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    Real Analysis

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    Singularities, Convergence of Taylor Series, Residues and Contour Integral

    Consider the complex function: f(z) = 1/(z^2 + z + 1)(z + 5i) a) Find and classify the singularities of f(z); b) Without finding the series explicitly, determine the region of uniform convergence of the Taylor series taken about the origin; c) Find the residues of f(z) at each of the singular points; d) Find the val

    Integrals and Convergence Evaluated

    Determine whether the integral dx / x^2 which has a an upper limit of 3 and lower limit of -2 converges or diverges. Evaluate the integral if it converges.

    Quality Control : Control Limits and p-Charts

    Hunter Nut Company produces cans of mixed nuts, advertised as containing no more than 20% peanuts. Hunter Nut Company wants to establish control limits for their process to ensure meeting this requirement. They have taken 30 samples of 144 cans of nuts from their production process at periodic intervals, inspected each can, and

    The Sum of Converging Series

    Consider the following series. SUM (n =0, infinity) of (x + 7)^n / 4^n a) Find the values of x for which the series converges. (Enter the smaller number first.) b) Find the sum of the series for those values of x.

    Sequence Convergence and Limit Proof

    Suppose {p_n} converges to p. Prove that there is at most one alpha for which the limit as n goes to infinity of |p_n+1-p|/(|p_n-p|^alpha) is a positive finite number. (See attachment for mathematical notation)

    Multiplicity of a Root and Taylor's Theorem

    Let f(x) be defined as f(x) = tanx/x if x =/ 0 = 1 if x = 0 and let g(x) = f(x) - 1. Then g(x) is continuous at x = 0 and, in fact, g(x) has derivatives of all orders at x = 0. Determine the multiplicity of the root g(x) has at x = 0. Hint: Apply Taylor's Theorem.

    Real Analysis Proofs : Set Operations

    Provide counterexamples for each of the following.... From Set Theory, Set Operation. College level proof before real analysis. Please give formal proof. Please explain each step of your solution. Thank you.

    Real Analysis Proofs : Set Operations

    From Set Theory, Set Operation College level proof before real analysis. Please give formal proof. Please explain each step of your solution. Thank you.

    Real Analysis Integer Proofs

    College level proof before real analysis. Please give formal proof. Please explain each step of your solution. Thank you.

    Real Analysis : Real Numbers

    College level proof before real analysis. Please give formal proof. Please explain each step of your solution. If you have any suggestion or question to me, please let me know. Thank you. Please see attached file for full problem description. I. Three real numbers and have the property that . Prove that at least

    Example Functions and Limits Problems

    1. Express the distance between the point (3, 0) and the point P (x, y) of the parabola y = x2 as a function of x. 2. Find a function f(x) = xk and a function g such that f(g(x)) = h(x) = 3x + x2 3. Find the trigonometric limit: lim x-tan 2x/sin 2 x → 0

    Convergence and Interchanging limits

    Suppose that f_k -> f uniformly on (0,1). Let 0 < x < 1. Suppose that lim f_k(t) = A_k for k=1,2,... Show that {A_k} converges and lim f(t) = LIM A_k. That is show lim LIM f_k(t) = LIM lim f_k(t). Where lim represents the limit as t approaches x and LIM represents the limit as k approaches infinity.

    Piecewise Functions, Derivatives and Limits

    1. A piecewise function is given. Use the function to find the indicated limits, or state that a limit does not exist. (a) lim is over x gd - f(x), (b) lim is over x gd + f(x), and (c) lim is over xgd f(x) f(x) = { x^2 - 5 if x < 0 } { -2 if x >= 0 } : d = -3 (a) -5 (b) -2 (c) does not exist

    Derivatives, Integrals, Limits and Convergence

    Please see the attached file for the fully formatted problems. Question 1 Differentiate the function f(x) = (a) xlnx - x (b) x5lnx (c) (lnx)2 (d) 1-x ________________________________________lnx Question 2 Figure 2.1 ?(x) = ln ^/¯ (9-x2) ________________________________________(4+x2)

    There are twelve problems involving functions, continuity, finding slope using predictor formula, tangent line to a curve, trajectory of a projectile, finding limits, finding limits using squeeze law and continuity of functions.

    Please refer to the attached file to view the complete questions. ======================================== Question 1 Figure 1.1 y = f(x) = (2x+4)2 - (2x - 4)2 . Apply the slope predictor formula to find the slope of the line tangent to Figure 1.1. Then write the equation of the line tangent to the graph of f at

    Real Analysis: Integrable Functions

    Let f:[0,1]-->R be a Riemann integrable function. Prove that lim n-->∞ ∫ (from 0 to 1) x^n f(x)dx = 0. I do not know where to begin on this problem. It seems like it should be easy though.

    Real Analysis : Differentiable Functions

    Does there exist a differentiable function f: R-->R such that f'(0) < 0 for all x &#8804; 0 and f'(x) > 0 for all x > 0? Give an example of such function or prove that it does not exist.

    Series Convergence and Divergence

    Please see attached file for full problem description. 1) Consider the series where . Show that and for . 2) Use the result of the previous problem to find . 3) The series converges. Find its sum. 4) Determine whether the series converges or diverges. Fully justify your answer. 5) Determine wheth