The point of intersection by graphing the lines.

Question

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Answer 1

Question

Chapter 4, Problem 1RP

To determine

The point of intersection by graphing the lines.

Expert Solution & Answer

Answer to Problem 1RP

Solution: The point of intersection for equations is $(- 3, 2)$ .

Explanation of Solution

Given: The equations are,

$2 x + 3 y = 0$

$- x + 3 y = 9$

Calculation: The equations are,

$2 x + 3 y = 0$ …… (1).

$- x + 3 y = 9$ …… (2).

Draw the graph for both equations. by finding $x$ intercept and $y$ intercept for equation (1) and equation (2).

Calculate the values for $x$ and $y$ from equation (1).

Substitute $0$ for $x$ in equation (1) to get y intercept.

$\begin{matrix} 2 (0) + 3 y = 0 \\ 0 + 3 y = 0 \\ y = 0 \end{matrix}$

The value obtained for $y = 0$ .

Substitute $- 2$ for $y$ in equation (1).

$\begin{matrix} 2 x + 3 (- 2) = 0 \\ 2 x - 6 = 0 \\ 2 x = 6 \\ x = 3 \end{matrix}$

The value obtained for $x$ is 3.

Draw a line passing through the point $(0, 0)$ and $(3, - 2)$ .

Calculate the values for $x$ and $y$ from equation (1)

Substitute $0$ for $x$ in equation (2) to get y intercept.

$\begin{matrix} - 0 + 3 y = 9 \\ 3 y = 9 \\ y = 3 \end{matrix}$

The value obtained for $y$ is $3$

Substitute 0 for $y$ in equation (2) to get $x$ intercept.

$\begin{matrix} - x + 3 (0) = 9 \\ x = - 9 \end{matrix}$

The value obtained for $x$ is $- 9$

Draw a line passing through the point $(0, 3)$ and $(- 9, 0)$ .

Beginning Algebra: Early Graphing (4th Edition), Chapter 4, Problem 1RP

Figure (1)

Figure (1) shows the graph for both equations in which a point $(- 3, 2)$ is the point of intersection.

Conclusion:

Therefore, the intersection point of given equations is $(- 3, 2)$ .

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Answer 2

Question

Chapter 4, Problem 1RP

To determine

The point of intersection by graphing the lines.

Expert Solution & Answer

Answer to Problem 1RP

Solution: The point of intersection for equations is $(- 3, 2)$ .

Explanation of Solution

Given: The equations are,

$2 x + 3 y = 0$

$- x + 3 y = 9$

Calculation: The equations are,

$2 x + 3 y = 0$ …… (1).

$- x + 3 y = 9$ …… (2).

Draw the graph for both equations. by finding $x$ intercept and $y$ intercept for equation (1) and equation (2).

Calculate the values for $x$ and $y$ from equation (1).

Substitute $0$ for $x$ in equation (1) to get y intercept.

$\begin{matrix} 2 (0) + 3 y = 0 \\ 0 + 3 y = 0 \\ y = 0 \end{matrix}$

The value obtained for $y = 0$ .

Substitute $- 2$ for $y$ in equation (1).

$\begin{matrix} 2 x + 3 (- 2) = 0 \\ 2 x - 6 = 0 \\ 2 x = 6 \\ x = 3 \end{matrix}$

The value obtained for $x$ is 3.

Draw a line passing through the point $(0, 0)$ and $(3, - 2)$ .

Calculate the values for $x$ and $y$ from equation (1)

Substitute $0$ for $x$ in equation (2) to get y intercept.

$\begin{matrix} - 0 + 3 y = 9 \\ 3 y = 9 \\ y = 3 \end{matrix}$

The value obtained for $y$ is $3$

Substitute 0 for $y$ in equation (2) to get $x$ intercept.

$\begin{matrix} - x + 3 (0) = 9 \\ x = - 9 \end{matrix}$

The value obtained for $x$ is $- 9$

Draw a line passing through the point $(0, 3)$ and $(- 9, 0)$ .

Beginning Algebra: Early Graphing (4th Edition), Chapter 4, Problem 1RP

Figure (1)

Figure (1) shows the graph for both equations in which a point $(- 3, 2)$ is the point of intersection.

Conclusion:

Therefore, the intersection point of given equations is $(- 3, 2)$ .

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

Answer 3

Question

Chapter 4, Problem 1RP

To determine

The point of intersection by graphing the lines.

Expert Solution & Answer

Answer to Problem 1RP

Solution: The point of intersection for equations is $(- 3, 2)$ .

Explanation of Solution

Given: The equations are,

$2 x + 3 y = 0$

$- x + 3 y = 9$

Calculation: The equations are,

$2 x + 3 y = 0$ …… (1).

$- x + 3 y = 9$ …… (2).

Draw the graph for both equations. by finding $x$ intercept and $y$ intercept for equation (1) and equation (2).

Calculate the values for $x$ and $y$ from equation (1).

Substitute $0$ for $x$ in equation (1) to get y intercept.

$\begin{matrix} 2 (0) + 3 y = 0 \\ 0 + 3 y = 0 \\ y = 0 \end{matrix}$

The value obtained for $y = 0$ .

Substitute $- 2$ for $y$ in equation (1).

$\begin{matrix} 2 x + 3 (- 2) = 0 \\ 2 x - 6 = 0 \\ 2 x = 6 \\ x = 3 \end{matrix}$

The value obtained for $x$ is 3.

Draw a line passing through the point $(0, 0)$ and $(3, - 2)$ .

Calculate the values for $x$ and $y$ from equation (1)

Substitute $0$ for $x$ in equation (2) to get y intercept.

$\begin{matrix} - 0 + 3 y = 9 \\ 3 y = 9 \\ y = 3 \end{matrix}$

The value obtained for $y$ is $3$

Substitute 0 for $y$ in equation (2) to get $x$ intercept.

$\begin{matrix} - x + 3 (0) = 9 \\ x = - 9 \end{matrix}$

The value obtained for $x$ is $- 9$

Draw a line passing through the point $(0, 3)$ and $(- 9, 0)$ .

Beginning Algebra: Early Graphing (4th Edition), Chapter 4, Problem 1RP

Figure (1)

Figure (1) shows the graph for both equations in which a point $(- 3, 2)$ is the point of intersection.

Conclusion:

Therefore, the intersection point of given equations is $(- 3, 2)$ .

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Answer 4

Question

Chapter 4, Problem 1RP

To determine

The point of intersection by graphing the lines.

Expert Solution & Answer

Answer to Problem 1RP

Solution: The point of intersection for equations is $(- 3, 2)$ .

Explanation of Solution

Given: The equations are,

$2 x + 3 y = 0$

$- x + 3 y = 9$

Calculation: The equations are,

$2 x + 3 y = 0$ …… (1).

$- x + 3 y = 9$ …… (2).

Draw the graph for both equations. by finding $x$ intercept and $y$ intercept for equation (1) and equation (2).

Calculate the values for $x$ and $y$ from equation (1).

Substitute $0$ for $x$ in equation (1) to get y intercept.

$\begin{matrix} 2 (0) + 3 y = 0 \\ 0 + 3 y = 0 \\ y = 0 \end{matrix}$

The value obtained for $y = 0$ .

Substitute $- 2$ for $y$ in equation (1).

$\begin{matrix} 2 x + 3 (- 2) = 0 \\ 2 x - 6 = 0 \\ 2 x = 6 \\ x = 3 \end{matrix}$

The value obtained for $x$ is 3.

Draw a line passing through the point $(0, 0)$ and $(3, - 2)$ .

Calculate the values for $x$ and $y$ from equation (1)

Substitute $0$ for $x$ in equation (2) to get y intercept.

$\begin{matrix} - 0 + 3 y = 9 \\ 3 y = 9 \\ y = 3 \end{matrix}$

The value obtained for $y$ is $3$

Substitute 0 for $y$ in equation (2) to get $x$ intercept.

$\begin{matrix} - x + 3 (0) = 9 \\ x = - 9 \end{matrix}$

The value obtained for $x$ is $- 9$

Draw a line passing through the point $(0, 3)$ and $(- 9, 0)$ .

Beginning Algebra: Early Graphing (4th Edition), Chapter 4, Problem 1RP

Figure (1)

Figure (1) shows the graph for both equations in which a point $(- 3, 2)$ is the point of intersection.

Conclusion:

Therefore, the intersection point of given equations is $(- 3, 2)$ .

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

Answer 5

Chapter 4, Problem 1RP

To determine

The point of intersection by graphing the lines.

Expert Solution & Answer

Answer to Problem 1RP

Solution: The point of intersection for equations is $(- 3, 2)$ .

Explanation of Solution

Given: The equations are,

$2 x + 3 y = 0$

$- x + 3 y = 9$

Calculation: The equations are,

$2 x + 3 y = 0$ …… (1).

$- x + 3 y = 9$ …… (2).

Draw the graph for both equations. by finding $x$ intercept and $y$ intercept for equation (1) and equation (2).

Calculate the values for $x$ and $y$ from equation (1).

Substitute $0$ for $x$ in equation (1) to get y intercept.

$\begin{matrix} 2 (0) + 3 y = 0 \\ 0 + 3 y = 0 \\ y = 0 \end{matrix}$

The value obtained for $y = 0$ .

Substitute $- 2$ for $y$ in equation (1).

$\begin{matrix} 2 x + 3 (- 2) = 0 \\ 2 x - 6 = 0 \\ 2 x = 6 \\ x = 3 \end{matrix}$

The value obtained for $x$ is 3.

Draw a line passing through the point $(0, 0)$ and $(3, - 2)$ .

Calculate the values for $x$ and $y$ from equation (1)

Substitute $0$ for $x$ in equation (2) to get y intercept.

$\begin{matrix} - 0 + 3 y = 9 \\ 3 y = 9 \\ y = 3 \end{matrix}$

The value obtained for $y$ is $3$

Substitute 0 for $y$ in equation (2) to get $x$ intercept.

$\begin{matrix} - x + 3 (0) = 9 \\ x = - 9 \end{matrix}$

The value obtained for $x$ is $- 9$

Draw a line passing through the point $(0, 3)$ and $(- 9, 0)$ .

Beginning Algebra: Early Graphing (4th Edition), Chapter 4, Problem 1RP

Figure (1)

Figure (1) shows the graph for both equations in which a point $(- 3, 2)$ is the point of intersection.

Conclusion:

Therefore, the intersection point of given equations is $(- 3, 2)$ .

Answer 6

Chapter 4, Problem 1RP

To determine

The point of intersection by graphing the lines.

Expert Solution & Answer

Answer to Problem 1RP

Solution: The point of intersection for equations is $(- 3, 2)$ .

Explanation of Solution

Given: The equations are,

$2 x + 3 y = 0$

$- x + 3 y = 9$

Calculation: The equations are,

$2 x + 3 y = 0$ …… (1).

$- x + 3 y = 9$ …… (2).

Draw the graph for both equations. by finding $x$ intercept and $y$ intercept for equation (1) and equation (2).

Calculate the values for $x$ and $y$ from equation (1).

Substitute $0$ for $x$ in equation (1) to get y intercept.

$\begin{matrix} 2 (0) + 3 y = 0 \\ 0 + 3 y = 0 \\ y = 0 \end{matrix}$

The value obtained for $y = 0$ .

Substitute $- 2$ for $y$ in equation (1).

$\begin{matrix} 2 x + 3 (- 2) = 0 \\ 2 x - 6 = 0 \\ 2 x = 6 \\ x = 3 \end{matrix}$

The value obtained for $x$ is 3.

Draw a line passing through the point $(0, 0)$ and $(3, - 2)$ .

Calculate the values for $x$ and $y$ from equation (1)

Substitute $0$ for $x$ in equation (2) to get y intercept.

$\begin{matrix} - 0 + 3 y = 9 \\ 3 y = 9 \\ y = 3 \end{matrix}$

The value obtained for $y$ is $3$

Substitute 0 for $y$ in equation (2) to get $x$ intercept.

$\begin{matrix} - x + 3 (0) = 9 \\ x = - 9 \end{matrix}$

The value obtained for $x$ is $- 9$

Draw a line passing through the point $(0, 3)$ and $(- 9, 0)$ .

Beginning Algebra: Early Graphing (4th Edition), Chapter 4, Problem 1RP

Figure (1)

Figure (1) shows the graph for both equations in which a point $(- 3, 2)$ is the point of intersection.

Conclusion:

Therefore, the intersection point of given equations is $(- 3, 2)$ .

Answer 7

Chapter 4, Problem 1RP

To determine

The point of intersection by graphing the lines.

Answer 8

Expert Solution & Answer

Answer to Problem 1RP

Solution: The point of intersection for equations is $(- 3, 2)$ .

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

Explanation of Solution

Given: The equations are,

$2 x + 3 y = 0$

$- x + 3 y = 9$

Calculation: The equations are,

$2 x + 3 y = 0$ …… (1).

$- x + 3 y = 9$ …… (2).

Draw the graph for both equations. by finding $x$ intercept and $y$ intercept for equation (1) and equation (2).

Calculate the values for $x$ and $y$ from equation (1).

Substitute $0$ for $x$ in equation (1) to get y intercept.

$\begin{matrix} 2 (0) + 3 y = 0 \\ 0 + 3 y = 0 \\ y = 0 \end{matrix}$

The value obtained for $y = 0$ .

Substitute $- 2$ for $y$ in equation (1).

$\begin{matrix} 2 x + 3 (- 2) = 0 \\ 2 x - 6 = 0 \\ 2 x = 6 \\ x = 3 \end{matrix}$

The value obtained for $x$ is 3.

Draw a line passing through the point $(0, 0)$ and $(3, - 2)$ .

Calculate the values for $x$ and $y$ from equation (1)

Substitute $0$ for $x$ in equation (2) to get y intercept.

$\begin{matrix} - 0 + 3 y = 9 \\ 3 y = 9 \\ y = 3 \end{matrix}$

The value obtained for $y$ is $3$

Substitute 0 for $y$ in equation (2) to get $x$ intercept.

$\begin{matrix} - x + 3 (0) = 9 \\ x = - 9 \end{matrix}$

The value obtained for $x$ is $- 9$

Draw a line passing through the point $(0, 3)$ and $(- 9, 0)$ .

Beginning Algebra: Early Graphing (4th Edition), Chapter 4, Problem 1RP

Figure (1)

Figure (1) shows the graph for both equations in which a point $(- 3, 2)$ is the point of intersection.

Conclusion:

Therefore, the intersection point of given equations is $(- 3, 2)$ .

Answer 12

Ch. 4.1 - Prob. 1E Ch. 4.1 - Prob. 2E Ch. 4.1 - Prob. 3E Ch. 4.1 - Prob. 4E Ch. 4.1 - Prob. 5E Ch. 4.1 - Prob. 6E Ch. 4.1 - Prob. 7E Ch. 4.1 - Prob. 8E Ch. 4.1 - Prob. 9E Ch. 4.1 - Prob. 10E

The point of intersection by graphing the lines.

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The point of intersection by graphing the lines.

Answer to Problem 1RP

Explanation of Solution

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