3. Let c be a number with c < 1 Show that c can be expressed as el = 1 where d > 0. Then use the Binomial Formula to show that c≤nd ≤ for every index n 4. Use the above problem to prove that if c < 1, then c→ 0.

3. Let c be a number with c < 1 Show that c can be expressed as el = 1 where d > 0. Then use the Binomial Formula to show that c≤nd ≤ for every index n 4. Use the above problem to prove that if c < 1, then c→ 0.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter4: Polynomial And Rational Functions

Section4.2: Properties Of Division

Problem 50E

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But in your proof how are using this.)
3. Let c be a number with c < 1 Show that c] can be expressed as lel= where d > 0.
Then use the Binomial Formula to show that
|| ≤nd ≤n for every index n
4. Use the above problem to prove that if c < 1, then c→0.
You will need to point

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