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Clicker Question 1 Suppose y = (x 2 – 3x + 2) / x. Then y could be: – A. 2x – 3 – B. ½ x 2 – 3x + 2 – C. ½ x 2 – 3x + 2 ln(x) + 7 – D. ½ x 2 – 3 + 2 ln(x)

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Presentation on theme: "Clicker Question 1 Suppose y = (x 2 – 3x + 2) / x. Then y could be: – A. 2x – 3 – B. ½ x 2 – 3x + 2 – C. ½ x 2 – 3x + 2 ln(x) + 7 – D. ½ x 2 – 3 + 2 ln(x)"— Presentation transcript:

1 Clicker Question 1 Suppose y = (x 2 – 3x + 2) / x. Then y could be: – A. 2x – 3 – B. ½ x 2 – 3x + 2 – C. ½ x 2 – 3x + 2 ln(x) + 7 – D. ½ x 2 – 3 + 2 ln(x) – E. (1/3 x 3 – 3/2 x 2 + 2 x) / (1/2 x 2 )

2 Clicker Question 2 If f (t) = tan(t), then f (t) could be: – A. sec 2 (t) – B. sec(t 2 ) – C. ln(sec(t)) – D. ln(tan(t)) – E. ln(cos(t))

3 Clicker Question 3 Suppose dy / dx = 1 /  (1 – x 2 ), then y could be: – A. arcsin(x) + 12 – B. arctan(x) - 5 – C. sin(x) + 43 – D. tan(x) – 3.5 – E. (1 – x 2 ) -3/2 + e 2

4 Differential Equations (3/17/14) A differential equation is an equation which contains derivatives within it. More specifically, it is an equation which may contain an independent variable x (or t) and/or a dependent variable y (or some other variable name), but definitely contains a derivative y ' = dy/dx (or dy/dt). It may also contain second derivatives y '', etc.

5 Examples of DE’s Every anti-derivative (i.e., indefinite integral) you have solved (or tried to solve) this semester is a differential equation! What is y if y ' = x 2 – 3x + 5 ? What is y if y ' = x / (x 2 + 4) What is y if dy/dt = e 0.67t Note that you also get a “constant of integration” in the solution.

6 New types of examples The following is a DE of a different type since it contains the dependent variable: y ' =.08y Say in words what this says! Note that we don’t see the independent variable at all – let’s call it t. What is a solution to this equation? And how can we find it?

7 The solutions to a DE A solution of a given differential equation is a function y which makes the equation work. Show that y = Ae 0.08t is a solution to the DE on the previous slide, where A is a constant. Note that we are using the old tried and true method for solving equations here called “guess and check”.

8 Examples of guess and check for DE’s Show that y = 100 – A e –t satisfies the DE y ' = 100 - y Show that y = sin(2t) satisfies the DE d 2 y / dt 2 = -4y Show that y = x ln(x) – x satisfies the DE y ' = ln(x) Of course one hopes for better methods to solve equations, but DE’s can be very hard.

9 Assignment for Wednesday Read over these slides (and try to solve the problems on them), and read Section 9.1. On page 584, do # 1 – 7 odd.

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