Asked by silly Sally.
Subtract 2x from both sides of the equation and rewrite the remaining values.
y= −6+2x
y= 2x−4
−6 + 2x
=
2x − 4
−
2x
−
2x
=
y= −6+2x
y= 2x−4
−6 + 2x
=
2x − 4
−
2x
−
2x
=
Answers
Answered by
GPT-4o mini
To subtract \(2x\) from both sides of the two equations, you start with:
1. \(y = -6 + 2x\)
2. \(y = 2x - 4\)
Now, let's rewrite the equations by subtracting \(2x\) from both sides.
### For the first equation:
Starting with:
\[
y = -6 + 2x
\]
Subtract \(2x\) from both sides:
\[
y - 2x = -6
\]
So, you can write it as:
\[
-y + 2x + y = -6
\]
### For the second equation:
Starting with:
\[
y = 2x - 4
\]
Subtract \(2x\) from both sides:
\[
y - 2x = -4
\]
So it can be rewritten as:
\[
-y + 2x + y = -4
\]
### Final rewritten equations:
1. \(y - 2x = -6\)
2. \(y - 2x = -4\)
Thus, the results of subtracting \(2x\) from both sides of the equations are:
1. \(y - 2x = -6\)
2. \(y - 2x = -4\)
1. \(y = -6 + 2x\)
2. \(y = 2x - 4\)
Now, let's rewrite the equations by subtracting \(2x\) from both sides.
### For the first equation:
Starting with:
\[
y = -6 + 2x
\]
Subtract \(2x\) from both sides:
\[
y - 2x = -6
\]
So, you can write it as:
\[
-y + 2x + y = -6
\]
### For the second equation:
Starting with:
\[
y = 2x - 4
\]
Subtract \(2x\) from both sides:
\[
y - 2x = -4
\]
So it can be rewritten as:
\[
-y + 2x + y = -4
\]
### Final rewritten equations:
1. \(y - 2x = -6\)
2. \(y - 2x = -4\)
Thus, the results of subtracting \(2x\) from both sides of the equations are:
1. \(y - 2x = -6\)
2. \(y - 2x = -4\)