Final answer:
The system of equations provided appears to have typos but seems to request solving two algebraic equations. By isolating y and substituting into the first equation, the solution is found with x = 5.25 and y = 2.
Step-by-step explanation:
The question you have provided appears to be incomplete and slightly confusing due to the presence of typos or irrelevant parts. Nevertheless, I will address what seems to be the main request: solving the system of equations algebraically. The system appears to be:
- -4x + 6y = -9
- + 2y = 4
To solve it, follow these steps:
- Begin by isolating y in the second equation: 2y = 4 can be simplified to y = 2.
- Next, substitute y = 2 into the first equation: -4x + 6(2) = -9, simplifying to -4x + 12 = -9.
- Now solve for x: -4x = -9 - 12, which simplifies to -4x = -21. Finally, divide both sides by -4 to find x = 21/4 or 5.25.
- You now have solved the system with the solutions x = 5.25 and y = 2.
This process demonstrates how to solve the simultaneous equations for the unknowns x and y.