- Find the derivatives of the functions involving inverse trigonometric and inverse hyperbolic trigonometric functions. Two parts.
- Find the derivative of the integral using the second part of the fundamental theorem of calculus, modified to incorporate functions as limits.
- Evaluate the integrals involving inverse trigonometric or hyperbolic trig functions. Two parts.
- Write the form of the indeterminate limit and then find the limits. Two parts.
- Evaluate an improper integral.
- Integrate using integration by parts.
- Integrate using a trigonometric substitution.
- Values of a function are given at certain points. Use the trapezoid method and Simpson's method to find the area under the curve.
- Solve the differential equation initial value problem.
- Find the general solution to a second order, linear differential equation.
- Use Euler's method to approximate the initial-value problem over the stated interval. Present your answer as a table and a graph.
- Determine whether the sequence is eventually strictly increasing or eventually strictly
decreasing and for what values of
*n*this holds. - Determine whether the series converges, and if so, find its sum. Two parts.
- Identify each series as convergent, conditionally convergent, or divergent. Four parts.
- Find the radius of convergence and the interval of convergence.
- Find a Maclauring polynomial for the given function. Then write the Maclaurin series in sigma notation.
- Two polar graphs are shown. Write the function.
- Find the area of a region using polar coordinates.
- Find the equation of the conic section that satisfies the given conditions.
- Find the polar equation for the conic section that satisfies the given conditions.
- Identify each statement as true or false. Thirteen parts. Concentrate on properties of hyperbolic trig functions, integration by parts, exponential and logistic growth models, convergence and divergence of tests, monotonic series, convergence of a power series, derivatives of a power series, the relationship between the derivatives of trig functions and their cofunctions, the relationship between the derivatives of hyperbolic trig functions and their reciprocal functions, the convergence of a p-series, and the convergence of a finite series.

- The final exam is open notebook.
- The exam is in the chapter order.
- The exam is based primarily off of old exams, although there may be some material on the final that isn't from an old exam.
- You may copy tables from the book and put in your notebook. In particular, make sure you get the derivatives and integrals of trig, inverse trig, hyperbolic trig, and inverse hyperbolic trig functions. You will not need the table of common Maclaurin series.
- Make sure this study guide is in your notebook, along with any notes about where to find information.
- If there are any areas of the test where your notes are weak, supplement them before taking the exam.
- Have your notes extremely organized before you arrive to take the test. If you have to spend a lot of time during the test looking for the material on the test, you will run over the allotted time.
- Each part on the exam is worth 6 points except for the last problem where each answer is worth 2 points.