Question: Two lines are defined by $ y = (2m - 1)x + 3 $ and $ y = (m + 2)x - 4 $. If the lines intersect at a point where the $ x $-coordinate is $ -2 $, what is the value of $ m $? - AIKO, infinite ways to autonomy.

Understanding the Context

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The Problem: Two Lines, Shared Intersection

Key Insights

We start with two linear equations defined by:

• Line A: $ y = (2m - 1)x + 3 $
• Line B: $ y = (m + 2)x - 4 $

These lines intersect at $ x = -2 $. At the point of intersection, both equations yield the same $ y $-value—for that specific $ x $. Substituting $ x = -2 $ into both equations allows us to solve for $ m $ by equating the resulting expressions.

Step-by-Step: Finding $ m $ Safely

Begin by evaluating each line at $ x = -2 $:

Final Thoughts

For Line A:
$ y = (2m - 1)(-2) + 3 $
$ y = -2(2m - 1) + 3 $
$ y = -4m + 2 + 3 $
$ y = -4m + 5 $

For Line B:
$ y = (m + 2)(-2) - 4 $
$ y = -2(m + 2) - 4 $
$ y = -2m - 4 - 4 $
$ y = -2m - 8 $

Since both lines share the same $ y $-value at $ x = -2 $, set the expressions equal:
$ -4m + 5 = -2m - 8 $

Now solve:
Add $ 4m $ to both sides:
$ 5 = 2m - 8 $

Add