Pre-Calculus Final ExamName _________________________ Score.docxChantellPantoja184
Pre-Calculus Final Exam
Name: _________________________
Score: ______ / ______
Multiple Choice: Type your answer choice in the blank next to each question number.
_____1.
Find the indicated sum.
A. 2
B. 54
C. 46
D. -54
_____2.
Graph the ellipse and locate the foci.
A.
foci at (0, 6) and (0, -6)
C.
foci at (, 0) and (-, 0)
B.
foci at ( 5, 0) and (-5, 0)
D.
foci at (0, 5) and (0, -5)
_____3.
Solve the system by the substitution method.
2y - x = 5
x2 + y2 - 25 = 0
A.
B.
C. {( 5, 0), ( -5, 0), ( 3, 4)}
D. {( -5, 0), ( 3, 4)}
_____4.
Graph the function. Then use your graph to find the indicated limit.
f(x) = 5x - 3, f(x)
A. 5
B. 25
C. 2
D. 22
_____5.
Use Gaussian elimination to find the complete solution to the system of equations, or state that none exists.
4x - y + 3z = 12
x + 4y + 6z = -32
5x + 3y + 9z = 20
A. {(8, -7, -2)}
B. {(-8, -7, 9)}
C. ∅
D. {(2, -7, -1)}
_____6.
Solve the system of equations using matrices. Use Gaussian elimination with back-substitution.
x + y + z = -5
x - y + 3z = -1
4x + y + z = -2
A. {( 1, -4, -2)}
B. {( -2, 1, -4)}
C. {( 1, -2, -4)}
D. {( -2, -4, 1)}
_____7.
A woman works out by running and swimming. When she runs, she burns 7 calories per minute. When she swims, she burns 8 calories per minute. She wants to burn at least 336 calories in her workout. Graph an inequality that describes the situation. Let x represent the number of minutes running and y the number of minutes swimming. Because x and y must be positive, limit the graph to quadrant I only.
A.
C.
B.
D.
Short Answer Questions: Type your answer below each question. Show your work.
8
A statement Sn about the positive integers is given. Write statements S1, S2, and S3, and show that each of these statements is true.
Sn: 12 + 42 + 72 + . . . + (3n - 2)2 =
9
A statement Sn about the positive integers is given. Write statements Sk and Sk+1, simplifying Sk+1 completely.
Sn: 1 ∙ 2 + 2 ∙ 3 + 3 ∙ 4 + . . . + n(n + 1) = [n(n + 1)(n + 2)]/3
10
Joely's Tea Shop, a store that specializes in tea blends, has available 45 pounds of A grade tea and 70 pounds of B grade tea. These will be blended into 1 pound packages as follows: A breakfast blend that contains one third of a pound of A grade tea and two thirds of a pound of B grade tea and an afternoon tea that contains one half pound of A grade tea and one half pound of B grade tea. If Joely makes a profit of $1.50 on each pound of the breakfast blend and $2.00 profit on each pound of the afternoon blend, how many pounds of each blend should she make to maximize profits? What is the maximum profit?
11
Your computer supply store sells two types of laser printers. The first type, A, has a cost of $86 and you make a $45 profit on each one. The second type, B, has a cost of $130 and you make a $35 profit on each one. You expect to .
Pre-Calculus Final ExamName _________________________ Score.docxChantellPantoja184
Pre-Calculus Final Exam
Name: _________________________
Score: ______ / ______
Multiple Choice: Type your answer choice in the blank next to each question number.
_____1.
Find the indicated sum.
A. 2
B. 54
C. 46
D. -54
_____2.
Graph the ellipse and locate the foci.
A.
foci at (0, 6) and (0, -6)
C.
foci at (, 0) and (-, 0)
B.
foci at ( 5, 0) and (-5, 0)
D.
foci at (0, 5) and (0, -5)
_____3.
Solve the system by the substitution method.
2y - x = 5
x2 + y2 - 25 = 0
A.
B.
C. {( 5, 0), ( -5, 0), ( 3, 4)}
D. {( -5, 0), ( 3, 4)}
_____4.
Graph the function. Then use your graph to find the indicated limit.
f(x) = 5x - 3, f(x)
A. 5
B. 25
C. 2
D. 22
_____5.
Use Gaussian elimination to find the complete solution to the system of equations, or state that none exists.
4x - y + 3z = 12
x + 4y + 6z = -32
5x + 3y + 9z = 20
A. {(8, -7, -2)}
B. {(-8, -7, 9)}
C. ∅
D. {(2, -7, -1)}
_____6.
Solve the system of equations using matrices. Use Gaussian elimination with back-substitution.
x + y + z = -5
x - y + 3z = -1
4x + y + z = -2
A. {( 1, -4, -2)}
B. {( -2, 1, -4)}
C. {( 1, -2, -4)}
D. {( -2, -4, 1)}
_____7.
A woman works out by running and swimming. When she runs, she burns 7 calories per minute. When she swims, she burns 8 calories per minute. She wants to burn at least 336 calories in her workout. Graph an inequality that describes the situation. Let x represent the number of minutes running and y the number of minutes swimming. Because x and y must be positive, limit the graph to quadrant I only.
A.
C.
B.
D.
Short Answer Questions: Type your answer below each question. Show your work.
8
A statement Sn about the positive integers is given. Write statements S1, S2, and S3, and show that each of these statements is true.
Sn: 12 + 42 + 72 + . . . + (3n - 2)2 =
9
A statement Sn about the positive integers is given. Write statements Sk and Sk+1, simplifying Sk+1 completely.
Sn: 1 ∙ 2 + 2 ∙ 3 + 3 ∙ 4 + . . . + n(n + 1) = [n(n + 1)(n + 2)]/3
10
Joely's Tea Shop, a store that specializes in tea blends, has available 45 pounds of A grade tea and 70 pounds of B grade tea. These will be blended into 1 pound packages as follows: A breakfast blend that contains one third of a pound of A grade tea and two thirds of a pound of B grade tea and an afternoon tea that contains one half pound of A grade tea and one half pound of B grade tea. If Joely makes a profit of $1.50 on each pound of the breakfast blend and $2.00 profit on each pound of the afternoon blend, how many pounds of each blend should she make to maximize profits? What is the maximum profit?
11
Your computer supply store sells two types of laser printers. The first type, A, has a cost of $86 and you make a $45 profit on each one. The second type, B, has a cost of $130 and you make a $35 profit on each one. You expect to .
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Instructions for Submissions thorugh G- Classroom.pptx
Presentation1.pptx
1. A. Translate each verbal phrase into an algebraic expression
1. 10 added to twice a number
2. A number x decreased by
3. Twice a number z divided by 4
B. Formulas are equations that state relationships between
quantities. These formulas can be translated into verbal
sentences.
1. 𝑃 = 2𝑙 + 2𝑤
2. 𝑑 = 𝑟𝑡
2. A B
1. A number x subtracted from
5
a.
𝑛
6
2. Twice the product of 4 and y b. 5x
3. A number n divided by 6 c. 5 – x
4. Five times the number x d. x – 5
5. A number x increased by 7 e. 2(4y)
Activity: Let us try this out
A. Match the verbal phrase in column A with the corresponding
algebraic expression in column B. Write only the letter only.
3. B. Translate each formula into a verbal statement.
1. P=4s
2. A=𝑠4
3. A=
1
2
𝑏ℎ
4. Read the situation below and answer the questions that
follow.
Suppose you are tasked to organize a pool party for your bestfriend’s
birthday. Your other friends suggested that it has to be held in the
lone inland resort in the city. You decided not to book the event in
advance and planned to just come to the resort early to arrange for
the pool party on that same day. However, when you came to the
resort, you had been informed that the pool was drained and is
scheduled to be refilled within the day. One pipe can fill the empty
pool in 12 hours and another can fill the empty pool in 18 hours.
Suppose both pipes are opened at 8:00A.M. and you have scheduled
the pool party for your bestfriend’s birthday at 2:00 P.M. on the same
day.
5. Questions:
1. Will the pool be filled by 2:00 P.M.? Elaborate your answer.
2. At what exact time will the pool be completely filled?
3. Would the situation be different if you have booked for the event
ahead of time?
4. What do you think should be the best decision to make?
A. Cancel the event.
B. Move the schedule at a later time within the day.
C. Move the schedule at an earlier time within the day. 7
D. Wait for the pool to be completely filled before inviting your friends
to come over.
6. The following steps in solving problems involving rational
algebraic expression:
Step 1. Read and understand the problem. Identify what is the given and
what is being unknown. Choose a variable to represent the unknown
number.
Step 2. Express the other unknowns, if there are any, in terms of the variable
chosen in step 1.
Step 3. Write an equation to represent the relationship among the given and
the unknown/s.
Step 4. Solve the equation for the unknown and use the solution to find the
quantities being asked.
Step 5. Check.
8. Activity: What is my Age? (Age Problem)
Problem:
One-half of Alvin’s age two years from now plus one-third of
his age three years ago is twenty years. How old is he now?
Solution:
Step 1: Let x = Alvin’s age now
Step 2: Create an expression using the problem: One-half of
Alvin’s age two years from now plus one-third of his age three
years ago is twenty years.
9. (1.) ________ → Alvin’s age two years from now 13
(2.) ________ → Alvin’s age three years ago
(3.) ________ → One-half of age 2 years from now
(4.) ________ → One-third of age 3 years ago
Step 3: Write out the equation:
(5.) _____________ Equation based on the problem
Step 4: Solution:
1
2
𝑥 + 1 +
1
3
𝑥 − 1 = 20 Distributive Property
(6.) _____________ Combine like terms and simplify
6
1
2
𝑥 +
1
3
𝑥 = 20 6 Multiply both sides by the LCM
(7.) _____________ Distributive Property
3x + 2x = 120 Simplify
(8.) _____________ Combine similar terms
5𝑥
5
=
120
5
Divide both sides by 5
(9.) _____________ Final Answer
x = 2 5x = 120
6
2
𝑥 +
6
3
= 120
1
2
(𝑥 + 2)
1
2
𝑥 +
1
3
𝑥 = 120
1
3
(𝑥 − 3)
1
2
𝑥 + 2 +
1
3
𝑥 − 3 = 20
x – 3 x + 2
10. Fill in the blanks with the correct word to make the statement
true.
To solve word problems on rational algebraic expressions, we will
know how to write equations.
There are steps to follow in writing the equation and finding the
solution.
A. Read and understand the (1) ______. Identify what is the given and what is
being unknown. Choose a (2) ______ to represent the unknown number.
B. Express the other unknowns, if there are any, in terms of the variable chosen
in step 1.
C. Write an (3) _______ to represent the relationship among the given and the
unknown/s.
11. Ingredients:
•1/2 tsp baking powder
•2/3 cup brown sugar
•1/4 cup Cocoa powder
•2 1/3 cups Flour
•1/4 tsp nutmeg
•1/2 tsp salt
•2 cups semi-sweet chocolate chips
•3/4 cup butter
•10 1/2 oz condensed milk, sweetened
In your TLE class, you are asked by your teacher to cook a recipe with
the following ingredients:
If the same number is added
to both numerator and
denominator of the amount of
cocoa powder used in the
recipe, the result is the
amount of butter to be used.
Find the number.
12. In the problem presented in the What’s New section of this module, one pipe
could fill the pool in 12 hours while the other pipe could fill the same pool in 18
hours. You were asked to find how long would it take to completely fill the pool if
both pipes were used. Explain why each of the following approaches is
INCORRECT.
1. The time it would take to fill the pool is the sum of the lengths of time it takes
each pipe to fill the pool:
12 ℎ𝑜𝑢𝑟𝑠 + 18 ℎ𝑜𝑢𝑟𝑠 = 30 ℎ𝑜𝑢𝑟𝑠
2. The time it would take to fill the pool is the difference in the lengths of time it
takes each pipe to fill the pool:
18 ℎ𝑜𝑢𝑟𝑠 − 12 ℎ𝑜𝑢𝑟𝑠 = 6 ℎ𝑜𝑢𝑟𝑠
3. The time it would take to fill the pool is the average of the lengths of time it
takes each pipe to fill the pool:
12 ℎ𝑜𝑢𝑟𝑠 + 18 ℎ𝑜𝑢𝑟𝑠 2 = 30 ℎ𝑜𝑢𝑟𝑠 2 = 15 ℎ𝑜𝑢𝑟𝑠