We will be interested in computing limits of sequences of partial sums. The number multiplied is called the common ratio. Geometric sequences happen when you multiply numbers. The number added is called the common difference. But have you ever asked yourself how you actually compute say \(\sin(1.1)\) or \(e^ s_k = 2\). 5) Sum: 1 NOTE: These tests prove convergence and divergence, not the actual limit or sum S. Sequences and Series Cheat Sheet Arithmetic Sequences and Series Geometric Sequences and Series Arithmetic sequences happen when you add numbers. Can anyone give any tips and/or recommendations for studying series. Were coming up on our study on the topic of Series. An explicit formula for this arithmetic sequence is given by an a (n1)b, n N, a recursive formula is given by a1 a and an an1 b for n > 1. Hint: x2sec(theta)) -Ex 1,3,4,7,8,13 -Trig Substitution worksheet Section 2. Tips for studying series in Calculus 2 Im in a summer class, which due to its nature is moving very fast. Given enough time, everyone is capable of computing \(x^3-2x^2 7x 11\) if say \(x=1.1\) all operations reduce to addition/multiplication of rational numbers. Section 2.1 Trigonometric Integrals -Be able to do problems with sine and cosine, tangent and secant -Ex 1-5, 7,8,12, 13 Section 2.2 Trigonometric Substitution -I’ll give you what x is equal to (ex. Sequences and Series was difficult, no doubt, but I honestly found this super-interesting, which helped me ace the test. The next number is found by adding up the two numbers before it: the 2. 4 Parametric Equations and Polar Coordinates The Fibonacci Sequence is the series of numbers: 0, 1, 1, 2, 3, 5, 8, 13, 21, 34.
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