Question

How do I use a graph to solve the solution of the system of equations `y=−2x+4` and `y=−2x−3`?

Answer 1

Graph your equations and check where they intersect.
If they do intersect, you have a solution.

If not, the system of equations do not have a solution. For linear equations, this happens when the lines are parallel (i.e. they have the same slope)

For your system of equations

`y = -2x + 4`
`y = -2x - 3`

One look and we know that your equations have the same slope.
Your system of equations do not have a solution.

But if your graph is not accurate enough, it will be hard to know the actual answer.

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Let's try to answer your system of equations algebraically.

`y = -2x + 4`
`y = -2x - 3`

Isolate one variable in one of the equations and substitute its equivalent to the other equation.

For your system of equations, `y` is already is already isolated.
Let's substitute the first into the next equation

`y = -2x + 4`
`y = -2x - 3`

`=> -2x + 4 = -2x -3`
`=> -2x + 4 + 2x = -3`
`=> 4 = -3`

Since `4 != 3`, your system of equations do not have a solution