QUESTION 1 Fourier Series are also the starting point for some interesting mathematical formulas. Write a...

Write the Fourier cosine series for f(x) on the interval 0 ≤ x ≤ π. Parameter...

Write the Fourier cosine series for f(x) on the interval 0 ≤ x ≤ π. Parameter c is a constant. f(x) = x + e −x + c (b) Determine the value of c such that a0 in the Fourier cosine series is equal to zero.

1. Find the Fourier cosine series for f(x) = x on the interval 0 ≤ x...

1. Find the Fourier cosine series for f(x) = x on the interval 0 ≤ x ≤ π in terms of cos(kx). Hint: Use the even extension. 2. Find the Fourier sine series for f(x) = x on the interval 0 ≤ x ≤ 1 in terms of sin(kπx). Hint: Use the odd extension.

a. Let f be an odd function. Find the Fourier series of f on [-1, 1]...

a. Let f be an odd function. Find the Fourier series of f on [-1, 1] b. Let f be an even function. Find the Fourier series of f on [-1, 1]. c. At what condition for f would make the series converge to f at x=0 and x=1?

1-(Partial Fraction Decomposition Revisited) Consider the rational function 1/(1-x)(1-2x) (a) Find power series expansions separately for...

1-(Partial Fraction Decomposition Revisited) Consider the rational function 1/(1-x)(1-2x) (a) Find power series expansions separately for 1/(1 − x) and 1/(1 − 2x). (b) Multiply these two power series expansions together to get a power series ex-pansion for 1 (1−x)(1−2x) (This involves doing an infinite amount of distributing and combining coeffi-cients, but you should be able to figure out the pattern here.) c) Separate the power series in terms of power series for A/(1 − x) and B/(1 − 2x)...

Suppose f(x)=x6+3x+1f(x)=x6+3x+1. In this problem, we will show that ff has exactly one root (or zero)...

Suppose f(x)=x6+3x+1f(x)=x6+3x+1. In this problem, we will show that ff has exactly one root (or zero) in the interval [−4,−1][−4,−1]. (a) First, we show that f has a root in the interval (−4,−1)(−4,−1). Since f is a SELECT ONE!!!! (continuous) (differentiable) (polynomial)   function on the interval [−4,−1] and f(−4)= ____?!!!!!!! the graph of y=f(x)y must cross the xx-axis at some point in the interval (−4,−1) by the SELECT ONE!!!!!! (intermediate value theorem) (mean value theorem) (squeeze theorem) (Rolle's theorem) .Thus, ff...

Let f : R \ {1} → R be given by f(x) = 1 1 −...

Let f : R \ {1} → R be given by f(x) = 1 1 − x . (a) Prove by induction that f (n) (x) = n! (1 − x) n for all n ∈ N. Note: f (n) (x) denotes the n th derivative of f. You may use the usual differentiation rules without further proof. (b) Compute the Taylor series of f about x = 0. (You must provide justification by relating this specific Taylor series to...

2. The function f(x) = 1 1 + 1.25x 2 has one inflection point on the...

2. The function f(x) = 1 1 + 1.25x 2 has one inflection point on the interval 0 ≤ x ≤ 2. (a) Find the inflection point of the function f(x). Write the answer with ALL the decimal places the calculator gives. Do not round the calculator answer. calculator answer: (b)Sketch the graph of f(x) over the interval 0 ≤ x ≤ 2. Label the inflection point of f(x) in your sketch. Give the window you use. (c)(2 points) Use...

please double check the answers of Question 1 C and Question 2 D i got the...

please double check the answers of Question 1 C and Question 2 D i got the rest of the answers. 1.An object undergoing simple harmonic motion takes 0.32 s to travel from one point of zero velocity to the next such point. The distance between those points is 26 cm. Calculate (a) the period, (b) the frequency, and (c) the amplitude of the motion. 2.x = (9.2 m) cos[(5πrad/s)t + π/4 rad] gives the simple harmonic motion of a body....

1) Show that the formulas below represent the equation of a circle. x = h +...

1) Show that the formulas below represent the equation of a circle. x = h + r cos θ y = k + r sin θ 2) Use the equations in the preceding problem to find a set of parametric equations for a circle whose radius is r = 4 and whose center is (-1,-2). 3)  Plot each of the following points on the polar plane. A(2, π/4), B(1, 3π/2), C(4, π)

For this problem, consider the function f(x) = ln(1 + x). (a) Write the Taylor series...

For this problem, consider the function f(x) = ln(1 + x). (a) Write the Taylor series expansion for f(x) based at b = 0. Give your final answer in Σ notation using one sigma sign. (You may use 4 basic Taylor series in TN4 to find the Taylor series for f(x).) (b) Find f(2020) (0). Please answer both questions, cause it will be hard to post them separately.