f(x) = x² and let e > 0 be given. ) Find 8 so that |x – 1| < 8 implies |f(x) – f(1)| < e. ) Find & so that |æ – 2| < 8 implies |f(x) – f(2)| < e. ) If n > 2 and you had to find a d so that |x – n| < 8 implies |f(x) – f(n)| < e, w -

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Let f(x) = x² and let e > 0 be given.
(a) Find d so that |x – 1| < 8 implies |f(x) – f(1)| < e.
-
(b) Find d so that |x – 2| < 8 implies |f(x) – f(2)| < e.
(c) If n > 2 and you had to find a d so that |x – n| < 8 implies |f(x) – f(n)| < e, would d
be larger or smaller than the 8 for parts (a) and (b)Why?.
Transcribed Image Text:Let f(x) = x² and let e > 0 be given. (a) Find d so that |x – 1| < 8 implies |f(x) – f(1)| < e. - (b) Find d so that |x – 2| < 8 implies |f(x) – f(2)| < e. (c) If n > 2 and you had to find a d so that |x – n| < 8 implies |f(x) – f(n)| < e, would d be larger or smaller than the 8 for parts (a) and (b)Why?.
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