Lines (§2.3)

Points and slopes

• m = (y₂ − y₁) ÷ (x₂ − x₁).

• The first point is (x₁, y₁), and the second point is (x₂, y₂).
• The rise is y₂ − y₁, which is how much you move up; the rise is negative if you actually move down.
• The run is x₂ − x₁, which is how much you move to the right; the run is negative if you actually move to the left.
• The slope is the rise divided by the run, which is usually denoted by m; it is the same for any two distinct points on the same line.

The slope describes the directions in which you can travel along the line.

• Lines with positive slope run up–right and down–left; lines with negative slope run down–right and up–left.
• Lines whose slope has a large absolute value are steep; lines whose slope has a small absolute value are shallow.
• Horizontal lines have a slope of exactly zero; vertical lines have a slope which is undefined (which you can think of as an infinite slope).

Slopes and equations

• y = mx + b.

• The slope is the number m.
• The y-intercept is (0, b).
• The variables x and y stay in the equation.

If you don't know the y-intercept, you can still use this equation if you know one of the points; plug it in for x and y, and solve for b. Or use this optional formula:

• y = m(x − x₁) + y₁.

Conversely, if you have an equation for the line, then solve it for y; you now know what the slope and y-intercept are. It's easy to draw a graph using any point and the slope.

Vertical lines

If a is the x-coordinate of any point, then the equation for a vertical line is always simply:

• x = a.

Parallel and perpendicular lines

• Parallel lines: m₁ = m₂.
• Perpendicular lines: m₁m₂ = −1, or m₂ = −1/m₁.

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