B. Let r> 0 be a positive real number. This problem will give a simple approach to lim,→o M. i. Explain briefly why an = r^ can be written recursively as ao = 1, an r·an-1 for n > 0. ii. Using the...

B. Let r> 0 be a positive real number. This problem will<br>give a simple approach to lim,→o M.<br>i. Explain briefly why an = r^ can be written recursively as<br>ao = 1, an<br>r·an-1<br>for n > 0.<br>ii. Using the technique of solving for the limit of a<br>recursive sequence, find the possible limits of a, if the<br>sequence converges.<br>iii. Show that aŋ is monotone. (It may be increasing or<br>decreasing, depending on r.)<br>iv. Combine (ii) and (iii) to show lim,-0 converges to 0<br>for r< 1, converges to 1 for r = 1, and diverges to ∞ for r><br>

Extracted text: B. Let r> 0 be a positive real number. This problem will give a simple approach to lim,→o M. i. Explain briefly why an = r^ can be written recursively as ao = 1, an r·an-1 for n > 0. ii. Using the technique of solving for the limit of a recursive sequence, find the possible limits of a, if the sequence converges. iii. Show that aŋ is monotone. (It may be increasing or decreasing, depending on r.) iv. Combine (ii) and (iii) to show lim,-0 converges to 0 for r< 1,="" converges="" to="" 1="" for="" r="1," and="" diverges="" to="" ∞="" for="" r="">

Jun 03, 2022

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B. Let r> 0 be a positive real number. This problem will give a simple approach to lim,→o M. i. Explain briefly why an = r^ can be written recursively as ao = 1, an r·an-1 for n > 0. ii. Using the...

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