Question: Find the intersection point of the lines $ 3x - 2y = 6 $ and $ x + 4y = 10 $. - RTA

Understanding the Context

Why This Linear Problem Is More Relevant Than Expected

Digital tools, dashboards, and analytics platforms rely heavily on coordinate systems to map relationships between variables. When two linear equations—like $ 3x - 2y = 6 $ and $ x + 4y = 10 $—converge, they pinpoint a unique solution expressing balance between competing factors. This isn’t just algebra; it’s a foundational concept behind predictive modeling, graphing market trends, and optimizing resource allocation.

Interest in spatial relationships has increasingly shifted online, especially among professionals using data visualization tools. Users seeking clarity in multidimensional problems now turn to clear, accessible explanations to interpret intersections not as abstract points, but as actionable insights.

Key Insights

How to Find the Intersection: A Step-by-Step Breakdown

Solving a system of linear equations means locating the single point $(x, y)$ that satisfies both equations simultaneously. Here’s how the process unfolds in a clear, user-friendly way:

Start with the two equations:

1. $ 3x - 2y = 6 $
2. $ x + 4y = 10 $

Using substitution or elimination, express one variable in terms of the other. Start by solving Equation 2 for $ x $:
$ x = 10 - 4y $

Final Thoughts

Now substitute this into Equation 1:
$ 3(10 - 4y) - 2y = 6 $
Expand:
$ 30 - 12y - 2y = 6 $
Combine terms:
$ 30 - 14y = 6 $
Subtract 30:
$ -14y = -24 $
Divide:
$ y = \frac{24}{14} = \frac{12}{7} $

Now plug $ y = \frac{12}{7} $ back into $ x = 10 - 4y $:
$ x = 10 - 4\left(\frac{12}{7}\right) = 10 - \frac{48}{7} = \frac{70 - 48}{7} = \frac{22}{7} $

Thus, the intersection point is $ \left( \frac{22}{7}, \frac{12}{7} \right) $ — a precise, pocket-friendly solution anyone can visualize.

Real-World Questions About Finding This Intersection

People aren’t just solving equations—they’re seeking practical takeaways. Frequent follow-up questions include: