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6-1 Rate of Change and Slope. Definitions An independent variable can take any value, independent of any other variable. (usually “x”) A dependent variable.

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Presentation on theme: "6-1 Rate of Change and Slope. Definitions An independent variable can take any value, independent of any other variable. (usually “x”) A dependent variable."— Presentation transcript:

1 6-1 Rate of Change and Slope

2 Definitions An independent variable can take any value, independent of any other variable. (usually “x”) A dependent variable depends on the independent variable to take on a value. (usually “y”) A rate of change allows you to see the relationship between two values that are changing and is calculated by

3 Definitions An independent variable can take any value, independent of any other variable. (usually “x”) A dependent variable depends on the independent value to take on a value. (usually “y”) A rate of change allows you to see the relationship between two values that are changing and is calculated by

4 Example of R.O.C. Number of DaysRental Charge 1$200 2$225 3$250 4$275 Using the table of rental car charges below, find the rate of change using days 2 and 4 The charge “depends” on the number of days.

5 Example of R.O.C. Number of DaysRental Charge 1$200 2$225 3$250 4$275 Using the table of rental car charges below, find the rate of change using days 2 and 4

6 Example of R.O.C. Number of DaysRental Charge 1$200 2$225 3$250 4$275 Using the table of rental car charges below, find the rate of change using days 2 and 4

7 Example of R.O.C. Number of DaysRental Charge 1$200 2$225 3$250 4$275 Using the table of rental car charges below, find the rate of change using days 2 and 4 $25 per day

8 Lines The rate of change of a line graphed in the coordinate plane is called the slope of the line.

9 Lines The rate of change of a line graphed in the coordinate plane is called the slope of the line.

10 Lines The rate of change of a line graphed in the coordinate plane is called the slope of the line.

11 Lines The rate of change of a line graphed in the coordinate plane is called the slope of the line. Since y-y would be confusing, we need a way to distinguish between them so we use y 1 and y 2

12 Lines The rate of change of a line graphed in the coordinate plane is called the slope of the line. Since y-y would be confusing, we need a way to distinguish between them so we use y 1 and y 2

13 Example of Slope Find the slope of the line that goes through (-3,1) and (6,-4) x 1 y 1 x 2 y 2

14 Example of Slope Find the slope of the line that goes through (-3,1) and (6,-4) x 1 y 1 x 2 y 2

15 Example of Slope Find the slope of the line that goes through (-3,1) and (6,-4) x 1 y 1 x 2 y 2

16 Example of Slope Find the slope of the line that goes through (-3,1) and (6,-4) x 1 y 1 x 2 y 2

17 Example of Slope Find the slope of the line that goes through (-3,1) and (6,-4) x 1 y 1 x 2 y 2

18 Example of Slope Find the slope of the line that goes through (-3,1) and (6,-4) x 1 y 1 x 2 y 2

19 Example of Slope Find the slope of the line that goes through (-3,1) and (6,-4) x 1 y 1 x 2 y 2

20 Slopes of Lines positive slope negative slope zero slope y = # undefined no slope x = #

21 Today’s Assignment P. 312 #1-39 odds

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