Please just prove item 2 of the corollary. COROLLARY Let I be an interval and f : I → R be differentiable. (1) f is monotone increasing if and only if f'(x) > 0 for all æ E I. (2) f is monotone...

Please just prove item 2 of the corollary.

COROLLARY<br>Let I be an interval and f : I → R be differentiable.<br>(1) f is monotone increasing if and only if f'(x) > 0 for all æ E I.<br>(2) f is monotone decreasing if and only if f'(x) < 0 for all r E I.<br>

Extracted text: COROLLARY Let I be an interval and f : I → R be differentiable. (1) f is monotone increasing if and only if f'(x) > 0 for all æ E I. (2) f is monotone decreasing if and only if f'(x) < 0="" for="" all="" r="" e="">

Jun 05, 2022

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Please just prove item 2 of the corollary. COROLLARY Let I be an interval and f : I → R be differentiable. (1) f is monotone increasing if and only if f'(x) > 0 for all æ E I. (2) f is monotone...

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