How to use Double Augmented Matrix to solve 2 Equations

What double augmented matrix should be used in elimination to solve both equations at once?

Solve both of these equations by working on a 2 by 4 Matrix:

1) | 1 4 | | x |....| 1 |

....| 2 7 | | y | = | 0 |

2) | 1 4 | | u |....| 0 |

....| 2 7 | | v | = | 1 |

Note: Both have the same matrix, A.

Also, don't mind the periods. I used them for the sake of formatting the matrices.

**I don't get how the person came up with the EAx part from Yahoo Answers:**

So the question asks you to combine both questions into a single 2x4 matrix, so it would look like:

|1 4 1 0| = Ax

|2 7 0 1|

Now you need to come up with an elimination matrix to solve for u, v, x, and y simultaneously. So first we will solve for the 2 bottom variables (y and v, respectively) first.

**EAx** = | 1 0| |1 4 1 0| = |1 4 1 0|

|-2 -1| |2 7 0 1| |0 1 2 -1|

This gives us y=2 and v=-1. Now we solve for the top variables (x and u).

|1 -4| |1 4 1 0| = |1 0 -7 4|

|0 1| |0 1 2 -1| |0 1 2 -1|

So now we have:

|x u| = |-7 4|

|y v| |2 -1|

However, the question asks what double augmented matrix we are using in elimination. To get our final answer, we simply multiply the two elimination matrixes we used together.

| 1 0| |1 -4| = | 1 -4|

|-2 -1| |0 1| |-2 -1|

I hope this helped :)

Any help would greatly be appreciated. Thanks.