The process of figuring out parallel lines is about pinpointing two or more lines that will never cross each other, no matter how long they extend. These lines always keep the same distance from each other because they have identical slope values. If we're looking at a coordinate plane, we can say that lines are parallel if they have matching slope (m) values, but different y-intercepts (b).
Topic | Problem | Solution |
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None | Given the linear equations \(2x + 3y = 6\) and \(… | Step 1: Convert both equations into slope-intercept form (\(y = mx + b\)), where \(m\) represents t… |