work may receive little or no credit. However, partial credit can be earned even if the correct answer is not found, as long as the information that you have communicated is clear, correct, and relevant.
You are welcome to discuss these problems with fellow classmates or tutors, but you must complete your own write-up of the solutions. Identical solutions appearing on separate papers may lose credit and may be considered a violation of the Honor Code.
Once you have completed your solutions, you must convert your document to a PDF and submit to Canvas.
Formats other than PDF and submissions made anywhere other than Canvas will not be accepted for grading.
1. (8 points) Suppose q is the rational function defined by q(x) = 5×2 + 19x − 4
x2 + 7x + 12 .
(a) Determine the domain of q(x) and write the answer in interval notation.
(b) Find the vertical asymptote(s), if any, of the graph of q(x).
CU Boulder MATH 1011 – College Algebra 2
2. (8 points) Given that f (x) = 3×2 + 5x − 2, evaluate each of the following. Expand and simplify your answer as much as possible and show all steps leading to your final answer.
(a) f (−2)
(b) f (a + 1)
(c) f (x + h) − f (x)
h
3. (6 points) Suppose the point (−1, 5) is on the graph of a function f (x).
(a) If f is even, then what other point must also lie on the graph of f (x)? Explain.
(b) If f is odd, then what other point must also lie on the graph of f (x)? Explain.
CU Boulder MATH 1011 – College Algebra 3
4. (8 points) Let f (x) =
x if − 4 ≤ x < −1
−3 if − 1 ≤ x < 1
√x if x ≥ 1
(a) What is the domain of f (x)? Write your answer in interval notation.
(b) Determine the y-intercept of the function, if any. Make sure to justify your answer.
(c) Determine the x-intercept(s) of the function, if any. Make sure to justify your answer.
CU Boulder MATH 1011 – College Algebra 4
5. (10 points) Let
f (x) = (x − 1)2, g(x) = 1
x , h(x) = 1 − x
1 + x .
Find the expression defining each function below. Additionally, find the domain
of the function.
(a)
( f
g
)
(x)
(b) (h ◦ g)(x)
CU Boulder MATH 1011 – College Algebra 5
6. (10 points) Consider the parabola with equation f (x) = ax2 + bx + c shown in the graph here.
(a) What are the coordinates of the vertex of this
parabola?
(b) Does the parabola open upwards or down-wards? What does this imply about the equa- tion defining the parabola?
(c) What is the y-intercept of the graph of the parabola?
(d) Determine the equation of the parabola. Write your final answer in the form f (x) = ax2 + bx + c.
CU Boulder MATH 1011 – College Algebra 6
7. (25 points) Solve each equation. For irrational solutions, round to 4 decimal places. In order to receive full credit, you must show complete work arriving at your answer. Simply using some kind of “solver” application and writing the answer down will receive no credit. However, it certainly makes sense to use such technology to check your answers for accuracy.
(a) 220e0.037x = 440
(b) 5x = 86−x
CU Boulder MATH 1011 – College Algebra 7
(c) ex2
· e2x+1 = 95
(d) log6(x2 − 15) = log6(2x)
(e) ln(x) + ln(x + 8) = 3
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