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5.1 day 1: Antiderivatives and Slope Fields

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1 5.1 day 1: Antiderivatives and Slope Fields
Greg Kelly, Hanford High School, Richland, Washington

2 First, a little review: Consider: or then: It doesn’t matter whether the constant was 3 or -5, since when we take the derivative the constant disappears. However, when we try to reverse the operation: Given: find We don’t know what the constant is, so we put “C” in the answer to remind us that there might have been a constant.

3 If we have some more information we can find C.
Given: and when , find the equation for . This is called an initial value problem. We need the initial values to find the constant. An equation containing a derivative is called a differential equation. It becomes an initial value problem when you are given the initial condition and asked to find the original equation.

4 Initial value problems and differential equations can be illustrated with a slope field.
Slope fields are mostly used as a learning tool and are mostly done on a computer or graphing calculator, but a recent AP test asked students to draw a simple one by hand.

5 1 2 3 1 2 1 1 2 2 4 -1 -2 -2 -4 Draw a segment with slope of 2.
Draw a segment with slope of 2. 1 2 3 1 2 Draw a segment with slope of 0. 1 1 2 Draw a segment with slope of 4. 2 4 -1 -2 -2 -4

6 If you know an initial condition, such as (1,-2), you can sketch the curve.
By following the slope field, you get a rough picture of what the curve looks like. In this case, it is a parabola.

7 For more challenging differential equations, we will use the calculator to draw the slope field.
On the TI-89: Push MODE and change the Graph type to DIFF EQUATIONS. MODE Go to: Y= Press and make sure FIELDS is set to SLPFLD. I Go to: and enter the equation as: Y= (Notice that we have to replace x with t , and y with y1.) (Leave yi1 blank.)

8 Set the viewing window: WINDOW Then draw the graph: GRAPH

9 Be sure to change the Graph type back to FUNCTION when you are done graphing slope fields.

10 Integrals such as are called definite integrals because we can find a definite value for the answer.
The constant always cancels when finding a definite integral, so we leave it out!

11 Integrals such as are called indefinite integrals because we can not find a definite value for the answer. When finding indefinite integrals, we always include the “plus C”.

12 To find the indefinite integral on the TI-89, use:
The calculator will return: Notice that it leaves out the “+C”. Use and to put this expression in the screen, and then plot the graph. COPY PASTE Y=

13 [-10,10] by [-10,10] p


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