This exam was adminstered in August 2024 .
August 2024 Algebra 2, Part II
Each correct answer is worth up to 2 credits. Partial credit can be given. Work must be shown or explained.
25. On the axes below, graph y = 3.2(1.8)2 .
Answer:
Put the equation in your graphing calculator and check the Table of Values.
Points on the graph include: (0,3.2), (1,5.76), (2,10.368), (3,18.6624), (-1, 1.78), (-2,.99), (-3,.55), (-4,.3), (-5,.16). Approxminate these points.
26. Is x + 3 a factor of 7x3 + 27x2 + 9x - 27?
Justify your answer.
Answer:
You can show if it is a factor or not by doing doing polynomial division. However, an easier method is this: if (x + 3) is a factor, then the polynomial will equal zero when x = -3.
7(-3)3 + 27(-3)2 + 9(-3) - 27 = 0, so (x + 3) is a factor of the polynomial.
27. Over the set of integers, factor the expression 2x4 - 10x3 + 3x2 - 15x completely.
Answer:
Factor completely means that there will be multiple steps. Over the set of integers means that you don't have to worry about imaginary numbers.
2x4 - 10x3 + 3x2 - 15x
x(2x3 - 10x2 + 3x - 15)
x(2x2(x - 5) + 3(x - 5))
x(2x2 + 3)(x - 5)
28. The monthly unemployment rate of towns in the United States is approximately normally distributed with a mean rate of 5.2% and a standard deviation of 1.6%. Determine the percentage of towns, to the nearest integer, that have a monthly unemployment rate greater than 6%.
Answer:
Use the "normalcdf" function on your graphing calculator.
Use the command normalcdf(6,100,5.2,1.6) to find the percentage between 6% and 100% ("greater than 6%), mean 5.2%, standard deviation 1.6%.
The result should be .3085, which is .31, or 31%.
29. The function d(t) = 2cos(π/6 t) + 5 models the water depth, in feet, at a location in a bay, t hours since the last high tide. Determine the minimum water depth of the location, in feet, and justify your answer.
Answer:
The midline is 5 feet (from the +5). The amplitude is 2 feet (from 2cos). This means that the water depth varies between 3 feet and 7 feet.
Therefore, the minimum water depth is 3 feet.
Remember to justify it. This is easy enough to do in your head. Do NOT just write 3 feet, or 5 - 2 = 3. Indicate where the 5 and 2 came from and what they stand for.
30. A brewed cup of coffee contains 130 mg of caffeine. The half-life of caffeine in the bloodstream is 5.5 hours. Write a function, C(t) to represent the amount of caffeine in the bloodstream t hours after drinking one cup of coffee
Answer:
The function is expoonential, with 130 as the initial amount and 1/2 as the rate (half-life). It takes 5.5 hours for 1/2 to leave the bloodstream, but t is measured in hours, so we need to divide t by 5.5.
C(t) = 130(1/2)t/5.5
31. Markus is a long-distance walker. In one race, he walked 55 miles in t hours and in another race
walked 65 miles in t + 3 hours. His rates are shown in the equations below.
Markus walked at an equivalent rate, r, for each race. Determine the number of hours that each of
the two races took.
Answer:
Write a proportion and solve it.
55/t = 65/(t + 3)
65t = 55(t + 3)
65t = 55t + 165
10t = 165
t = 16.5
The first race took 16.5 hours, and the second race took 19.5 hours.
32. Solve the equation x2 + 3x + 11 = 0 algebraically. Express the answer in a + bi form.
Answer:
Use the Quadratic Formula to solve this.
x = (-b + √(b2 - 4ac) / (2a)
x = (-3 + √((3)2 - 4(1)(11)) / (2(1))
x = (-3 + √(9 - 44)) / (2)
x = (-3 + √(-35)) / (2)
x = -3/2 + √(35)/2 i
Note that you MUST separate the expression into two fraction because the question states a + bi form.
End of Part II
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