Question 1

Solve the system of equations by substitution.
$\begin{array} { r } 2 x + 9 y = - 8 \\x + \frac { 1 } { 3 } y = \frac { 13 } { 3 }\end{array}$

A)(-5, 2)
B)( -5, -2)
C)(5, 2)
D)(5, -2)

Accepted Answer

D

Question 2

Use Cramer's rule to solve the linear system.&#10;x + y = -7 x - y = 16&#10;A)(4.5, 11.5)&#10;B)(4.5, -11.5)&#10;C)(7, -11.5)&#10;D)(7, 4.5)

Accepted Answer

B

Question 3

Determine whether the given ordered pair is a solution of the system.&#10;(-6, -4) 4x + y = -28 2x + 4y = -28&#10;A)not a solution&#10;B)solution

Accepted Answer

B

Question 4

Determine whether the given ordered pair is a solution of the system.&#10;(2, -5) 4x - y = 3 3x - 4y = -14&#10;A)not a solution&#10;B)solution

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Question 5

Use Cramer's rule to solve the linear system.
$\begin{array} { l } \frac { 1 } { 2 } x + \frac { 2 } { 3 } y = 32 \\\frac { 1 } { 4 } x - \frac { 5 } { 9 } y = 40\end{array}$

A)(100, 27)
B)(-100, -27)
C)(100, -27)
D)(-100, 27)

Accepted Answer

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Question 6

Use Cramer's rule to solve the linear system.
$\begin{array} { l } \frac { 1 } { 2 } x + \frac { 2 } { 3 } y = 32 \\\frac { 1 } { 4 } x - \frac { 5 } { 9 } y = 40\end{array}$

A)(100, 27)
B)(-100, -27)
C)(100, -27)
D)(-100, 27)

Accepted Answer

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Question 7

Use Cramer's rule to solve the linear system.&#10;x + 7y = -2 3x + y = 34&#10;A)(7, 12)&#10;B)(3, 7)&#10;C)(-2, 3)&#10;D)(12, -2)

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Question 8

Use Cramer's rule to solve the linear system.&#10;3x + y = 13 2x - 7y = 24&#10;A)(5, 2)&#10;B)(-5, -2)&#10;C)(-5, 2)&#10;D)(5, -2)

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Question 9

Use Cramer's rule to solve the linear system.&#10;9x + y = 0 -9x + y = -18&#10;A)(-1, 9)&#10;B)(1, -9)&#10;C)(-1, -9)&#10;D)(1, 18)

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Question 10

Solve the system of equations by substitution.&#10;7x + 64y = 64 4x - 8y = -8&#10;A)(1, 1)&#10;B)(1, 0)&#10;C)(0, 0)&#10;D)(0, 1)

Accepted Answer

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Question 11

Use Cramer's rule to solve the linear system.&#10;(4, 2) 2x + y = 6 3x + 2y = 8&#10;A)not a solution&#10;B)solution

Accepted Answer

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Question 12

Use Cramer's rule to solve the linear system.&#10;x + 3y = 3 2x - 5y = -5&#10;A)(0, 0)&#10;B)(0, 1)&#10;C)(1, 1)&#10;D)(1, 0)

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Question 13

Solve the system of equations by substitution.&#10;x + y = -6 x - y = 16&#10;A)(5, 11)&#10;B)(6, 5)&#10;C)(6, -11)&#10;D)(5, -11)

Accepted Answer

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Question 14

Use Cramer's rule to solve the linear system.&#10;x + y = 0 2x + 3y = -7&#10;A)(6, -6)&#10;B)(-7, 7)&#10;C)(-6, 6)&#10;D)(7, -7)

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Question 15

Solve the system of equations by substitution.&#10;3x + 6y = 39 3x + 2y = 47&#10;A)(-17, 6)&#10;B)(-2, 17)&#10;C)( -17, 3)&#10;D)(17, -2)

Accepted Answer

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Question 16

Solve the system of equations by substitution.&#10;6x + 3y = 51 2x - 6y = 38&#10;A)(10, -3)&#10;B)(-3, 10)&#10;C)(3, -10)&#10;D)(-10, 3)

Accepted Answer

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Question 17

Use Cramer's rule to solve the linear system.&#10;3x + 2y = -4 5x = -20&#10;A)(4, -4)&#10;B)(-4, -4)&#10;C)(-4, 4)&#10;D)(-4, 0)

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Question 18

Use Cramer's rule to solve the linear system.&#10;5x - 2y = -1 x + 4y = 35&#10;A)(3, 9)&#10;B)(2, 8)&#10;C)(2, 9)&#10;D)(3, 8)

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Question 19

Determine whether the given ordered pair is a solution of the system.&#10;(6, -3) 2x - y = 9 4x + 2y = 18&#10;A)not a solution&#10;B)solution

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Question 20

Use Cramer's rule to solve the linear system.&#10;5x + 3y = 80 2x + y = 30&#10;A)(0, 10)&#10;B)(-10, 10)&#10;C)(10, 0)&#10;D)(10, 10)

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Question 21

Use the substitution method or the elimination method to solve the system. If the system has infinitely many solutions, express the ordered pair in terms of x or y.
$\begin{array} { l } ( 1,2,3 ) \\5 x + 5 y + z = 18 \\4 x - 2 y - z = - 3 \\4 x + y + 3 z = 15\end{array}$

A)not a solution
B)solution

Accepted Answer

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Question 22

Determine if the given ordered triple is a solution of the system.
$\begin{aligned}- 3 x - y - 6 z = & - 75 \\5 x + 5 y - 5 z = & 35 \\- 9 x - 7 y + z = & - 109\end{aligned}$

A)(-6, 9, 12)
B)(6, 9, 8)
C)(12, 9, -6)
D)(6, 8, 9)

Accepted Answer

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Question 23

Solve the system of equations by elimination.
$\begin{array} { l } \frac { 1 } { 2 } x + \frac { 1 } { 3 } y = 4 \\\frac { 1 } { 4 } x + \frac { 1 } { 6 } y = 2\end{array}$

A)

( 0,12 )

B)

\left( - 1 , \frac { 15 } { 2 } \right)

C)

\left( x , - \frac { 3 } { 2 } x + 12 \right)

or

\left( - \frac { 2 } { 3 } y + 8 , y \right)

D) no solution

Accepted Answer

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Question 24

Solve the problem.&#10;The Family Fine Arts Center charges $20 per adult and $11 per senior citizen for its performances. On a recent weekend evening when 514 people paid admission, the total receipts were $7175. How many who paid were senior citizens?&#10;A)259 senior citizens&#10;B)255 senior citizens&#10;C)169 senior citizens&#10;D)345 senior citizens

Accepted Answer

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Question 25

Use the substitution method or the elimination method to solve the system. If the system has infinitely many solutions, express the ordered pair in terms of x or y.
$\begin{array} { l } ( 1,2,3 ) \\5 x + 5 y + z = 18 \\4 x - 2 y - z = - 3 \\4 x + y + 3 z = 15\end{array}$

A)not a solution
B)solution

Accepted Answer

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Question 26

Solve the system of equations by substitution.&#10;3x - 5y = -12 6x + 8y = -24&#10;A)(0, -4)&#10;B)(0, 4)&#10;C)(-4, 0)&#10;D)(4, 0)

Accepted Answer

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Question 27

Solve the system of equations by substitution.
$\begin{array} { l } \frac { 7 } { 12 } x - y = 10 \\\frac { 5 } { 9 } x + 2 y = 11\end{array}$

A)

\left( 16 , \frac { 1 } { 2 } \right)

B)

\left( - 16 , - \frac { 1 } { 2 } \right)

C)

\left( - 18 , - \frac { 1 } { 2 } \right)

D)

\left( 18 , \frac { 1 } { 2 } \right)

Accepted Answer

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Question 28

Solve the system of equations by elimination.&#10;x + 9y = 9 5x - 6y = -6&#10;A)(1, 1)&#10;B)(0, 0)&#10;C)(1, 0)&#10;D)(0, 1)

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Question 29

Use the substitution method or the elimination method to solve the system. If the system has infinitely many solutions, express the ordered pair in terms of x or y.
The Paperback Trader is a book store that takes in used paperbacks for 20% of their cover price and sells them for 50% of their cover price. Pat brings in a stack of 17 paperback books to trade and gets $17.17 credit. Some of the books had a cover price of $6.99, the rest $3.99. She wants to get some Tom Clancy books having a cover price of $6.99. How many $6.99 books did she bring in and how many Clancy books can she get without paying any additional cash?

A)6 $6.99 books, 5 Clancy books
B)6 $6.99 books, 2 Clancy books
C)11 $6.99 books, 2 Clancy books
D)6 $6.99 books, 4 Clancy books

Accepted Answer

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Question 30

Solve the system of equations by elimination.&#10;5x + 7y = 22 5x + 2y = 42&#10;A)(-4, 10)&#10;B)(-10, 7)&#10;C)( -10, 5)&#10;D)(10, -4)

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Question 31

Determine if the given ordered triple is a solution of the system.
$\begin{aligned}- 3 x - y - 6 z = & - 75 \\5 x + 5 y - 5 z = & 35 \\- 9 x - 7 y + z = & - 109\end{aligned}$

A)(-6, 9, 12)
B)(6, 9, 8)
C)(12, 9, -6)
D)(6, 8, 9)

Accepted Answer

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Question 32

Use the substitution method or the elimination method to solve the system. If the system has infinitely many solutions, express the ordered pair in terms of x or y.
$\begin{array} { l } ( 1,2,3 ) \\5 x + 5 y + z = 18 \\4 x - 2 y - z = - 3 \\4 x + y + 3 z = 15\end{array}$

A)not a solution
B)solution

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Question 33

Solve the problem.&#10;A tour group split into two groups when waiting in line for food at a fast food counter. The first group bought 8 slices of pizza and 6 soft drinks for $31.68. The second group bought 5 slices of pizza and 4 soft drinks for $ 20.22. How much does one slice of pizza cost?&#10;A)$2.18 per slice of pizza&#10;B)$1.68 per slice of pizza&#10;C)$2.20 per slice of pizza&#10;D)$2.70 per slice of pizza

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Question 34

Solve the system of equations by elimination.
x + 6y = -3 2x + 12y = -6

A)no solution B)

\left( x , - \frac { 1 } { 6 } x - \frac { 1 } { 2 } \right)

or

( - 6 y - 3 , y )

C)(0, 0)
D)(-3, 0)

Accepted Answer

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Question 35

Solve the system of equations by elimination.
$\begin{array} { l } \frac { 1 } { 2 } x + \frac { 1 } { 3 } y = 4 \\\frac { 1 } { 4 } x + \frac { 1 } { 6 } y = 2\end{array}$

A)

( 0,12 )

B)

\left( - 1 , \frac { 15 } { 2 } \right)

C)

\left( x , - \frac { 3 } { 2 } x + 12 \right)

or

\left( - \frac { 2 } { 3 } y + 8 , y \right)

D) no solution

Accepted Answer

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Question 36

Solve the system of equations by elimination.&#10;6x - 5y = 1 30x - 25y = 4&#10;A)(1, 4)&#10;B)(5, 4) C)&#10;$\left( \frac { 5 } { 36 } , \frac { 1 } { 6 } \right)$&#10;D)no solution

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Question 37

Solve the system of equations by elimination.&#10;$$\frac { 3 } { 5 } x + \frac { 2 } { 5 } y = \frac { 38 } { 5 }$$&#10;A)(-16, 6)&#10;B)(16, -5)&#10;C)(-16, 4)&#10;D)(-5, 16)

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Question 38

Solve the system of equations by substitution.&#10;2x + 36y = -272 9x + 6y = 24&#10;A)(9, -9)&#10;B)(8, -8)&#10;C)(-8, 8)&#10;D)(-6, 8)

Accepted Answer

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Question 39

Solve the system of equations by elimination.&#10;8x - 5y = 3 -24x + 15y = -12&#10;A)(3, 4)&#10;B)no solution&#10;C)(8, 3) $$\text { D) } \left( \frac { 16 } { 9 } , - \frac { 10 } { 9 } \right)$$

Accepted Answer

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Question 40

Solve the problem.&#10;A flat rectangular piece of aluminum has a perimeter of 62 inches. The length is 9 inches longer than the width. Find the width.&#10;A)29 in.&#10;B)31 in.&#10;C)11 in.&#10;D)20 in.

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Question 41

Solve the system of linear equations. If the system has infinitely many solutions, describe the solution with an ordered triple in terms of variable z.
$\begin{array} { r } x - y + 5 z = - 21 \\5 x + z = - 4 \\x + 2 y + z = - 2\end{array}$

A)

( - 4,0,1 )

B) no solution
C)

( - 4,1,0 )

D)

( 0,1 , - 4 )

Accepted Answer

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Question 42

Solve the system of linear equations. If the system has infinitely many solutions, describe the solution with an ordered triple in terms of variable z.
$\begin{array} { r } x - y + 5 z = - 21 \\5 x + z = - 4 \\x + 2 y + z = - 2\end{array}$

A)

( - 4,0,1 )

B) no solution
C)

( - 4,1,0 )

D)

( 0,1 , - 4 )

Accepted Answer

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Question 43

Solve the system of linear equations using the elimination method.&#10;x + 8y + 8z = 8 7x + 7y + z = 1 8x + 15y + 9z = -9&#10;A)(0, 0, 1)&#10;B)(1, -1, 1)&#10;C)no solution&#10;D)(-1, 0, 1)

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Question 44

Solve the system of linear equations. If the system has infinitely many solutions, describe the solution with an ordered triple in terms of variable z.
$\begin{array} { r } x - y + 5 z = - 21 \\5 x + z = - 4 \\x + 2 y + z = - 2\end{array}$

A)

( - 4,0,1 )

B) no solution
C)

( - 4,1,0 )

D)

( 0,1 , - 4 )

Accepted Answer

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Question 45

Determine if the given ordered triple is a solution of the system.
$\begin{aligned}- 3 x - y - 6 z = & - 75 \\5 x + 5 y - 5 z = & 35 \\- 9 x - 7 y + z = & - 109\end{aligned}$

A)(-6, 9, 12)
B)(6, 9, 8)
C)(12, 9, -6)
D)(6, 8, 9)

Accepted Answer

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Question 46

Solve the problem.&#10;A basketball player scored 24 points in a game. The number of three-point field goals the player made was 14 less than three times the number of free throws (each worth 1 point). Twice the number of two-point field goals the player made was 15 more than the number of three-point field goals made. Find the number of free-throws, two-point field goals, and three-point field goals that the player made in the game.&#10;A)5 free throws; 8 two-point field goals; 1 three-point field goals&#10;B)5 free throws; 9 two-point field goals; 3 three-point field goals&#10;C)6 free throws; 8 two-point field goals; 4 three-point field goals&#10;D)5 free throws; 1 two-point field goals; 8 three-point field goals

Accepted Answer

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Question 47

Solve the problem.&#10;The Little Town Arts Center charges $25 for adults, $14 for senior citizens, and $10 for children under 12 for their live performances on Sunday afternoon. This past Sunday, the paid revenue was $12,800 for 792 tickets sold. There were 41 more children than adults. How many children attended?&#10;A)215 children&#10;B)299 children&#10;C)268 children&#10;D)309 children

Accepted Answer

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Question 48

Solve the system of linear equations. If the system has infinitely many solutions, describe the solution with an ordered triple in terms of variable z.
$\begin{array} { r } x - y + 5 z = - 21 \\5 x + z = - 4 \\x + 2 y + z = - 2\end{array}$

A)

( - 4,0,1 )

B) no solution
C)

( - 4,1,0 )

D)

( 0,1 , - 4 )

Accepted Answer

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Question 49

Solve the system of linear equations using the elimination method.
$\begin{array} { r r } x + y + z & = 7 \\x - y + 2 z & = 7 \\2 x + 3 z & = 14\end{array}$

A)

\left( - \frac { 3 z } { 2 } - 7,2 z , z \right)

B)

\left( - \frac { 3 z } { 2 } + 7 , \frac { z } { 2 } , z \right)

C ) \left( - \frac { 3 z } { 2 } - 7 , \frac { z } { 2 } , z \right)

D)

\left( - \frac { 3 z } { 2 } + 7,2 z , z \right)

Accepted Answer

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Question 50

Use Gaussian elimination to solve the linear system by finding an equivalent system in triangular form.&#10;$$\begin{aligned}&#10;x + y + z & = 3 \&#10;x - y + 2 z & = 5 \&#10;4 x + y + z & = - 3&#10;\end{aligned}$$&#10;A)(-2, 1, 4)&#10;B)(-2, 4, 1)&#10;C)(4, -2, 1)&#10;D)(4, 1, -2)

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Question 51

Use Gaussian elimination to solve the linear system by finding an equivalent system in triangular form.&#10;$$\begin{array} { l } &#10;5 x + 4 y + z = - 16 \&#10;5 x - 2 y - z = - 2 \&#10;4 x + y + 3 z = 7&#10;\end{array}$$&#10;A)(-1, 5, -4)&#10;B)no solution&#10;C)(-1, -4, 5)&#10;D)(5, -4, -1)

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Question 52

Solve the system of linear equations using the elimination method.&#10;$$\begin{aligned}&#10;5 x + 2 y + z & = - 11 \&#10;2 x - 3 y - z & = 17 \&#10;7 x - y & = 12&#10;\end{aligned}$$&#10;A)no solution&#10;B)(-2, 0, -1)&#10;C)(0, -6, 1)&#10;D)(1, -5, 0)

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Question 53

Solve the problem.&#10;A ceramics workshop makes serving bowls, platters, and bread baskets to sell at its Winter Festival. A serving bowl takes 3 hours to prepare, 2 hours to paint, and 9 hours to fire. A platter takes 16 hours to prepare, 3 hours to paint, and 4 hours to fire. A bread basket takes 4 hours to prepare, 17 hours to paint, and 7 hours to fire. If the workshop has 119 hours for prep time, 84 hours for painting, and 122 hours for firing, how many of each can be made?&#10;A)9 serving bowls, 5 platters, 3 bread baskets&#10;B)3 serving bowls, 9 platters, 5 bread baskets&#10;C)10 serving bowls, 6 platters, 4 bread baskets&#10;D)5 serving bowls, 3 platters, 9 bread baskets

Accepted Answer

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Question 54

Solve the system of linear equations using the elimination method.
$\begin{array} { r r } x + y + z & = 7 \\x - y + 2 z & = 7 \\2 x + 3 z & = 14\end{array}$

A)

\left( - \frac { 3 z } { 2 } - 7,2 z , z \right)

B)

\left( - \frac { 3 z } { 2 } + 7 , \frac { z } { 2 } , z \right)

C ) \left( - \frac { 3 z } { 2 } - 7 , \frac { z } { 2 } , z \right)

D)

\left( - \frac { 3 z } { 2 } + 7,2 z , z \right)

Accepted Answer

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Question 55

Solve the problem.&#10;Find the values of $a$, $b$, and $c$ such that the graph of the quadratic equation $y = a x ^ { 2 } + b x + c$ passes through the points $( - 3,5 ) , ( 1,1 )$, and $( 2 , - 5 )$.&#10;A) $a = 1 ; b = - 3 ; c = 5$&#10;B) $a = 1 ; b = 5 ; c = - 3$&#10;C) $a = - 1 ; b = 5 ; c = - 3$&#10;D) $a = - 1 ; b = - 3 ; c = 5$

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Question 56

Solve the system of linear equations using the elimination method.&#10;x = -5 - y - z x - y + 4z = 2 2x + y =-4 - z&#10;A)(1, -5, -1)&#10;B)(-1, 1, -5)&#10;C)(-1, -5, 1)&#10;D)(-5, -1, 1)

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Question 57

Solve the system of linear equations using the elimination method.
$\begin{array} { r r } x + y + z & = 7 \\x - y + 2 z & = 7 \\2 x + 3 z & = 14\end{array}$

A)

\left( - \frac { 3 z } { 2 } - 7,2 z , z \right)

B)

\left( - \frac { 3 z } { 2 } + 7 , \frac { z } { 2 } , z \right)

C ) \left( - \frac { 3 z } { 2 } - 7 , \frac { z } { 2 } , z \right)

D)

\left( - \frac { 3 z } { 2 } + 7,2 z , z \right)

Accepted Answer

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Question 58

Solve the system of linear equations. If the system has infinitely many solutions, describe the solution with an ordered triple in terms of variable z.
$\begin{array} { r } x - y + 5 z = - 21 \\5 x + z = - 4 \\x + 2 y + z = - 2\end{array}$

A)

( - 4,0,1 )

B) no solution
C)

( - 4,1,0 )

D)

( 0,1 , - 4 )

Accepted Answer

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Question 59

Solve the system of linear equations. If the system has infinitely many solutions, describe the solution with an ordered triple in terms of variable z.&#10;A deli sells three sizes of chicken sandwiches: the small chicken sandwich contains 4 ounces of meat and sells for $3.00; the regular chicken sandwich contains 8 ounces of meat and sells for $3.50; and the large chicken sandwich contains 10 ounces of meat and sells for $4.00. A customer requests a selection of each size for a reception. She and the manager agree on a combination of 52 sandwiches made from 22 pounds 4 ounces of chicken for a total cost of $178. How many of each size sandwich will be in this combination? (Note: 1 pound = 16 ounces)&#10;A)24 small sandwiches, 10 medium sandwiches, 18 large sandwiches.&#10;B)20 small sandwiches, 22 medium sandwiches, 10 large sandwiches.&#10;C)22 small sandwiches, 16 medium sandwiches, 14 large sandwiches.&#10;D)18 small sandwiches, 12 medium sandwiches, 22 large sandwiches.

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Question 60

Solve the system of linear equations using the elimination method.&#10;$$\begin{aligned}&#10;x + y + z & = 9 \&#10;2 x - 3 y + 4 z & = 7 \&#10;x - 4 y + 3 z & = - 2&#10;\end{aligned}$$&#10;A) $\left( \frac { z } { 5 } + \frac { 34 } { 5 } , \frac { 2 z } { 5 } + \frac { 11 } { 5 } , z \right)$&#10;B) $\left( - \frac { 7 z } { 5 } + \frac { 34 } { 5 } , \frac { 2 z } { 5 } + \frac { 11 } { 5 } , z \right)$&#10;C) $\left( \frac { 7 z } { 5 } + \frac { 34 } { 5 } , \frac { 2 z } { 5 } - \frac { 11 } { 5 } , z \right)$&#10;D) $\left( - \frac { 7 z } { 5 } + \frac { 34 } { 5 } , \frac { 2 z } { 5 } - \frac { 11 } { 5 } , z \right)$

Accepted Answer

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Question 61

Solve the problem.&#10;A ceramics workshop makes wreaths, trees, and sleighs for sale at Christmas. A wreath takes 3 hours to prepare, 2 hours to paint, and 9 hours to fire. A tree takes 14 hours to prepare, 3 hours to paint, and 4 hours to fire. A sleigh takes 4 hours to prepare, 14 hours to paint, and 7 hours to fire. If the workshop has 86 hours for preparation time, 66 hours for painting, and 91 hours for firing, how many of each can be made?&#10;A)4 wreaths, 3 trees, 6 sleighs&#10;B)3 wreaths, 6 trees, 4 sleighs&#10;C)7 wreaths, 5 trees, 4 sleighs&#10;D)6 wreaths, 4 trees, 3 sleighs

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Question 62

Use Gauss-Jordan elimination to solve the linear system and determine whether the system has a unique solution, no solution, or infinitely many solutions. If the system has infinitely many solutions, describe the solution as an ordered triple involving variable z.&#10;$$\frac { x } { ( x - 4 ) ( x - 5 ) }$$&#10;A) $\frac { - 5 } { x - 4 } + \frac { 4 } { x - 5 }$&#10;B) $\frac { 4 } { x - 4 } + \frac { - 5 } { x - 5 }$&#10;C) $\frac { - 4 } { x - 4 } + \frac { 5 } { x - 5 }$&#10;D) $\frac { - 4 } { x - 4 } + \frac { - 5 } { x - 5 }$

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Question 63

Use Gaussian elimination to solve the linear system by finding an equivalent system in triangular form.&#10;$$\begin{aligned}&#10;x - y + 4 z & = 16 \&#10;4 x + z & = 5 \&#10;x + 5 y + z & = 25&#10;\end{aligned}$$&#10;A)(0, 4, 5)&#10;B)(5, 4, 0)&#10;C)(0, 5, 4)&#10;D)(5, 0, 4)

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Question 64

Use Gaussian elimination and matrices to solve the system of linear equations. Write your final augmented matrix in triangular form and then solve for each variable using back substitution.&#10;$$\begin{array} { r } &#10;x + 3 y + 2 z = 11 \&#10;4 y + 9 z = - 12 \&#10;x + 7 y + 11 z = - 1&#10;\end{array}$$&#10;A) $\left( \frac { 19 \mathrm { z } } { 4 } + 20 , - \frac { 9 \mathrm { z } } { 4 } + 3 , \mathrm { z } \right)$&#10;B) $\left( \frac { 19 z } { 4 } + 20 , \frac { 9 z } { 4 } + 3 , z \right)$&#10;C) $\left( \frac { 19 \mathrm { z } } { 4 } + 20 , - \frac { 9 \mathrm { z } } { 4 } - 3 , \mathrm { z } \right)$&#10;D) $\left( - \frac { 19 z } { 4 } + 20 , - \frac { 9 z } { 4 } + 3 , z \right)$

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Deck 7: Systems of Equations and Inequalities