(a) What are the three methods we use to solve a system of equations? (b) Solve the system by the elimination method and by the graphical method. { x + y = 3 3 x − y = 1

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Answer 1

Textbook Question

Chapter 10, Problem 1RCC

(a) What are the three methods we use to solve a system of equations?
(b) Solve the system by the elimination method and by the graphical method.

{ x + y = 3 3 x − y = 1

(a)

Expert Solution

To determine

The three methods used to solve a system of equations.

Answer to Problem 1RCC

The three methods to solve a system of equations are Substitution Method, Elimination Method and Graphical Method.

Explanation of Solution

The first method is Substitution Method.

Solve any of the two given equations in terms of the other variable and substitute the value into the other equation then back substitute the value into the initial equation to determine the value of the variables.

The second method is Elimination Method.

Multiply the equations with a selected constant value to make coefficient of any of the two variable same with opposite sign and add the equations to get the value of one of the variables then back substitute the value into the initial equation to determine the value of the other variable.

The third method is Graphical Method.

Graph the given pair of equations and find the intersection point of the graphs . The x and y coordinates of the intersection point is the value of variables.

(b)

Expert Solution

To determine

To evaluate: The solution of given equations using elimination method and graphical method.

Answer to Problem 1RCC

The solution is ordered pair (1,2) .

Explanation of Solution

Section1:

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Add the equation (1) and (2) to eliminate y, as the coefficients of y-term in both equations are negative to each other.

x+y=33x−y=1_4x =4x=1

The value of x is 1.

Back-substitute 1 for x in equation (1) and find the value of y.

x+y=31+y=3y=2

The value of y is 2.

Thus, the solution is ordered pair (1,2) .

Section2

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Substitute some value of y in equation (1) and make a table for values of x and y.

x	y
−1	4
0	3
1	2
2	1
3	0

Substitute some value of y in equation (2) and make a table for values of x and y.

x	y
−1	−4
0	−1
1	2
2	5
3	8

Plot the point from the tables and connect the points to make the graph of equation (1) and equation (2).

Student Solutions Manual for Stewart/Redlin/Watson's Precalculus: Mathematics for Calculus, 7th, Chapter 10, Problem 1RCC

Figure (1)

From Figure (1), it can be noticed that the graph of two linear equations intersect at a single point.

Thus, the system of equations has one solution and the point of intersection is (1,2) .

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help please

Answer 2

Textbook Question

Chapter 10, Problem 1RCC

(a) What are the three methods we use to solve a system of equations?
(b) Solve the system by the elimination method and by the graphical method.

{ x + y = 3 3 x − y = 1

(a)

Expert Solution

To determine

The three methods used to solve a system of equations.

Answer to Problem 1RCC

The three methods to solve a system of equations are Substitution Method, Elimination Method and Graphical Method.

Explanation of Solution

The first method is Substitution Method.

Solve any of the two given equations in terms of the other variable and substitute the value into the other equation then back substitute the value into the initial equation to determine the value of the variables.

The second method is Elimination Method.

Multiply the equations with a selected constant value to make coefficient of any of the two variable same with opposite sign and add the equations to get the value of one of the variables then back substitute the value into the initial equation to determine the value of the other variable.

The third method is Graphical Method.

Graph the given pair of equations and find the intersection point of the graphs . The x and y coordinates of the intersection point is the value of variables.

(b)

Expert Solution

To determine

To evaluate: The solution of given equations using elimination method and graphical method.

Answer to Problem 1RCC

The solution is ordered pair (1,2) .

Explanation of Solution

Section1:

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Add the equation (1) and (2) to eliminate y, as the coefficients of y-term in both equations are negative to each other.

x+y=33x−y=1_4x =4x=1

The value of x is 1.

Back-substitute 1 for x in equation (1) and find the value of y.

x+y=31+y=3y=2

The value of y is 2.

Thus, the solution is ordered pair (1,2) .

Section2

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Substitute some value of y in equation (1) and make a table for values of x and y.

x	y
−1	4
0	3
1	2
2	1
3	0

Substitute some value of y in equation (2) and make a table for values of x and y.

x	y
−1	−4
0	−1
1	2
2	5
3	8

Plot the point from the tables and connect the points to make the graph of equation (1) and equation (2).

Student Solutions Manual for Stewart/Redlin/Watson's Precalculus: Mathematics for Calculus, 7th, Chapter 10, Problem 1RCC

Figure (1)

From Figure (1), it can be noticed that the graph of two linear equations intersect at a single point.

Thus, the system of equations has one solution and the point of intersection is (1,2) .

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 3

Textbook Question

Chapter 10, Problem 1RCC

(a) What are the three methods we use to solve a system of equations?
(b) Solve the system by the elimination method and by the graphical method.

{ x + y = 3 3 x − y = 1

(a)

Expert Solution

To determine

The three methods used to solve a system of equations.

Answer to Problem 1RCC

The three methods to solve a system of equations are Substitution Method, Elimination Method and Graphical Method.

Explanation of Solution

The first method is Substitution Method.

Solve any of the two given equations in terms of the other variable and substitute the value into the other equation then back substitute the value into the initial equation to determine the value of the variables.

The second method is Elimination Method.

Multiply the equations with a selected constant value to make coefficient of any of the two variable same with opposite sign and add the equations to get the value of one of the variables then back substitute the value into the initial equation to determine the value of the other variable.

The third method is Graphical Method.

Graph the given pair of equations and find the intersection point of the graphs . The x and y coordinates of the intersection point is the value of variables.

(b)

Expert Solution

To determine

To evaluate: The solution of given equations using elimination method and graphical method.

Answer to Problem 1RCC

The solution is ordered pair (1,2) .

Explanation of Solution

Section1:

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Add the equation (1) and (2) to eliminate y, as the coefficients of y-term in both equations are negative to each other.

x+y=33x−y=1_4x =4x=1

The value of x is 1.

Back-substitute 1 for x in equation (1) and find the value of y.

x+y=31+y=3y=2

The value of y is 2.

Thus, the solution is ordered pair (1,2) .

Section2

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Substitute some value of y in equation (1) and make a table for values of x and y.

x	y
−1	4
0	3
1	2
2	1
3	0

Substitute some value of y in equation (2) and make a table for values of x and y.

x	y
−1	−4
0	−1
1	2
2	5
3	8

Plot the point from the tables and connect the points to make the graph of equation (1) and equation (2).

Student Solutions Manual for Stewart/Redlin/Watson's Precalculus: Mathematics for Calculus, 7th, Chapter 10, Problem 1RCC

Figure (1)

From Figure (1), it can be noticed that the graph of two linear equations intersect at a single point.

Thus, the system of equations has one solution and the point of intersection is (1,2) .

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 4

Textbook Question

Chapter 10, Problem 1RCC

(a) What are the three methods we use to solve a system of equations?
(b) Solve the system by the elimination method and by the graphical method.

{ x + y = 3 3 x − y = 1

(a)

Expert Solution

To determine

The three methods used to solve a system of equations.

Answer to Problem 1RCC

The three methods to solve a system of equations are Substitution Method, Elimination Method and Graphical Method.

Explanation of Solution

The first method is Substitution Method.

Solve any of the two given equations in terms of the other variable and substitute the value into the other equation then back substitute the value into the initial equation to determine the value of the variables.

The second method is Elimination Method.

Multiply the equations with a selected constant value to make coefficient of any of the two variable same with opposite sign and add the equations to get the value of one of the variables then back substitute the value into the initial equation to determine the value of the other variable.

The third method is Graphical Method.

Graph the given pair of equations and find the intersection point of the graphs . The x and y coordinates of the intersection point is the value of variables.

(b)

Expert Solution

To determine

To evaluate: The solution of given equations using elimination method and graphical method.

Answer to Problem 1RCC

The solution is ordered pair (1,2) .

Explanation of Solution

Section1:

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Add the equation (1) and (2) to eliminate y, as the coefficients of y-term in both equations are negative to each other.

x+y=33x−y=1_4x =4x=1

The value of x is 1.

Back-substitute 1 for x in equation (1) and find the value of y.

x+y=31+y=3y=2

The value of y is 2.

Thus, the solution is ordered pair (1,2) .

Section2

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Substitute some value of y in equation (1) and make a table for values of x and y.

x	y
−1	4
0	3
1	2
2	1
3	0

Substitute some value of y in equation (2) and make a table for values of x and y.

x	y
−1	−4
0	−1
1	2
2	5
3	8

Plot the point from the tables and connect the points to make the graph of equation (1) and equation (2).

Student Solutions Manual for Stewart/Redlin/Watson's Precalculus: Mathematics for Calculus, 7th, Chapter 10, Problem 1RCC

Figure (1)

From Figure (1), it can be noticed that the graph of two linear equations intersect at a single point.

Thus, the system of equations has one solution and the point of intersection is (1,2) .

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 5

Textbook Question

Answer 6

Textbook Question

Answer 7

(a)

Expert Solution

To determine

The three methods used to solve a system of equations.

Answer to Problem 1RCC

The three methods to solve a system of equations are Substitution Method, Elimination Method and Graphical Method.

Explanation of Solution

The first method is Substitution Method.

Solve any of the two given equations in terms of the other variable and substitute the value into the other equation then back substitute the value into the initial equation to determine the value of the variables.

The second method is Elimination Method.

Multiply the equations with a selected constant value to make coefficient of any of the two variable same with opposite sign and add the equations to get the value of one of the variables then back substitute the value into the initial equation to determine the value of the other variable.

The third method is Graphical Method.

Graph the given pair of equations and find the intersection point of the graphs . The x and y coordinates of the intersection point is the value of variables.

(b)

Expert Solution

To determine

To evaluate: The solution of given equations using elimination method and graphical method.

Answer to Problem 1RCC

The solution is ordered pair (1,2) .

Explanation of Solution

Section1:

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Add the equation (1) and (2) to eliminate y, as the coefficients of y-term in both equations are negative to each other.

x+y=33x−y=1_4x =4x=1

The value of x is 1.

Back-substitute 1 for x in equation (1) and find the value of y.

x+y=31+y=3y=2

The value of y is 2.

Thus, the solution is ordered pair (1,2) .

Section2

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Substitute some value of y in equation (1) and make a table for values of x and y.

x	y
−1	4
0	3
1	2
2	1
3	0

Substitute some value of y in equation (2) and make a table for values of x and y.

x	y
−1	−4
0	−1
1	2
2	5
3	8

Plot the point from the tables and connect the points to make the graph of equation (1) and equation (2).

Student Solutions Manual for Stewart/Redlin/Watson's Precalculus: Mathematics for Calculus, 7th, Chapter 10, Problem 1RCC

Figure (1)

From Figure (1), it can be noticed that the graph of two linear equations intersect at a single point.

Thus, the system of equations has one solution and the point of intersection is (1,2) .

Answer 8

(a)

Expert Solution

To determine

The three methods used to solve a system of equations.

Answer to Problem 1RCC

The three methods to solve a system of equations are Substitution Method, Elimination Method and Graphical Method.

Explanation of Solution

The first method is Substitution Method.

Solve any of the two given equations in terms of the other variable and substitute the value into the other equation then back substitute the value into the initial equation to determine the value of the variables.

The second method is Elimination Method.

Multiply the equations with a selected constant value to make coefficient of any of the two variable same with opposite sign and add the equations to get the value of one of the variables then back substitute the value into the initial equation to determine the value of the other variable.

The third method is Graphical Method.

Graph the given pair of equations and find the intersection point of the graphs . The x and y coordinates of the intersection point is the value of variables.

Answer 9

(a)

Expert Solution

Answer 10

(a)

Expert Solution

Answer 11

Expert Solution

Answer 12

To determine

The three methods used to solve a system of equations.

Answer 13

Answer to Problem 1RCC

The three methods to solve a system of equations are Substitution Method, Elimination Method and Graphical Method.

Answer 14

Explanation of Solution

The first method is Substitution Method.

Solve any of the two given equations in terms of the other variable and substitute the value into the other equation then back substitute the value into the initial equation to determine the value of the variables.

The second method is Elimination Method.

Multiply the equations with a selected constant value to make coefficient of any of the two variable same with opposite sign and add the equations to get the value of one of the variables then back substitute the value into the initial equation to determine the value of the other variable.

The third method is Graphical Method.

Graph the given pair of equations and find the intersection point of the graphs . The x and y coordinates of the intersection point is the value of variables.

Answer 15

(b)

Expert Solution

To determine

To evaluate: The solution of given equations using elimination method and graphical method.

Answer to Problem 1RCC

The solution is ordered pair (1,2) .

Explanation of Solution

Section1:

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Add the equation (1) and (2) to eliminate y, as the coefficients of y-term in both equations are negative to each other.

x+y=33x−y=1_4x =4x=1

The value of x is 1.

Back-substitute 1 for x in equation (1) and find the value of y.

x+y=31+y=3y=2

The value of y is 2.

Thus, the solution is ordered pair (1,2) .

Section2

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Substitute some value of y in equation (1) and make a table for values of x and y.

x	y
−1	4
0	3
1	2
2	1
3	0

Substitute some value of y in equation (2) and make a table for values of x and y.

x	y
−1	−4
0	−1
1	2
2	5
3	8

Plot the point from the tables and connect the points to make the graph of equation (1) and equation (2).

Student Solutions Manual for Stewart/Redlin/Watson's Precalculus: Mathematics for Calculus, 7th, Chapter 10, Problem 1RCC

Figure (1)

From Figure (1), it can be noticed that the graph of two linear equations intersect at a single point.

Thus, the system of equations has one solution and the point of intersection is (1,2) .

Answer 16

(b)

Expert Solution

Answer 17

(b)

Expert Solution

Answer 18

Expert Solution

Answer 19

To determine

To evaluate: The solution of given equations using elimination method and graphical method.

Answer 20

Answer to Problem 1RCC

The solution is ordered pair (1,2) .

Answer 21

Explanation of Solution

Section1:

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Add the equation (1) and (2) to eliminate y, as the coefficients of y-term in both equations are negative to each other.

x+y=33x−y=1_4x =4x=1

The value of x is 1.

Back-substitute 1 for x in equation (1) and find the value of y.

x+y=31+y=3y=2

The value of y is 2.

Thus, the solution is ordered pair (1,2) .

Section2

The given equations are,

x+y=3 (1)

3x−y=1 (2)

Substitute some value of y in equation (1) and make a table for values of x and y.

x	y
−1	4
0	3
1	2
2	1
3	0

Substitute some value of y in equation (2) and make a table for values of x and y.

x	y
−1	−4
0	−1
1	2
2	5
3	8

Plot the point from the tables and connect the points to make the graph of equation (1) and equation (2).

Student Solutions Manual for Stewart/Redlin/Watson's Precalculus: Mathematics for Calculus, 7th, Chapter 10, Problem 1RCC

Figure (1)

From Figure (1), it can be noticed that the graph of two linear equations intersect at a single point.

Thus, the system of equations has one solution and the point of intersection is (1,2) .

Answer 22

Ch. 10.1 - The system of equations {2x+3y=75xy=9 is a system...Ch. 10.1 - Prob. 2E Ch. 10.1 - A system of two linear equations in two variables...Ch. 10.1 - The following is a system of two linear equations...Ch. 10.1 - SKILLS Substitution Method Use the substitution...Ch. 10.1 - Prob. 6E Ch. 10.1 - SKILLS Substitution Method Use the substitution...Ch. 10.1 - Prob. 8E Ch. 10.1 - Elimination Method Use the elimination method to...Ch. 10.1 - Prob. 10E

(a) What are the three methods we use to solve a system of equations? (b) Solve the system by the elimination method and by the graphical method. { x + y = 3 3 x − y = 1

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Answer to Problem 1RCC

Explanation of Solution

Answer to Problem 1RCC

Explanation of Solution

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