Answer:
6x + 2y = 8
Explanation:
If a system of equations has an infinite number of solutions, it is called consistent dependent.
The equations of both lines will have the same slope and same y-intercept. If the two lines have the same y-intercept and the slope, they are actually in the same exact line.
Therefore, simply multiply all components of the given equation by 2 to create a second equation with the same slope and y-intercept:
6x + 2y = 8
Proof
Rearrange 6x + 2y = 8 to make y the subject:
⇒ 2y = 8 - 6x
⇒ y = 4 - 3x
And rearrange the original equation 3x + y = 4 to make y the subject:
⇒ y = 4 - 3x
So we can see that both equations rearrange to make the same equation, which means the solution to this systems of equations will give infinitely many solutions.