5.9 THEOREM If f1, f2: [a, b] → R are bounded and f1, f2 E R(x) on [a, b},theni. For c1, C2 any real numbers, Cif, + C2f2 E R(x) on [a, b] and(cifi + C2f2) dx = c,fi dx + c2f2 dx.ii. If fi(x) < f2(x) for all x E [a, b], thenf:(x) dx s| f2(x) dx.iii. If m < f,(x) < M for all x E [a, b], thenm(b – a) sfi dx s M(b - a). Prove that1dx3V2Vi + x²3(Hint: Theorem 5.9(ii) and carefully chosen functions should do the trick.)

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Answered: Prove that 1 3V2 dx < 3 + x (Hint:…

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Prove that 1 3V2 dx < 3 + x (Hint: Theorem 5.9(ii) and carefully chosen functions should do the trick.)

College Algebra

1st Edition

ISBN:9781938168383

Author:Jay Abramson

Publisher:Jay Abramson

Chapter6: Exponential And Logarithmic Functions

Section6.4: Graphs Of Logarithmic Functions

Problem 60SE: Prove the conjecture made in the previous exercise.

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In mathematics, traditional optimization problems are typically expressed in terms of minimization. When we talk about minimizing or maximizing a function, we refer to the maximum and minimum possible values of that function. This can be expressed in terms of global or local range. The definition of minimization in the thesaurus is the process of reducing something to a small amount, value, or position. Minimization (noun) is an instance of belittling or disparagement.

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Question

5.9 THEOREM If f1, f2: [a, b] → R are bounded and f1, f2 E R(x) on [a, b},
then
i. For c1, C2 any real numbers, Cif, + C2f2 E R(x) on [a, b] and
(cifi + C2f2) dx = c,
fi dx + c2
f2 dx.
ii. If fi(x) < f2(x) for all x E [a, b], then
f:(x) dx s
| f2(x) dx.
iii. If m < f,(x) < M for all x E [a, b], then
m(b – a) s
fi dx s M(b - a).

Prove that
1
dx
3V2
Vi + x²
3
(Hint: Theorem 5.9(ii) and carefully chosen functions should do the trick.)

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