1. Writing Equations of a Line

2. Various Forms of an Equation of a Line. Slope-Intercept Form

3. Write an equation given the slope and y-intercept EXAMPLE 1 Write an equation of the line shown.

4. SOLUTION Write an equation given the slope and y-intercept EXAMPLE 1 From the graph, you can see that the slope is m = and the y- intercept is b = –2. Use slope-intercept form to write an equation of the line. 3 4 y = mx + b Use slope-intercept form. y = x + (–2) 3 4 Substitute for m and –2 for b. 3 4 y = x (–2) 3 4 Simplify.

5. Write an equation given the slope and a point EXAMPLE 2 Write an equation of the line that passes through (5, 4) and has a slope of –3. Because you know the slope and a point on the line, use point-slope form to write an equation of the line. Let (x 1, y 1 ) = (5, 4) and m = –3. y – y 1 = m(x – x 1 ) Use point-slope form. y – 4 = –3(x – 5) Substitute for m, x 1, and y 1. y – 4 = –3x + 15 Distributive property SOLUTION y = –3x + 19 Write in slope-intercept form.

6. EXAMPLE 3 Write an equation of the line that passes through (–2,3) and is (a) parallel to, and (b) perpendicular to, the line y = –4x + 1. SOLUTION a. The given line has a slope of m 1 = –4. So, a line parallel to it has a slope of m 2 = m 1 = –4. You know the slope and a point on the line, so use the point- slope form with (x 1, y 1 ) = (–2, 3) to write an equation of the line. Write equations of parallel or perpendicular lines

7. GUIDED PRACTICE for Examples 2 and 3 GUIDED PRACTICE 4. Write an equation of the line that passes through (–1, 6) and has a slope of 4. y = 4x + 10 5. Write an equation of the line that passes through (4, –2) and is (a) parallel to, and (b) perpendicular to, the line y = 3x – 1. y = 3x – 14 ANSWER

8. Write an equation given two points EXAMPLE 4 Write an equation of the line that passes through (5, –2) and (2, 10). SOLUTION The line passes through (x 1, y 1 ) = (5,–2) and (x 2, y 2 ) = (2, 10). Find its slope. y 2 – y 1 m =m = x 2 – x 1 10 – (–2) = 2 – 5 12 –3 == –4