(a) Assume that (a, b) is a bounded open interval in R. Using Mean Value Theorem, prove that if f: (a, b) → R is an unbounded function (i.e., for every M > 0 there exists x € (a, b) such that |f (x)| M), then f' is also an unbounded function. → R, where (a, b) is a bounded open real (b) Give an example of a function f: (a, b) interval, such that f is differentiable on (a, b), f' is unbounded on (a, b), but f is bounded function on (a, b).

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Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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(a) Assume that (a, b) is a bounded open interval in R. Using Mean Value Theorem, prove that if f : (a, b) → R is an unbounded function (i.e., for every M > 0 there exists x ∈ (a, b) such that | f (x)| > M), then f ′ is also an unbounded function.

(b) Give an example of a function f : (a, b) → R, where (a, b) is a bounded open real interval, such that f is differentiable on (a, b), f ′ is unbounded on (a, b), but f is bounded function on (a, b).

(a) Assume that (a, b) is a bounded open interval in R. Using Mean Value Theorem, prove
that if f: (a, b) → R is an unbounded function (i.e., for every M > 0 there exists
x E (a, b) such that |f (x)| > M), then f' is also an unbounded function.
(b) Give an example of a function f: (a, b) → R, where (a, b) is a bounded open real
interval, such that f is differentiable on (a, b), f' is unbounded on (a, b), but f is
bounded function on (a, b).
2.
Transcribed Image Text:(a) Assume that (a, b) is a bounded open interval in R. Using Mean Value Theorem, prove that if f: (a, b) → R is an unbounded function (i.e., for every M > 0 there exists x E (a, b) such that |f (x)| > M), then f' is also an unbounded function. (b) Give an example of a function f: (a, b) → R, where (a, b) is a bounded open real interval, such that f is differentiable on (a, b), f' is unbounded on (a, b), but f is bounded function on (a, b). 2.
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