The process of ascertaining whether a point is a solution involves replacing the point's coordinates into a mathematical equation. If the equation holds true following the replacement, we can consider the point as a solution. Conversely, if the equation does not hold, the point is not a solution. This is a critical principle in the fields of algebra and analytic geometry.
| Topic | Problem | Solution |
|---|---|---|
| None | Consider the inequality \(2x - 3 > 5\). Determine… | Step 1: Substitute the given point \(x = 5\) into the inequality: \(2*5 - 3 > 5\) |