Find the limit L for the given function f, the point c, and the positive number ɛ. Then find a number 8 >0 such that, for all x, 0< |x – c| <ô 1) f(x)= -3x+8, c=-2, ɛ=0.03 → \f(x) – L| < ɛ
Find the limit L for the given function f, the point c, and the positive number ɛ. Then find a number 8 >0 such that, for all x, 0< |x – c| <ô 1) f(x)= -3x+8, c=-2, ɛ=0.03 → \f(x) – L| < ɛ
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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Transcribed Image Text:Find the limit L for the given function f, the point c,
and the positive number ɛ. Then find a number 8 >0
such that, for all x, 0< |x – c| <d → \F(x) – L| < ɛ
1) f(x)3-3x+8, с%3-2, €-0.03
X
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