1. Related Rates A fun and exciting application of derivatives

2. The Study of Change Used to work with real life problems where there is more than one variable such as –Rain pouring into a pool How fast is the height changing compared to the speed the volume is changing? –Falling ladder How fast is the base moving away from the house compared to the speed the top of the ladder is falling towards the ground? –Distance between two moving objects How fast does the distance between the objects change compared to the speed of each car?

3. The Ladder Problem An 8 foot long ladder is leaning against a wall. The top of the ladder is sliding down the wall at the rate of 2 feet per second. How fast is the bottom of the ladder moving along the ground at the point in time when the bottom of the ladder is 4 feet from the wall ?

4. Animation(Hopefully) http://www2.scc- fl.edu/lvosbury/images/LadderNS.gifhttp://www2.scc- fl.edu/lvosbury/images/LadderNS.gif

5. Example Two cars travel on perpendicular roads towards the intersection of the roads. The first car starts 100 miles from the intersection and travels at a constant rate of 55 mph. The second car starts at the same time, 250 miles from the intersection and travels at a constant speed of 60 mph. How fast it the distance between them changing 1.5 hours later? »From Teaching AP Calculus, McMullin

6. Two Different Solutions Let t = time traveled X = 100 – 55t Y = 250 -60t Z(t) = y x z

7. Differentiate

8. Method 2—Easier? Differentiate at start with Pythagorean Thm

9. Compare Un-Simplified Versions

10. What units? The distance between the two cars is changing at a rate of -65.62 miles per hour In general, units of the derivative units of f(x)/ units of independent variable

11. Simplified Example Suppose x and y are both differentiable functions of t and are related by the equation Find dy/dt when x =1, given that dx/dt =2 when x = 1 »From Calculus, 8 th e, Larson

12. Solution Use Implicit Differentiation When x = 1 and dx/dt =2,