Time and Date Stamps (logged): 17:12:20 06-10-2020
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Precalculus II
Precalculus I Test 2
Completely document your work and your reasoning.
You will be graded on your documentation, your reasoning, and the
correctness of your conclusions.
Test should be printed using Internet Explorer. If
printed from different browser check to be sure test items have not been cut off. If
items are cut off then print in Landscape Mode (choose File, Print, click on Properties
and check the box next to Landscape, etc.).
- Write on ONE SIDE of paper only
- If a distance student be sure to email
instructor after taking the test in order to request results.
Name and Signature of Student
_____________________________
Signed by Attendant, with Current Date and Time:
______________________
If picture ID has been matched with student and name as
given above, Attendant please sign here: _________
Instructions:
- Test is to be taken without reference to text or
outside notes.
- Graphing Calculator is allowed, as is blank paper or
testing center paper.
- No time limit but test is to be taken in one
sitting.
- Please place completed test in Dave Smith's folder,
OR mail to Dave Smith, Science and Engineering, Va. Highlands CC, Abingdon, Va.,
24212-0828 OR email copy of document to dsmith@vhcc.edu,
OR fax to 276-739-2590. Test must be returned by individual or agency supervising test. Test is not to be returned to student after it has been taken. Student may, if proctor deems it feasible, make and retain a copy of the test..
Directions for Student:
- Completely document your work.
- Numerical answers should be correct to 3 significant
figures. You may round off given numerical information to a precision consistent
with this standard.
- Undocumented and unjustified answers may be counted
wrong, and in the case of two-choice or limited-choice answers (e.g., true-false or
yes-no) will be counted wrong. Undocumented and unjustified answers, if wrong, never get
partial credit. So show your work and explain your reasoning.
- Due to a scanner malfunction and other errors some
test items may be hard to read, incomplete or even illegible. If this is judged by
the instructor to be the case you will not be penalized for these items, but if you
complete them and if they help your grade they will be counted. Therefore it is to
your advantage to attempt to complete them, if necessary sensibly filling in any
questionable parts.
- Please write on one side of paper only, and staple
test pages together.
Test Problems:
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Problem Number 1
Interest on principle $ 8000 accumulates annually at the rate of 6.7 percent per
year.
- How much money will there be 1, 2, 3 and 10 years after the initial investment?
- What function P(t) gives principle as a function of number t of years?
- What are the growth rate and growth factor of this function?
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Problem Number 2
Linearize the data set consisting of the temperature (Celsius) vs. time (sec)
points ( 8, 3), ( 11, 33.941), ( 14, 3) and ( 17, .725).
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Problem Number 3
Sketch a graph of y = (x - 2) ^ 4 (x – 6) ^ 4 (x^2 + 2.5 x - 2).
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Problem Number 4
The temperature of a hot potato in a room at 15 degrees starts out at 100 degrees and
after 7 minutes has dropped to 60 degrees. What exponential function models this data,
and after how long will the temperature have dropped to 19 degrees?
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Problem Number 5
What are the basic points of the exponential function y = f(x) = 9 * `2^x? Graph the
function using these points.
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Problem Number 6
Sketch a graph of y = (x + 5) ^ 2 (x – 5) ( 4 x^2 + 3.5 x + 5.5).
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Problem Number 7
Solve using ratios instead of functional proportionalities:
- If a small whale 3.7 meters long has a mass of 699.84 kg, then what should be the mass of a
geometrically similar whale 6.1 meters long?
If the first whale is losing thermal energy at the rate of 777.6 watts, then under
identical conditions at what rate would we expect the second whale to be losing energy?
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Problem Number 8
Write a difference
equation for the amount of antibiotic in the body if 13% is removed per hour, and the
initial amount is 900 milligrams. Use this equation to find the number of milligrams after
1, 2, 3 and 4 hours.
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Problem Number 9
What quadratic function describes the behavior of the graph of y = p(x) =
(x- 5)(x- 5)(x+ 3.9) near the point ( 5,0)?
- Compare the values of this function and p(x) at x = 5-1, 5-.5, 5-.1, 5+.1,
5+.5 and 5+1.
- Sketch the quadratic function and p(x) at these values of x.
- How does the quadratic approximation to p(x) deteriorate as x gets further and
further from the zero x = 5?
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Problem Number 10
Sketch every possible shape a graph of a polynomial of degree less than
4 may have, showing all possible types and combinations of zeros.