Question

1. # Y = X – 6 X = –4 What Is The Solution To The System Of Equations? (–8, –4) (–4, –8) (–4, 4) (4, –4)

## Introduction

If you’re in algebra class, then you know solving systems of equations can be a daunting task. Whether you’re working on a homework assignment or studying for an upcoming exam, it’s always helpful to have multiple methods for solving these types of problems. That being said, this blog post will discuss the specific system of equations Y = X – 6 and X = –4 and how to find the solution for each. We will also cover different methods for solving such equations as well as tips and tricks to make the process easier.

## The Solution to the System of Equations

It can be seen that the system of equation has no solution. All the equations are the same, so any value of x and y would make all the equations true.

## How to Solve for X and Y

There is no one definitive way to solve for X and Y. However, there are a few methods that are commonly used:

– Substitution: This method involves solving one equation for one of the variables (usually X) and then substituting that variable into the other equation. This will allow you to solve for the remaining variable.

– Elimination: This method involves adding or subtracting the equations in such a way that one of the variables cancels out. This will allow you to solve for the remaining variable.

– Graphing: This method involves plotting the equations on a graph and then finding the point of intersection. This will give you the coordinates of the solution (X,Y).

## The Solution Set

There are four possible solutions to the system of equations:

(-1, -1), (-1, 1), (1, -1), (1, 1)

## Conclusion

To solve a system of equations, we must first identify the two equations, then isolate one variable in each equation so that they can be solved simultaneously. We found the solution to our system of equations to be –4 for both x and y. This means that the solution (–4, –4) is correct from the given options. With some practice, solving a system of equations becomes quite simple – but always remember to double-check your work!