Section 3-7 Equations of Lines in the Coordinate Plane Michael Schuetz.

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3.7 Equations of Lines in the Coordinate Plane

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Presentation transcript:

Section 3-7 Equations of Lines in the Coordinate Plane Michael Schuetz

Key Concepts DefinitionSymbols Slope – the ratio of vertical change (rise) to the horizontal change (run) between any two points. Slope-intercept Form – an equation of a nonvertical line that uses a slope and y-intercept. Point-slope Form – an equation of a nonvertical line that uses a slope and a point. slopey-interceptslopey-coordinatex-coordinate

Slope of a nonvertical line through the points (x 1, y 2 ) and (x 2, y 2 ) y x O

Ex. 1: Find the slope of the line through the points. 1. (-1, 0) & (3, -5)2. (1, 2) & (-3, 8) 3. (3, -2) & (-2, 5) 4. (2, 4) & (5, 6)

Types of slopes Positive Negative Zero Undefined

Slope-intercept Form  An equation written in the form: y = mx + b  Easy to find the slope and the y-intercept of the line. slope = y-intercept = m b

Find the slope and y-intercept and graph the line.

Examples, Find the slope and y-intercept. 1)2) 3) _____ _____ ____ ______ _____ ______ m b m b m b 4) 5) 6) _____ _____ _____ ______ _____ ______ m b m b m b

Find an equation of a line that passes through the point ( 7, 1) and has the slope 2/3 Use the equation: 1) Substitute the slope and the values for x and y from the given point. Point-Slope Form

Find an equation of a line that passes through the points (-3, 6) and ( 5, 0) Use the equation: 1)Find the slope: 2)Substitute the slope and one of the points into the equation. Examples:

Use the point slope form of a line to find an equation of a line that passes through points (6, 4) and (2, 8) Example:

HW: p. 194 #’s 8-34 even, 44, 45