In a system of linear equations in two variables, if the graphs of the equations are the same, the equations are (blank) equations.

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asked Feb 24, 2021 85.6k views

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Akash Sethi · Answer 1 · 2021-03-02T03:41:24+0000

Answer:

Please check the explanation.

Explanation:

We know that when a consistent system has infinite solutions, then the graphs of the equations are exactly the same. In other words, these equations are called dependent equations.

All points of dependent equations share the same slope and same y-intercept.

For example,

6x-2y = 18

9x-3y=27

represent the dependent equations.

Writing both equations in slope-intercept form

y=mx+c

where m is the slope and c is the y-intercept

Now

6x-2y=18

2y = 6x-18

Divide both sides by 2

y = 3x - 9

Thus, the slope = 3 and y-intercept = b = -9

now

9x-3y=27

3y = 9x-27

Divide both sides by 3

y = 3x - 9

Thus, the slope = 3 and y-intercept = b = -9

Therefore, both equations have the same slope and y-intercept. Their graphs are the same. Hence, they are called dependent equations.

In a system of linear equations in two variables, if the graphs of the equations are the same, the equations are (blank) equations.

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In a system of linear equations in two​ variables, if the graphs of the equations are the​ same, the equations are (blank) equations.

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In a system of linear equations in two variables, if the graphs of the equations are the same, the equations are (blank) equations.