Linear Equations in Two Variables: A Comprehensive Guide for Students, Schemes and Mind Maps of Linear Algebra

Note: To be a linear equation the exponent on each variable (y and x) must be the first power (exponent of 1). To graph a linear equation: (1) Choose some ...

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Linear Equations in Two Variables
To graph an equation of the form bmxy +=
Any equation of the form , where m and b are constants is a linear equation in two variables (y and
x). The graph is a straight line.
bmxy +=
Examples of linear equations:
xy
xy
xy
xy
21
2
1
5
23
โˆ’=
โˆ’=
โˆ’=
+=
Note: To be a linear equation the exponent on each variable (y and x) must be the first power (exponent of 1).
To graph a linear equation:
(1) Choose some values for x and then find the corresponding values for y.
(2) Next plot these points on your graph
(3) Connect the points with a straight line.
Example: Graph 13โˆ’= xy
First, we must find some points by choosing values for x
x
13 โˆ’= xy y (x,y)
- 1
()
113 โˆ’โˆ’=
y -4 (-2,-4)
0
()
103 โˆ’=
y -1 (0,-1)
2
()
123 โˆ’=
y 5 (2,5)
Next, we will plot these points and draw our line
Math0301
Student Learning Assistance Center - San Antonio College
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Linear Equations in Two Variables

To graph an equation of the form y = mx + b

Any equation of the form , where m and b are constants is a linear equation in two variables (y and

x). The graph is a straight line.

y = mx + b

Examples of linear equations:

y x

y x

y x

y x

Note: To be a linear equation the exponent on each variable (y and x) must be the first power (exponent of 1).

To graph a linear equation:

(1) Choose some values for x and then find the corresponding values for y.

(2) Next plot these points on your graph

(3) Connect the points with a straight line.

Example: Graph y = 3 x โˆ’ 1

First, we must find some points by choosing values for x

x y = 3 x โˆ’ 1 y (x,y)

- 1 y = 3 ( โˆ’ 1 ) โˆ’ 1 -4 (-2,-4)

0 y = 3 ( ) 0 โˆ’ 1 -1 (0,-1)

2 y = 3 ( ) 2 โˆ’ 1 5 (2,5)

Next, we will plot these points and draw our line

To graph an equation of the form Ax + By = C

The equation , where A, B, and C are constants is also a linear equation because the exponents for

x and y are the first power (1). Ax + By = C is known as the standard form of a linear equation.

Ax + By = C

When trying to graph these equations, it is helpful to first solve the equation for y. Once you have the equation

solved for y, then you can follow the same steps in graphing the equation as previously shown.

Example: Graph 3 x + 4 y = 12

The first step is to solve our equation for y.

3 + (^4) First subtract โ€œ3xโ€ from both sides

Next divide each term by โ€œ4โ€

y x

y x

y x

x y x x

x y

The graph of a linear equation with one of the variables (x or y) missing is either a horizontal line or a vertical

line.

If โ€œxโ€ is missing, our equation will be a horizontal line in the form of. This is because no matter

what value โ€œxโ€ is the value for โ€œyโ€ will always be โ€œbโ€.

y = b

If โ€œyโ€ is missing, our equation will be a vertical line in the form of. This is because no matter

what value โ€œyโ€ is the value for โ€œxโ€ will always be โ€œaโ€.

x = a