12.1

1. Parametric Equations 12.1

2. Find the derivative.

3. Parametric equations can be used to describe motion that is not a function. If f and g have derivatives at t, then the parametrized curve also has a derivative at t.

4. The formula for finding the slope of a parametrized curve is: This makes sense if we think about canceling dt.

5. The formula for finding the slope of a parametrized curve is: We assume that the denominator is not zero.

6. To find the second derivative of a parametrized curve, we find the derivative of the first derivative: • Find the first derivative (dy/dx). 2. Find the derivative of dy/dx with respect to t. 3. Divide by dx/dt.

7. Example:

8. Example: • Find the first derivative (dy/dx).

9. 2. Find the derivative of dy/dx with respect to t. Quotient Rule

10. 3. Divide by dx/dt.

11. Find the slope of the line tangent to the point on the circle:

12. Find the slope of the line tangent to the point on the circle: What is the equation of the line tangent to the point on the circle? Point:

13. Determine the concavity of the cycloid on the interval This is always negative so the graph is concave down.

14. Homework Page 535 #16-25, 27-31 all

15. Homework Page 535 #1-15 odd, 16-31 all