Let a function f be continuous on a closed bounded region R, and let it be analyticand not constant throughout the interior of R. Assuming that f(z) #0 anywhere inR, prove that f(z)| has a minimum value m in R which occurs on the boundary of Rand never in the interior of R by applying the Maximum Modulus Principle to thefunction 1/f(z).

Given: Let f be a continuous function on a closed bounded region R. f is analytic and…

Answered: Let a function f be continuous on a…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Let f: R2 R be defined by f (x, y) = xy- ry + ry? – x. a) Which symmetry property does f have? What can you conclude from this about the graph of f and the contours of f? b) Determine all critical points of f and their types. Hint: There are 6 critical points. c) Does f have a global extremum?
B. Let f: R² → R be a continuous function, and let S be the subset of the R² given by all pairs (x, y) so that x² + xy + 3y² = 3. Show that f(S) contains a minimum and maximum value. Hint: Remember Hw8 A!
Suppose that f1 : [0, 1] → R and f2 : [0, 1] → R are continuous everywhere and that f1(0) < f2(0) and f1(1) > f2(1). Show that there exists a point c ∈ (0,1) such that f1(c) − f2(c) = 0.
Let f: R" → R be a continuous function, and let x1, x2 E R" be distinct. Prove that there exist a continuous function g: R" → R and disjoint neighborhoods U1, U2 of x1, x2, respectively, such that g = f in U, and g = 1- f in U2.
Let f : [a, b] → R be a differentiable function with f′ bounded. Show that f is isuniformly continuous on [a, b]. (Hint: Show that it is Lipschitz first).
Assume thatf is differentiable in (-oo, x) and af'(r)N 0 for all rE (-00, 00). Prove that f has the absolute minimum at x 0.
Let f : [a, b] → R be a strictly decreasing function. Prove that f is integrable [a, b). on
1. Let f(x) be a decreasing function on [0, 1]. Show that f is integrable over [0, 1].

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