Question 1

Solve the system of equations.&#10; -x + y - z = 8&#10;4x - 2y + 5z = -28&#10;2x - 2y + 2z = -14&#10;A) {(0, 4, -4)}&#10;B) {$\varnothing$}&#10;C) {(x, y, z) | -x + y - z = 8}&#10;D) {(x, y, z) | 4x - 2y + 5z = -28}

Accepted Answer

{$\varnothing$}&#10;

Question 2

For Monday morning's staff meeting, Jim bought 2 bags of bagels and 3 packages of cream cheese and paid $11.50 (excluding sales tax). For Friday's meeting, he bought 4 bags of bagels and 2 packages of cream cheese and paid $13.00 (again, excluding sales tax). How much do bags of bagels and packages of cream cheese cost?

A) $1.75 per bag for bagels, $2.75 per package for cream cheese
B) $3.25 per bag for bagels, $2.50 per package for cream cheese
C) $2.00 per bag for bagels, $2.50 per package for cream cheese
D) $2.50 per bag for bagels, $2.00 per package for cream cheese

Accepted Answer

Let's start by assigning variables to the cost of each item:
- Bagel: B
- Cream cheese: C

We can then set up a system of equations using the information given:
2B + 3C = 11.5
4B + 2C = 13

Solving this system, we get:
B = 2
C = 2.5

Therefore, the cost of bags of bagels is $2 per bag and the cost of packages of cream cheese is $2.5 per package. The closest choice to this is C.

Question 3

Solve the system of equations. &#10;2x - 3y + z = 4&#10;8x - 12y + 4z = 16&#10;-4x + 6y - 2z = -8&#10;A) {(-3, 6, 7)}&#10;B) {(-4, -2, -1)}&#10;C) {$\varnothing$}&#10;D) {(x, y, z) | 2x - 3y + z = 4}

Accepted Answer

The system of equations is dependent, meaning all equations are multiples of each other. This results in an infinite number of solutions that satisfy the condition 2x - 3y + z = 4, rather than a single solution.

Question 4

Solve the system of equations. -3x + 3y - 4z = -58&#10;5x + 2y - z = 1&#10;-4x - 3y + 3z = 23&#10;A) {(4, -4, 2)}&#10;B) {(1, -6, 7)}&#10;C) {(4, -6, 7)}&#10;D) {(-6, 6, 5)}

Accepted Answer

By using elimination, we can find that x = 4, y = -6, and z = 7, which corresponds to choice C. Plug these values into the original equations to check that they satisfy all three equations.

Question 5

When the graphs of two independent linear equations (each in three variables) intersect, the intersection is&#10;A) a line.&#10;B) a plane.&#10;C) a point.&#10;D) None of these.

Accepted Answer

The intersection of two independent linear equations in three variables is a line, as each equation represents a plane in three-dimensional space, and the intersection of two planes is a line.

Question 6

Solve the system of equations. 0.5x + 2y = 1.25&#10;-0)875x + 1.5y = 2.8125&#10;A) {(-1, 1.5)}&#10;B) {(0, 1)}&#10;C) {(0, 3)}&#10;D) {(-1.5, 1)}

Accepted Answer

The system can be solved by using elimination method. Multiply the first equation by 1.75 and the second equation by 0.5 to get rid of the decimals. Then subtract the second equation from the first equation to eliminate x. Solving for y will give y = 1. Using y = 1 in either of the original equations will give x = -1.5. Therefore, the solution is (-1.5, 1), which is choice D.

Question 7

Suzanne invested $18,100 in two mutual fund accounts: the Abernathy Fund and the Brice Fund. During the subsequent year, The Abernathy Fund earned 11% and the Brice account earned 6%. At the end of the year, the total interest earned was $1,391. How much did Suzanne invest in each fund?

A) $6,600 in the Abernathy Fund, $11,500 in the Brice Fund
B) $5,100 in the Abernathy Fund, $13,000 in the Brice Fund
C) $6,100 in the Abernathy Fund, $12,000 in the Brice Fund
D) $6,600 in the Abernathy Fund, $11,700 in the Brice Fund

Accepted Answer

The answer of Suzanne invested $18,100 in two mutual fund...

Question 8

When rolling a pair of dice, the probability of getting a particular total is not very high. For example, the probability of failing to roll a total of 7 is 5 times the probability of successfully rolling a total of 7. The total probability (probability of failing to roll a 7 + probability of successfully rolling a 7) is 1. What is the probability of rolling a 7?

A) 1 in 6
B) 1 in 18
C) 1 in 9
D) None of these.

Accepted Answer

There are 6 possible outcomes when rolling two dice (1+1, 1+2, 1+3, etc. up to 6+6). Out of these, there are 6 ways to roll a total of 7 (1+6, 2+5, 3+4, 4+3, 5+2, and 6+1). The probability of rolling a 7 is therefore 6/36, which simplifies to 1/6. The probability of failing to roll a 7 is 30/36, which simplifies to 5/6. Adding these two probabilities together gives 1, as required. Therefore, the answer is A) 1 in 6.

Question 9

Solve the system of linear equations by the substitution method.  &#10;A)&#10; &#10;B)&#10; &#10;C) No solution. The system is inconsistent.&#10;D)&#10;

Accepted Answer

From the first equation, we can solve for x:

4x + y = 13 
4x = 13 - y 
x = (13 - y)/4

Substitute this expression for x into the second equation:

2( (13-y)/4 ) - y = -1

Simplify:

(13 - y)/2 - y = -1 
13 - y - 2y = -2 
-3y = -15 
y = 5

Now substitute y = 5 back into either equation to solve for x:

4x + 5 = 13 
4x = 8 
x = 2

Therefore, the solution is (2,5), which matches choice B.

Question 10

Solve the system of linear equations.    &#10;A) No solution. The system is inconsistent.&#10;B) {(1, 5)}&#10;C) {(3, 7)}&#10;D) {(-3, -6)}

Accepted Answer

The answer of Solve the system of linear equations. ...

Question 11

Solve the system of equations.  &#10;A) {(-1, 2, -2)}&#10;B) {(-1, 0, 3)}&#10;C) {(-4, 0, 3)}&#10;D) {(0, 1, 1)}

Accepted Answer

The answer of Solve the system of equations.  &#10;A)...

Question 12

For the system find the value of a so that the solution set to the system is {(7, 3)}.  &#10;A)  &#10;B) 3&#10;C) 10&#10;D) -3

Accepted Answer

The answer of For the system find the value of...

Question 13

Solve the system of linear equations by the substitution method. 8x = -3y - 15&#10;5x - 8y = 40&#10;A) {(-2, -4)}&#10;B) {(0, -5)}&#10;C) No solution. The system is inconsistent.&#10;D) {(2, -2)}

Accepted Answer

The answer of Solve the system of linear equations by...

Question 14

Which of the following graphs correctly describes the system and its solution?     &#10;A)&#10;   &#10;B)&#10;   &#10;C)&#10;   &#10;D)&#10;None of these.

Accepted Answer

The answer of Which of the following graphs correctly describes...

Question 15

Fred, Tiger, and Nancy play a round of golf together. Their combined score is 224. Fred's score was 4 more than Tiger's, and Nancy's score was 6 more than Fred's. What was each person's score?&#10;A) Fred = 74 ; Tiger = 70 ; Nancy = 80&#10;B) Fred = 71 ; Tiger = 67 ; Nancy = 77&#10;C) Fred = 76 ; Tiger = 72 ; Nancy = 82&#10;D) Fred = 70 ; Tiger = 74 ; Nancy = 80

Accepted Answer

The answer of Fred, Tiger, and Nancy play a round...

Question 16

Cashews sell for $5 per pound and peanuts sell for $2 per pound. How many pounds of each would you use to make 20 pounds of a mixture that sells for $4.25 per pound?&#10;A) 13 lb cashews, 7 lb peanuts&#10;B) 16 lb cashews, 4 lb peanuts&#10;C) 17 lb cashews, 3 lb peanuts&#10;D) 15 lb cashews, 5 lb peanuts

Accepted Answer

The answer of Cashews sell for $5 per pound and...

Question 17

When three linear equations (each in three variables) are graphed, two of the equations are seen to be parallel planes. The system is&#10;A) normal.&#10;B) incomplete.&#10;C) inconsistent.&#10;D) dependent.

Accepted Answer

The answer of When three linear equations (each in three...

Deck 7: Section 1: Systems of Linear Equations