A graphing calculator is recommended.Use the Squeeze Theorem to show that lim (x cos(23rx)) = 0. Illustrate by graphing the functions f(x) = -x, g(x) = x2 cos(23Tx), and h(x) = x2 on the same screen.Let f(x) = -x2, g(x) = x2 cos(23nx), and h(x) = x2. Then ? vs cos(23nx) S ? v = ? vsx cos(23TX) < ? VSince lim f(x) = lim h(x) =by the Squeeze Theorem we have lim g(x) =x-0x-0x-0

A graphing calculator is recommended. Use the Squeeze Theorem to show that lim (x2 cos(23nx)) = 0. Illustrate by graphing the functions (x) = -x, g(x) = x cos(23Tx), and h(x) = x on the same screen. Let f(x) = -x?, g(x) - x2 cos(23nx), and h(x) = x2. Then ? vs cos(23nx) s? v = ? vsx cos(23nx) s? v Since lim by the Squeeze Theorem we have lim g(x) = *-o (x) - lim h(x) =

A graphing calculator is recommended. Use the Squeeze Theorem to show that lim (x2 cos(23nx)) = 0. Illustrate by graphing the functions (x) = -x, g(x) = x cos(23Tx), and h(x) = x on the same screen. Let f(x) = -x?, g(x) - x2 cos(23nx), and h(x) = x2. Then ? vs cos(23nx) s? v = ? vsx cos(23nx) s? v Since lim by the Squeeze Theorem we have lim g(x) = *-o (x) - lim h(x) =

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter4: Polynomial And Rational Functions

Section: Chapter Questions

Problem 15T

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