Calculus 2 practice final how to#
In particular, focus on how to identify whether a question requires a u-sub or by parts or a trig substitution, as they can look very similar at first glance. In particular, focus on u-substitutions, integration by parts, and trig substitutions / integrals, as they are some of the more challenging techniques. Integration Techniques – Be sure to practice the more complicated integration techniques as much as you can.If these are not given on a formula sheet (which often they are), you are going to want to simply memorize them. Trapezoidal Rule, etc), and how to apply them effectively. You will also want to remember the variations of the Reimann Sum (e.g. Reimann Sums / Integration – For this section you are going to want to remember the left, right and midpoint formulas to find areas under a curve.There many avenues that a student can pursue to get support for preparing for this exam, but for now, here are some tips and suggestions for things to focus on to help you with preparing for you Calculus 2 final exam: Studying for this exam can be challenging, given she sheer volume of problem types and techniques that you are required to understand and apply.
Students in Calculus 2 (integral calculus) are preparing for their final exams in April.
Warning: in different years there are slightly different topics covered on each midterm, so for instance you'll find parametric curves on past midterm 2's even though this year they're on midterm 1, and you'll find sequences and series on past final exams even though this year they're on midterm 2.Are you prepared for your Calculus 2 exam? Review of this material: Problems and solutionsĮxam problems for past midterm 1's, sorted by topicĮxam problems for past midterm 2's, sorted by topicĮxam problems for past final exams, sorted by topic Practice Problems from Class for Final Exam:ĭifferential equations, 1: Problems and solutionsĭifferential equations, 2: Problems and solutionsĭifferential equations, 3: Problems and solutions
In addition to all topics from both midterms. Sections 10.1–10.3 (Taylor polynomials and Taylor series), Problems with partial information: Problems and solutions Improper integrals, 2: Problems and solutions Improper integrals, 1: Problems and solutions Polar coordinates: Problems and solutions Practice Problems from Class for Second Midterm: Section 8.3 (polar coordinates, including the alternate formula for arclength from problem 45),ħ.6 and 7.7 (improper integrals, including Limit Comparison Test for improper integrals),ĩ.1–9.5 (sequences, series, and power series).Īlso it is assumed that you still remember basic formulas and techniques for integration and differentiation. Parametric equations: Problems and solutions Practice Problems from Class for First Midterm: I am there Mondays 1pm-2pm, and I have office hours Mondays 2pm-4pm in addition I can arrange to meet you at other times if needed.ħ.2 ,ħ.5 ,Ĩ.2 ,Īlso it is assumed that you can take derivatives of x^n, log x, a^x, sin x, cos x, tan^ x, and that you can use the product rule, quotient rule, and chain rule. Need Help? The Math Lab in B860 East Hall has Math 116 instructors happy to help you Thursday 7pm-10pm, Friday 11am-4pm, Sunday 7pm-10pm, and Monday 11am-4pm. Office Hours: 2-4pm (M) or by appointment Math 116 Section Page Math 116 - Calculus II - Fall 2017
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