2. By multiplying the appropriate Taylor series about c 0, compute the first four terms of...
Compute the first three non-zero terms of the Taylor series for the functions: Q.1 [10 Marks] Compute the first three non-zero terms of the Taylor series for the functions: (a) (i) f(x)-In( 1 ) about a-0 where Ir < 1 (Hint: In(it)-In(1+z)-In(1-r)) (ii) From your result in (i) find ËIn(쁩) dt Page: 1 of3 MAT1841 Assignment 2 2019 Continuous Mathematics for Computer Science 3 +3+4-10 (c) h(z) = exp (sin r) about a = 픔 Q.1 [10 Marks] Compute the...
2. Find the Taylor series about x = 0 for x ^ 2 * cos(x ^ 2) . Also, find an expression for the general term of the series if the index starts with k = 0 0. (Hint: First find the Taylor series for cos x ^ 2 2. Find the Taylor series about x = 0 for x?cos(x?). Also, find an expression for the general term of the series if the index starts with k = 0. (Hint:...
ex – 2 Use the following Taylor series to find the first four nonzero terms of the Taylor series for the function centered at 0. ta eX = 1 + x + — + ... + = 2! k=0 The first nonzero term is .
5. A function f has Taylor series (at 0) f(x)=0+2x+ 4x2/2! + 3x3/3!+... Assume f−1 exists. Find as much of the Taylor series of f−1 (at 0) as you can. (Since you only know the first few terms of the Taylor series for f, you can only figure out f−1. (Hint: There are two ways of doing this problem. One is get the derivatives of f−1 from knowing the derivatives of f; we talked about the first derivative in January...
TOVIUUSI IUDICII IUDICII LISL NCALI IUDICII (1 point) Find the first four terms of the Taylor series for the function cos(x) about the point a = 1/4. (Your answers should include the variable x when appropriate.) degree 0 term = 1/(2^(1/2)) degree 1 term = degree 2 term = degree 3 term = Note: You can earn partial credit on this problem.
(2) Show that sin(x) is the sum of its Taylor series. (3) Find the first three nonzero terms of the Taylor series about 0 for the following functions (a) cos(x2) (b) e (c) tan(x)
Please answer all, be explanatory but concise. Thanks. Consider the function f(x) = e x a. Differentiate the Taylor series about 0 of f(x). b. ldentify the function represented by the differentiated series c. Give the interval of convergence of the power series for the derivative. Consider the differential equation y'(t) - 4y(t)- 8, y(0)4. a. Find a power series for the solution of the differential equation b. ldentify the function represented by the power series. Use a series to...
a. Find the first four nonzero terms of the Taylor series centered at a. b. Write the power series using summation notation. f(x) = €20, a=1
2. (New ways to find Taylor series) It's not always easy to write down Taylor series representations by computing all the successive derivatives of a function as follows. (a) Find, by evaluating derivatives at 0, the first three nonzero terms in the Taylor series about 0 for the function g(x) -sin a2 in the text or class such as e", sin , and cos a (b) Use Taylor series expansions already es to find an infinite series representation expansion for...
Only #4!!!! 3 Another Taylor Polynomial Let's compute another Taylor Series, and then call it a day. So let's look at the function f(x) = ln(1 + x), centered at a = 0. 3.1: Compute the first five derivatives of f(x). 3.2: Plug a = 0) into them (as well as the original function) to get f(n)(a) for n from 0 to 5. 3.3: Write down f(n)(a)(x-a)" n! 0,..., 5. Can you infer the general pattern? 3.4: Write down the...