// Numbas version: exam_results_page_options {"name": "Katie's copy of Sequences and Limits 1.1", "extensions": [], "custom_part_types": [], "resources": [], "navigation": {"allowregen": true, "showfrontpage": false, "preventleave": false, "typeendtoleave": false}, "question_groups": [{"pickingStrategy": "all-ordered", "questions": [{"functions": {}, "ungrouped_variables": ["ab", "valexp", "v35", "al", "v15", "v150", "v610", "b1", "ga", "b3", "d2", "d1", "val", "s1", "v110", "v560", "s5", "v650", "k1", "r", "v45", "tol", "v210", "v250", "be", "v25", "v65", "de", "v450", "a3", "c1", "d", "a", "c", "b", "v550", "v350", "v510", "k", "v410", "n", "v55", "v310", "v660"], "name": "Katie's copy of Sequences and Limits 1.1", "tags": ["examples of standard limits", "limit", "limits", "limits of sequences", "sequences", "standard limits", "taking the limit"], "preamble": {"css": "", "js": ""}, "advice": "

All calculations below are to $5$ decimal places.

The notation $a \\approx b$ means that $a$ and $b$ are approximately equal.

a)

Using a calculator for $3$ values of $n$:

\n\n \n \n \n \n \n \n \n \n

$n$	$\\displaystyle{\\frac{1}{n^{1/\\var{r}}}}$
$100$	$\\var{v15}$
$5000$	$\\var{v110}$
$5000000$	$\\var{v150}$

This indicates that $\\displaystyle{\\lim_{n \\to \\infty}\\left(\\frac{1}{n^{1/\\var{r}}}\\right)=0}$

In fact $\\displaystyle{\\lim_{n \\to \\infty}\\left(\\frac{1}{n^r}\\right)=0}$ for any $r \\gt 0$

b)

\n\n \n \n \n \n \n \n \n \n

$n$	$\\displaystyle{\\var{k1}^{1/n}}$
$100$	$\\var{v25}$
$5000$	$\\var{v210}$
$5000000$	$\\var{v250}$

This indicates that $\\displaystyle{\\lim_{n \\to \\infty}\\var{k1}^{1/n}=1}$, see next question as well.

c)

\n\n \n \n \n \n \n \n \n \n

$n$	$\\displaystyle{\\var{k}^{1/n}}$
$100$	$\\var{v35}$
$5000$	$\\var{v310}$
$5000000$	$\\var{v350}$

This indicates that $\\displaystyle{\\lim_{n \\to \\infty}\\var{k}^{1/n}=1}$.

From the last two questions it seems that $\\displaystyle{\\lim_{n \\to \\infty} k^{1/n}=1}$ for any $k \\gt 0$ – and this is fact true.

d)

\n\n\n \n \n \n \n \n \n \n

$n$	$\\displaystyle{\\frac{\\var{c}n+\\var{d}}{\\var{al}n-\\var{ga}}}$
$100$	$\\var{v45}$
$5000$	$\\var{v410}$
$5000000$	$\\var{v450}$

This indicates that $\\displaystyle \\lim_{n \\to \\infty}\\left(\\simplify[std]{({c}n+{d})/({al}n-{ga})}\\right)\\;=\\; \\simplify[std]{{c}/{al}}$.

In general
\\[\\lim_{n \\to \\infty}\\left(\\frac{an+b}{cn+d}\\right)= \\frac{a}{c}\\] when $c \\neq 0$

e)

\n\n \n \n \n \n \n \n \n \n \n

$n$	$\\displaystyle{\\left(\\simplify{{c}/{n}}\\right)^n}$
$10$	$\\var{v55}$
$29$	$\\var{v510}$
$50$	$\\var{v550}$
$89$	$\\var{v560}$

This indicates that $\\displaystyle{\\lim_{n \\to \\infty}\\left(\\simplify{{c}/{n}}\\right)^n}= 0$. In general $\\displaystyle{\\lim_{n \\to \\infty} r^n= 0}$ if $|r| \\lt 1$

f)

We have the limit:
\\[\\lim_{n\\to\\infty}\\left(1+\\frac{a}{n}\\right)=e^a\\]
The following table confirms that the values are converging to (five decimal places) $\\displaystyle{\\simplify[std]{e^({a3}/{b3})={valexp}}}$

\n\n\n \n \n \n \n \n \n \n \n

$n$	$\\displaystyle{\\left(\\simplify[std]{1+{a3}/({b3}n)}\\right)^n}$
$10$	$\\var{v65}$
$100$	$\\var{v610}$
$1000$	$\\var{v650}$
$10000$	$\\var{v660}$

Hence the answer asked for is $\\var{val}$ to $4$ decimal places.

g)

The answer to this question is based upon neglecting terms in polynomials in $n$ for large $n$.

For example, $n^3+1000000n^2+1000000000 \\approx n^3$ for large $n$ as the $n^3$ term completely dominates the other terms as $n \\longrightarrow \\infty$.

A more precise way of saying this is:
\\[\\lim_{n\\to\\infty}\\left(\\frac{n^3+1000000n^2+1000000000}{n^3}\\right)=1\\]

So for large $n$
\\[\\begin{eqnarray*} \\frac{\\left(\\simplify[std]{{al^d}n^({a*d})+{be}n^{b}+{c}}\\right)^{1/\\var{d}}} {\\left(\\simplify[std]{{ga^d1}n^({a*d1})+{de}n^{b1}+{c1}}\\right)^{1/\\var{d1}}}&\\approx& \\frac{\\left(\\simplify[std]{{al^d}n^({a*d})}\\right)^{1/\\var{d}}} {\\left(\\simplify[std]{{ga^d1}n^({a*d1})}\\right)^{1/\\var{d1}}}\\\\ &=&\\frac{\\simplify[std]{{al^d}^(1/{d})n^{a}}} {\\simplify[std]{{ga^d1}^(1/{d1})n^{a}}}\\\\ &=&\\simplify[std]{{al}/{ga}} \\end{eqnarray*} \\]
Hence the limit is $\\displaystyle{\\simplify[std]{{al}/{ga}}}$

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$\\displaystyle{\\lim_{n \\to \\infty}\\left(\\frac{1}{n^{1/\\var{r}}}\\right)=\\;\\;}$[[0]]

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$\\displaystyle{\\lim_{n \\to \\infty}\\left(\\var{k1}^{1/n}\\right)=\\;\\;}$[[0]]

\n \n \n ", "marks": 0, "gaps": [{"allowFractions": false, "marks": 1, "maxValue": "1", "minValue": "1", "correctAnswerFraction": false, "showCorrectAnswer": true, "scripts": {}, "type": "numberentry", "showPrecisionHint": false}], "showCorrectAnswer": true, "scripts": {}, "type": "gapfill"}, {"prompt": "\n \n \n

$\\displaystyle{\\lim_{n \\to \\infty}\\left(\\var{k}^{1/n}\\right)=\\;\\;}$[[0]]

$\\displaystyle \\lim_{n \\to \\infty}\\left(\\simplify[std]{({c}n+{d})/({al}n-{ga})}\\right)\\;=\\;$[[0]]

Enter your answer as a fraction or integer, not as a decimal.

\n ", "marks": 0, "gaps": [{"notallowed": {"message": "

Enter your answer as a fraction or integer, not as a decimal.

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$\\displaystyle{\\lim_{n \\to \\infty}\\left(\\simplify[std]{{c}/{n}}\\right)^n=\\;\\;}$[[0]]

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$\\displaystyle{\\lim_{n \\to \\infty}\\left(\\simplify[std]{1+{a3}/({b3}n)}\\right)^n=\\;\\;}$[[0]]
Input your answer to 4 decimal places.

\n \n \n ", "marks": 0, "gaps": [{"allowFractions": false, "marks": 1, "maxValue": "val+tol", "minValue": "val-tol", "correctAnswerFraction": false, "showCorrectAnswer": true, "scripts": {}, "type": "numberentry", "showPrecisionHint": false}], "showCorrectAnswer": true, "scripts": {}, "type": "gapfill"}, {"prompt": "\n \n \n

$\\displaystyle{\\lim_{n \\to \\infty}\\frac{\\left(\\simplify[std]{{al^d}n^({a*d})+{be}n^{b}+{c}}\\right)^{1/\\var{d}}}\n \n {\\left(\\simplify[std]{{ga^d1}n^({a*d1})+{de}n^{b1}+{c1}}\\right)^{1/\\var{d1}}}=\\;\\;}$[[0]]

\n \n \n \n

Enter your answer as a fraction or integer, not as a decimal.

\n \n \n ", "marks": 0, "gaps": [{"notallowed": {"message": "

Enter your answer as a fraction or integer, not as a decimal.

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What are the following limits?

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(abs(a3) / (b3 * 100))) ^ 100,5)", "templateType": "anything", "group": "Ungrouped variables", "name": "v610", "description": ""}, "b1": {"definition": "a*d1-1", "templateType": "anything", "group": "Ungrouped variables", "name": "b1", "description": ""}, "ga": {"definition": "random(2..5)", "templateType": "anything", "group": "Ungrouped variables", "name": "ga", "description": ""}, "b3": {"definition": "switch(ab=1,random(2..9),ab=2,random(3,5,7,9),ab=3,random(2,4,5,7,8),random(3,5,7,9))", "templateType": "anything", "group": "Ungrouped variables", "name": "b3", "description": ""}, "d2": {"definition": "random(2..5)", "templateType": "anything", "group": "Ungrouped variables", "name": "d2", "description": ""}, "d1": {"definition": "if(d2=d,d+1,d2)", "templateType": "anything", "group": "Ungrouped variables", "name": "d1", "description": ""}, "val": {"definition": "precround(exp(a3/b3),4)", "templateType": "anything", "group": "Ungrouped variables", "name": "val", "description": ""}, 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"description": ""}, "v45": {"definition": "precround((c * 100 + d) / (al * 100 -ga),5)", "templateType": "anything", "group": "Ungrouped variables", "name": "v45", "description": ""}, "tol": {"definition": "0", "templateType": "anything", "group": "Ungrouped variables", "name": "tol", "description": ""}, "v210": {"definition": "precround(k1^(1/5000),5)", "templateType": "anything", "group": "Ungrouped variables", "name": "v210", "description": ""}, "v250": {"definition": "precround(k1^(1/5000000),5)", "templateType": "anything", "group": "Ungrouped variables", "name": "v250", "description": ""}, "be": {"definition": "random(-5..5)", "templateType": "anything", "group": "Ungrouped variables", "name": "be", "description": ""}, "v25": {"definition": "precround(k1^(1/100),5)", "templateType": "anything", "group": "Ungrouped variables", "name": "v25", "description": ""}, "v65": {"definition": "precround((1 + s5 * (abs(a3) / (b3 * 10))) ^ 10,5)", "templateType": "anything", "group": "Ungrouped variables", "name": "v65", "description": ""}, "de": {"definition": "random(-5..5)", "templateType": "anything", "group": "Ungrouped variables", "name": "de", "description": ""}, "v450": {"definition": "precround((c * 5000000 + d) / (al * 5000000 -ga),5)", "templateType": "anything", "group": "Ungrouped variables", "name": "v450", "description": ""}, "a3": {"definition": "s5*random(1..4)", "templateType": "anything", "group": "Ungrouped variables", "name": "a3", "description": ""}, "c1": {"definition": "s1*random(2..9)", "templateType": "anything", "group": "Ungrouped variables", "name": "c1", "description": ""}, "v350": {"definition": "precround(k^(1/5000000),5)", "templateType": "anything", "group": "Ungrouped variables", "name": "v350", "description": ""}, "a": {"definition": "random(2..4)", "templateType": "anything", "group": "Ungrouped variables", "name": "a", "description": ""}, "c": {"definition": "s1*random(11..50)", "templateType": "anything", "group": "Ungrouped variables", "name": "c", "description": ""}, "b": {"definition": "a*d-random(1..3)", "templateType": "anything", "group": "Ungrouped variables", "name": "b", "description": ""}, "v550": {"definition": "precround((c/n)^50,5)", "templateType": "anything", "group": "Ungrouped variables", "name": "v550", "description": ""}, "d": {"definition": "random(2..5)", "templateType": "anything", "group": "Ungrouped variables", "name": "d", "description": ""}, "v510": {"definition": "precround((c/n)^29,5)", "templateType": "anything", "group": "Ungrouped variables", "name": "v510", "description": ""}, "k": {"definition": "random(2..20#0.5)", "templateType": "anything", "group": "Ungrouped variables", "name": "k", "description": ""}, "v410": {"definition": "precround((c * 5000 + d) / (al * 5000 -ga),5)", "templateType": "anything", "group": "Ungrouped variables", "name": "v410", "description": ""}, "n": {"definition": "abs(c)+random(2..5)", "templateType": "anything", "group": "Ungrouped variables", "name": "n", "description": ""}, "r": {"definition": "random(2..10)", "templateType": "anything", "group": "Ungrouped variables", "name": "r", "description": ""}, "v310": {"definition": "precround(k^(1/5000),5)", "templateType": "anything", "group": "Ungrouped variables", "name": "v310", "description": ""}, "v660": {"definition": "precround((1 + s5 * (abs(a3) / (b3 * 10000))) ^ 10000,5)", "templateType": "anything", "group": "Ungrouped variables", "name": "v660", "description": ""}}, "metadata": {"notes": "\n \t\t

4/07/2012:

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Added tags.

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Improved display of prompt for fourth part.

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Improved display of solution to fourth part.

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Checked calculations.

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No tolerance on answer to 6th part, got to be exact to 4dps. Tolerance variable, tol=0.

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21/07/2012:

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Added description.

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27/7/2012:

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Added tags.

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Question appears to be working correctly.

\n \t\t", "description": "

Seven standard elementary limits of sequences.

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