1. Miss Battaglia AB/BC Calculus

2.  http://www.math.hmc.edu/calculus/tutorials /tangent_line/ http://www.math.hmc.edu/calculus/tutorials /tangent_line/ y = f(c) + f’(c)(x-c)

3. Find the tangent line approximation of f(x)=1+sinx at the point (0,1). Then use a table to compare the y-values of the linear function with those of f(x) on an open interval containing x=0.

4. Let y=f(x) represent a function that is differentiable on an open interval containing x. The differential of x (denoted by dx) is any nonzero real number. The differential of y (denoted dy) is dy = f’(x) dx

5. Let y=x 2. Find dy when x=1 and dx=0.01. Compare this value with Δy for x=1 and Δx=0.01. dy Δy

6. The measured value x is used to compute another value f(x), the difference between f(x+Δx) and f(x) is the propagated error. f(x + Δx) – f(x) = Δy Exact Value Measured Value Measurement Error Propagated Error

7. The measurement radius of a ball bearing is 0.7 in. If the measurement is correct to within 0.01 in, estimate the propagated error in the volume V of the ball bearing.

8. Each of the differential rules from Chapter 2 can be written in differential form. Let u and v be differentiable functions of x. Constant multiple:d[cu] = c du Sum or difference:d[u + v] = du + dv Product: d[uv] = udv + vdu Quotient:d[u/v] =

9. FunctionDerivativeDifferential y=x 2 y=2sinx y=xcosx y=1/x

10. y = f(x) = sin 3x

11. y = f(x) = (x 2 + 1) 1/2

12. Differentials can be used to approximate function values. To do this for the function given by y=f(x), use the formula f(x + Δx) = f(x) + dy = f(x) + f’(x)dx

13. Use differentials to approximate Using f(x) = f(x) + f’(x)dx

14. Read 3.9 Page 240 #7, 11, 13, 15, 17, 27, 30, 43, 44, 53-56