SLOPE

SLOPE

SLOPE • Slope is the “tilt” of the line. • Slope is the “slant” of the line. zero slope Positive slope Positive correlation Negative slope Negative correlation undefined slope

SLOPE • Slope is the steepness of the “slant” of the line. • Slope is the steepness of a mountain side. • Slope is the steepness of a wheelchair ramp. • Slope is the steepness of a flight of stairs. • Slope is the steepness of a plane’s decent. • Slope is the steepness of a ski run. • Slope is steepness of a skate board ramp.

SLOPE • These different slopes can be measured and represented mathematically with a ratio. • This ratio can be found by going from one point on the line to another point by counting the vertical change and the horizontal change. • This ratio or slope is sometimes called the rise (vertical change) over the run (horizontal change).

5 3 Let’s investigate the steepness of this mountain slope. #1) Pick two points on the side of the mountain. #2) Draw an imaginary grid. #3) Count vertically and then horizontally from one point to the other. 1 2 3 4 5 vertically horizontally 1 2 Slope = 3

5 3 SLOPE There are different names for the slope ratio. 5 vertical change = horizontal change 3 5 rise = run 3 5 change in y = Slope = change in x 3

Slope = - Slope = 5 3 5 3 Let’s look at the “sign” of the slope or the correlation. “Going up the mountain.” positive slope “Going down the mountain.” negative slope

Counting Slope Negative Slope Positive Slope Counting up … rise and right … run Counting up … rise and left … run Counting down… rise and left … run Counting down… rise and right … run + / + = + -/- = + +/ - = - -/ + = -

Slope= + 3 5 Finding slope on the coordinate plane. +5 y 1) Plot points (2, 4) 2) Draw line +3 3) Count - - vertically (-3, 1) x 4) Count - - horizontally 5) Write slope - as a ratio

+4 -6 -2 3 Finding slope on the coordinate plane. y 1) Plot points 2) Draw line -6 3) Count - - vertically (-1, 2) +4 x 4) Count - - horizontally 5) Write slope - as a ratio Slope= = (5, -2)

Find slope algebraically when given two points Point 1: (x1, y1) Point 2: (x2, y2) difference between the y coordinates difference between the x coordinates Slope=

- 4 6 - 2 3 Find slope algebraically when given two points Point 1: (-1, 2) Point 2: (5, -2) difference between the y coordinates difference between the x coordinates Slope= -2 - 2 5 - -1 m= = =

Example 1: • Find the slope of the line containing the points (6, 7) and (8, 3) • Remember each ordered pair is (x, y) • Write slope formula • Substitute into slope formula • Subtract the y coordinates • Subtract the x coordinates m = -2

Example 2: • Find the slope of a line containing (-3, 6) and (-12, -9)

4 1 Example 3: Through the given point, (-4, -2), graph the line with a slope of 4. y 1) Plot point 2) Count slope +1 a) Count - - vertically (-3, 2) b) Count - - horizontally +4 x m= + 5) Plot new . point (-4, -2) 6) Draw line

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SLOPE

SLOPE

Presentation Transcript

Slope

Slope

Slope

SLOPE

SLOPE

SLOPE

Slope

 !!! Slope !!! 

Slope

Slope

SLOPE

Slope

Slope

Slope

SLOPE

Slope!!!

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slope

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