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Equations of Lines: Calculating Slope and Writing Linear Functions
- 1. SLOPES AND EQUATIONS OF LINES
- 2. SLOPE Slope is the rate of change of a straight line (linear) graph/function. What are some of the things we have learned about slope so far? Can you come up with an equation to calculate slope? Image From: http://www.mathwarehouse.com/algebra/linear_equation/slope-of-a-
- 3. SLOPE CONT. Positive slopes mean the graph is going up from left to right Negative slopes mean the graph is going down from left to right The steeper the line the bigger the slope (rate of change) Image From: http://www.sparknotes.com/math/algebra1/writingequations/section1.rhtml Image From:
- 4. HOW TO CALCULATE SLOPE… To calculate a slope from a graph or two coordinate points we use the formula: Image From: http://math.about.com/od/allaboutslope/ss/Find-Slope-With-Formula-
- 5. FINDING SLOPE • Use the slope formula to find the slope of the given examples. 1. (-2, 5) and (4, 12) 2. Image From: https://www.mathscore.com/math/skills/DetSlope.html
- 6. SLOPE VIDEOS Graphical Example for Slope of a Line Example of Finding Slope given Two Points Video From: Khan Academy
- 7. LINEAR FUNCTIONS Linear Functions are functions whose graphs are straight lines. They are straight because their rate (slope) is constant. There are 3 forms of a linear function. • Slope-Intercept Form • Standard Form • Point-Slope Form
- 8. SLOPE-INTERCEPT FORM It is slope-intercept form because the y (or dependent variable) is by itself and the highest exponent of x (or independent variable) is 1. The slope is always the value with the x in THIS FORM. It could be written y = b + mx. Image From: http://bronxarena.org/mobile/courses/algebrab/challenge1/1.5.html
- 9. EXAMPLES Write the equation of the line in slope-intercept form. 1. 2. 3. m= 1/5 b = -2 4. y-intercept = 200 slope = -23.724 Image From: http://hotmath.com/help/gt/genericalg1/section_9_2.html Image From: http://www.mathsteacher.com.au/year8/ch15_graphs/04_plot/graphs.htm
- 10. SPECIAL CASES Horizontal Lines have a slope of 0. Therefore, we cannot write a slope-intercept equation for them. Horizontal lines intersect the y-axis. Therefore, the equation for a horizontal line just states what that y-value is. Vertical lines have an undefined slope. Therefore, we cannot write a slope-intercept equation for them, either. • Instead, we notice that the coordinate points of a vertical all have the same x-value. • So, the equation for a vertical line just states what that x-value is.
- 11. SLOPE-INTERCEPT VIDEO Slope-Intercept Equation Video From: Khan Academy
- 12. LINEAR STANDARD FORM This is another form for writing a linear function. It is used to represent situations where two variables are changing at a constant rate. In this form, the A, B, and C do not represent the y-intercept or the slope of the graph. It is also important to understand that in many cases standard form is only written using integers (+/- whole numbers) for A, B, and C. It is possible for A, B, and C to be zero but it cannot be both A and B.
- 13. WHICH EQUATIONS ARE IN LINEAR STANDARD FORM? Linear Standard Form -2x – 4y = 9 X=2 Y=1 Not Linear Standard Form 1/3x – 7y = 12 y = -1/2x + 3 y – 4 = 2(x + 5) 8 = 2.5x – 3y 10 = -3xy 4x + 3y = 20
- 14. STANDARD FORM VIDEOS Standard Form Equations Video From: Khan Academy
- 15. POINT-SLOPE FORM • We use point-slope form when we have a point and a slope of a line Image From:
- 16. POINT-SLOPE VIDEO Ideas Behind Point-Slope Form Point-Slope Form Examples
- 17. WRITE A POINT-SLOPE EQUATION 1. (2, 5) and m = ½ 1. (-8, 12) and slope = -3 1. (-6, 0) and m = 8 1. Point: (-1, -6) and Point: (-3, 4) 5.