To solve this problem you must apply the proccedure shown below:
1- You have the following equation given in the problem above:
[tex] 4x-6y=-12 [/tex]
2- You can write as two different parametric equations:
A) - Solve for [tex] y [/tex]:
[tex] 4x-6y=-12\\6y=12+4x\\ y=\frac{12+4x}{6} [/tex]
- Write [tex] x=t [/tex] and substitute it into the equation above:
[tex] y=\frac{12+4t}{6} [/tex]
B) - Sove for [tex] x [/tex]:
[tex] x=\frac{6y-12}{4} [/tex]
- When you substitute [tex] y=t [/tex] into the equation above, you obtain:
[tex] x=\frac{6t-12}{4} [/tex]
The answer is: [tex] x=t; y=\frac{12+4t}{6} \\ y=t; x=\frac{6t-12}{4} [/tex]
