6390
/www/nrich/html/content/id/6390/
1
2011-02-01T00:00:01
<mdoxml version="1.0"><p>In the following grid, how many pairs of numbers can you find that add up to a multiple of 11?<br></br>
</p>
<table border="1">
<tbody>
<tr>
<td style="text-align: right;">9</td>
<td style="text-align: right;">46</td>
<td style="text-align: right;">79</td>
<td style="text-align: right;">13</td>
</tr>
<tr>
<td style="text-align: right;">64</td>
<td style="text-align: right;">90</td>
<td style="text-align: right;">2</td>
<td style="text-align: right;">97</td>
</tr>
<tr>
<td style="text-align: right;">25</td>
<td style="text-align: right;">31</td>
<td style="text-align: right;">20</td>
<td style="text-align: right;">22</td>
</tr>
<tr>
<td style="text-align: right;">4</td>
<td style="text-align: right;">52</td>
<td style="text-align: right;">55</td>
<td style="text-align: right;">7</td>
</tr>
</tbody>
</table>
<br></br>
<p>Do you notice anything interesting?<br></br>
<br></br>
Can you find all the pairs?<br></br>
<br></br>
Could you convince someone that you haven't missed any?<br></br>
<br></br>
Here is another grid. This time we are interested in pairs that add up to a multiple of 13. How can you use your insights from above to find all the possible pairings?<br></br>
</p>
<table border="1">
<tbody>
<tr>
<td style="text-align: right;">11</td>
<td style="text-align: right;">54</td>
<td style="text-align: right;">93</td>
<td style="text-align: right;">15</td>
</tr>
<tr>
<td style="text-align: right;">76</td>
<td style="text-align: right;">106</td>
<td style="text-align: right;">2</td>
<td style="text-align: right;">115</td>
</tr>
<tr>
<td style="text-align: right;">29</td>
<td style="text-align: right;">37</td>
<td style="text-align: right;">24</td>
<td style="text-align: right;">26</td>
</tr>
<tr>
<td style="text-align: right;">4</td>
<td style="text-align: right;">62</td>
<td style="text-align: right;">65</td>
<td style="text-align: right;">9</td>
</tr>
</tbody>
</table>
<br></br>
<br></br>
<p><span class="editorial">Thank you to Susanne Mallett from Comberton Village College for introducing us to this problem.</span></p>
<br></br>
<p><a href="http://nrich.maths.org/8004">Click here for a poster of this problem</a>.</p></mdoxml>
<mdoxml version="1.0"><br></br>
<span class="editorial">Megan from the Thomas Deacon Academy used a
spreadsheet to find all 28 pairs of numbers that add up to a
multiple of 11. This is how she did it:</span><br></br>
<br></br>
To work out the first box I started with 9, adding the rest of the
numbers, and then moved on to 46, but didn't do 46 add 9 since it
had already been done. Ithen carried this out through out the table
but making sure I had not done any in front of the number I was
working on as it would have already been done.<br></br>
<br></br>
Then I highlighted all the answers that are in the 11 times
table.<br></br>
In the <a href="/content/id/6390/Elevenspreadsheet.xls">attached
document</a> are my notes.<br></br>
<br></br>
<span class="editorial">Alex from St. Anne's School noticed
something special about the numbers in some of the
pairs:</span><br></br>
<br></br>
There were over 25 different pairs of numbers wich totalled a
multiple of 11.<br></br>
We noticed that the numbers we added to 9, 20 and 31 were all the
same:<br></br>
<br></br>
9+46=55<br></br>
9+79=88<br></br>
9+13=22<br></br>
9+90=99<br></br>
9+2=11<br></br>
<br></br>
20+46=66<br></br>
20+79=99<br></br>
20+13=33<br></br>
20+90=110<br></br>
20+2=22<br></br>
<br></br>
31+46=77<br></br>
31+79=110<br></br>
31+13=44<br></br>
31+90=121<br></br>
31+2=33<br></br>
<br></br>
The difference between 9 and 20 is 11 andthe difference between 20
and 1 is 11.<br></br>
When we added 11 to 31 and made 42. We added 46, 79, 13, 90 and 2
to this number and found that each result was a multiple of
11.<br></br>
<br></br>
<p><span class="editorial">Jack and Zaim from London sent us</span>
<a href="/content/id/6390/ElevensesSolution.doc">this very clear
explanation</a> <span class="editorial">of why this
happens.</span><br></br>
</p>
<p><span class="editorial">Curtis from Shatin College used a
similar strategy</span> :</p>
<p>I divided all of the numbers by 11 and wrote down their
remainders. Then I wrote a chart of them, in the same spot. After
that, I checked in the remainder box for any pairs that added up to
11. Finally I transfered the numbers back on to the provided grid,
and came up with 28 solutions for both the 11's and the 13's.</p>
<p><span class="editorial">Adil from Valentines High School
discovered the same property of the numbers that could be
paired:</span></p>
<div>We made a spreadsheet to add all the pairs in the grid and we
found a rule:</div>
<ul>
<li>The numbers that are of the form 11X+2 or 11X-2 will pair up to
give a multiple of 11.</li>
<li>Obviously pairs of multiples of 11 will add to be a multiple of
11.</li>
<li>Finally single digit numbers will pair with another number of
the form 11X minus the single digit number itself.</li>
</ul>
<br></br>
<div>Spreadsheet <a href="/content/id/6390/qrsQy2-invest.xlsx">attatched</a></div>
<br></br>
<span class="editorial">Well done to you all.</span><br></br></mdoxml>
<mdoxml version="1.0"><br></br>
<h3>Why do this problem?</h3>
On first inspection this appears to be an opportunity to practice
mental calculation strategies, but it soon becomes apparent that
this context offers an opportunity to think about the structure of
numbers, and multiples in particular.<br></br>
<br></br>
<h3>Possible approach</h3>
Give out <a href="/content/id/6390/elevensesgrid.doc">the grid</a>
and allow a little time for the students to find a couple of pairs
that add to a multiple of 11. Collect suggestions and display on
the board.<br></br>
Set the challenge - how many can they find? Can anyone find them
all?<br></br>
<br></br>
When they are well into the problem, stop them and ask "What have
you noticed about the pairings?" Collect ideas and note them on the
board. If no one has suggested it, draw attention to the pairings
involving 9, 20 and 31.<br></br>
"What is special about these numbers? What is special about their
'partners'?"<br></br>
<br></br>
Suggest that they return to the problem and use this insight to
find out how many pairings are possible.<br></br>
Can this be done without listing them?<br></br>
<br></br>
When appropriate, bring the class together and draw out ideas that
lead to an efficient strategy.<br></br>
Offer the <a href="/content/id/6390/thirteensgrid.doc">follow up
grid</a> to consolidate the strategy.<br></br>
<br></br>
<h3>Key questions</h3>
What is special about the numbers in each pairing?<br></br>
Are there some numbers that can only be used once? Why?<br></br>
Are there some numbers that can be used many times? Why?<br></br>
<br></br>
<h3>Possible extension</h3>
Both grids contain less than 30 possible pairings. Can you produce
a grid of numbers that has more than 30? What is the maximum number
of possible pairings in a 4x4 grid?<br></br>
<br></br>
<a href="http://nrich.maths.org/public/viewer.php?obj_id=564&part=">Legs
Eleven</a> may provide an interesting follow-up challenge.<br></br>
<h3><br></br>
Possible support</h3>
The grid below could be used to ask students to find pairs that add
to a multiple of 10.<br></br>
The key questions are useful prompts to focus students on the
structure of the numbers rather than multiple calculations. This
could be useful preparation before going on to the main
problem.<br></br>
<table border="1">
<tbody>
<tr>
<td style="text-align: right;">8</td>
<td style="text-align: right;">42</td>
<td style="text-align: right;">72</td>
<td style="text-align: right;">12</td>
</tr>
<tr>
<td style="text-align: right;">58</td>
<td style="text-align: right;">82</td>
<td style="text-align: right;">2</td>
<td style="text-align: right;">88</td>
</tr>
<tr>
<td style="text-align: right;">23</td>
<td style="text-align: right;">28</td>
<td style="text-align: right;">18</td>
<td>
<div style="text-align: right;">20</div>
</td>
</tr>
<tr>
<td style="text-align: right;">4</td>
<td style="text-align: right;">47</td>
<td style="text-align: right;">50</td>
<td style="text-align: right;">6</td>
</tr>
</tbody>
</table>
<br></br>
<a href="/content/id/6390/elevenses.doc">This image</a> may be
useful to show the students that the sum of two multiples of 11 is
a multiple of 11, and the sum of two numbers in the form 11n+2,
11n-2 is a multiple of 11 as well.<br></br></mdoxml>
<mdoxml version="1.0"><br></br>
What can you combine with 9? <br></br>
What can you combine with 20?<br></br>
What can you combine with 31?<br></br>
What is special about these numbers?<br></br>
What is special about their partners?<br></br></mdoxml>
<mdoxml version="1.0"><table border="1">
<tr>
<td>11n-2</td>
<td>11n+2</td>
<td>11n+2</td>
<td>11n+2</td>
</tr>
<tr>
<td>11n-2</td>
<td>11n+2</td>
<td>11n+2</td>
<td>11n-2</td>
</tr>
<tr>
<td>11n+3</td>
<td>11n-2</td>
<td>11n-2</td>
<td>11n</td>
</tr>
<tr>
<td>11n+4</td>
<td>11n-3</td>
<td>11n</td>
<td>11n-4</td>
</tr>
</table>
<br></br>
<table border="1">
<tr>
<td>13n-2</td>
<td>13n+2</td>
<td>13n+2</td>
<td>13n+2</td>
</tr>
<tr>
<td>13n-2</td>
<td>13n+2</td>
<td>13n+2</td>
<td>13n-2</td>
</tr>
<tr>
<td>13n+3</td>
<td>13n-2</td>
<td>13n-2</td>
<td>13n</td>
</tr>
<tr>
<td>13n+4</td>
<td>13n-3</td>
<td>13n</td>
<td>13n-4</td>
</tr>
</table>
<br></br>
<br></br></mdoxml>
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Elevenses
How many pairs of numbers can you find that add up to a multiple of
11? Do you notice anything interesting about your results?
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Properties of numbers
Numbers and the Number System
Divisibility
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