Problem 2. Find the Laurent series of sin π:/(4.2-1) about 1/2; you may keep several terms explic...
sin ak 2. (1) Let k be a positive integer. Find the Laurent series expansion of f(x) = at z = 0 precisely (presenting a first few terms is not sufficient). (2) Find Res[f(x), 0). (3) Is the singularity of at z = O removable ? ਵ
question 5c 5. Find the Laurent series expansion of: (a) f(x) = 2*1 about i, (b) f(x) = 22 + 1-2, convergent on {2 < 121 <4}, (c)* f(x) = 2,2-33+2, convergent on {j < lz - 11 < 1}.
need answer for #2, which is about arctan #1 Suppose we want to estimate sin (0.1) using the Taylor series of sin x at x = 0. (a) Find roughly a number of nonzero terms which are required to compute sin(0.1) to n decimals (you do not need to find the minimum number.) (b) Find such a number more accurately, i.e. find a smaller one, using any mathematical tech niques. You may want to use the fact related to Stirling's...
To test the series e 2n for convergence, you can use the Integral Test. (This is also a geometric series, so we could n=1 also investigate convergence using other methods.) Find the value of e-24 dx = Preview Ji What does this value tell you about the convergence of the series e-2n? the series definitely diverges the series might converge or diverge: we need more information the series definitely converges Compute the value of the following improper integral, if it...
please clearly answer each part of this problem and show all work 2. Given the series (-1)"+1(n + 1) n? + 1 (a) Does it converge absolutely, converge conditionally, or diverge? If it converges, you must show that all three criteria of the Alternating Series Test are satisfied. (b) Use the Alternating Series Remainder Theorem to find the number of terms N such that RNI < 1/10 (c) Use this N to find lower and upper bounds to three decimal...
1. Use the integral to find if the series converges: [~__ ( 2 ) Use the direct comparison test to find if the series converges. Remember to state which series you are using for the comparison. 2. LX-1 (5810)
5. Let f(z) = arctan(z) (a) (3 marks) Find the Taylor series about r)Hint: darctan( You may assume that the Taylor series for f(x) converges to f(x) for values of r in the interval of convergence (b) (3 marks) What is the radius of convergence of the Taylor series for f(z)? Show that the Taylor series converges at z = 1 (c) (3 marks) Hence, write as a series. (d) (3 marks) Go to https://teaching.smp.uq.edu.au/scims Calculus/Series.html. Use the interactive animation...
1. Express the sum m-1 k-0 in closed form. [Hint: The sum is a finite geometric series.] 2. Find the equation of the line connecting the endpoints of the graph of sin(x) on the interval [0, π/2] 1. Express the sum m-1 k-0 in closed form. [Hint: The sum is a finite geometric series.] 2. Find the equation of the line connecting the endpoints of the graph of sin(x) on the interval [0, π/2]
4. (a) Indicate where the series is (i) absolutely convergent, n-1 where it is (ii) conditionally convergent, and where it is (iii) divergent. Justify your answers Find f,(z) if f(x) = arctan (e* ) + arcsin V2x + 4. (b) (a) Set up (but do not evaluate) a definite integral that represents the area 5. of the region R inside the circle r = 4 sin θ and outside the circle r = 2. Carefully sketch the region R. (i)...
Write VBA functions to calculate sin (x) using the Maclaurin arcsine series, and compare the values for sin-1(x) from your program to those given by the Excel spreadsheet function ASIN(x). The Maclaurin arcsine expansion is given by x 3x 6 40 (2n)! sin1(x)-2((2n+1) Note: This function by definition is only defined for-1 SxS1. When you write the code for calculating it, you will need to include code that assigns a value to it that reflects it is undefined for values...