Assignment 8

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course MTH 151

12:30 2/19/13

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Question: `q001. There are seven questions in this set.

See if you can figure out a strategy for quickly adding the numbers 1 + 2 + 3 + ... + 100, and give your result if you are successful. Don't spend more than a few minutes on your attempt.

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Your solution:

You will have 50 pairs that add up to 101 (2+99=101, 3+98=101, 4+97=101…)

Therefore you would multiply 50 and 101 and come up with 5050

confidence rating #$&*: 3

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Given Solution:

These numbers can be paired as follows:

1 with 100,

2 with 99,

3 with 98, etc..

There are 100 number so there are clearly 50 pairs. Each pair adds up to the same thing, 101. So there are 50 pairs each adding up to 101. The resulting sum is therefore

total = 50 * 101 = 5050.

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Self-critique (if necessary):

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Self-critique Rating:

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Question: `q002. See if you can use a similar strategy to add up the numbers 1 + 2 + ... + 2000.

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Your solution:

You would begin by pairing up the numbers like you did in the previous question and then multiply the pairs by the total that you get when you add the pairs to come up with the answer

1000 * 2001 = 2,001,000

confidence rating #$&*: 3

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Given Solution:

Pairing 1 with 2000, 2 with 1999, 3 with 1998, etc., and noting that there are 2000 numbers we see that there are 1000 pairs each adding up to 2001.

So the sum is 1000 * 2001 = 2,001,000.

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Self-critique (if necessary):

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Self-critique Rating:

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Question: `q003. See if you can devise a strategy to add up the numbers 1 + 2 + ... + 501.

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Your solution:

The number is an odd number so you cannot add up the pairs to get an answer like you did in the previous questions

Quickly and without spending a large amount of time on the question I am unable to find the correct answer, it seems more difficult than the others while I am sure there is a simple solution I am missing.

confidence rating #$&*: 0

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Given Solution:

We can pair 1 with 501, 2 with 500, 3 with 499, etc., and each pair will have up to 502. However there are 501 numbers, so not all of the numbers can be paired. The number in the 'middle' will be left out.

However it is easy enough to figure out what that number is, since it has to be halfway between 1 and 501. The number must be the average of 1 and 501, or (1 + 501) / 2 = 502 / 2 = 251. Since the other 500 numbers are all paired, we have 250 pairs each adding up to 502, plus 251 left over in the middle.

The sum is 250 * 502 + 251 = 125,500 + 251 = 125,751.

Note that the 251 is half of 502, so it's half of a pair, and that we could therefore say that we effectively have 250 pairs and 1/2 pair, or 250.5 pairs.

250.5 is half of 501, so we can still calculate the number of pairs by dividing the total number of number, 501, by 2.

The total sum is then found by multiplying this number of pairs by the sum 502 of each pair:

250.5 * 502 = 125,766.

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Self-critique (if necessary):

I do not understand why we would automatically find the half way mark to devise a quick solution to the problem, to me this seems very time consuming and a brain teaser

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Self-critique Rating: OK

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In a progression like this one the numbers go up by the same amount each time, so if we pair the first with the last, the second with the next-to-last, etc., the total of each pair remains the same.

However if the number of numbers is odd, there is one left over in the middle. That number will have halfway between the one preceding it and the one following it. It will also be halfway between any two of our paired numbers, including the first and the last.

So, given a series with an odd number of numbers, if we average the first and the last we get the number in the middle.

Adding this to the sum of all our pairs gives us the total of the sequence.
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Question: `q004. Use this strategy to add the numbers 1 + 2 + ... + 1533.

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Your solution:

1533 / 2 = 766.5

1534 * 766.5 = 1,175,811

confidence rating #$&*:

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Given Solution:

Pairing the numbers, 1 with 1533, 2 with 1532, etc., we get pairs which each adult to 1534. There are 1533 numbers so there are 1533 / 2 = 766.5 pairs. We thus have a total of 1534 * 766.5, whatever that multiplies out to (you've got a calculator, and I've only got my unreliable head).

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Self-critique (if necessary):

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Self-critique Rating: OK

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Question: `q005. Use a similar strategy to add the numbers 55 + 56 + ... + 945.

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Your solution:

I do not understand this question or the given answer it states that you have to add one and that has thrown me off also after trying to work it and not coming up with something I looked at the given answer and I am unsure of where the 1,000 came from and why you multiply it by 445.5. I understand where you get 445.5 but where did the 1000 come from?

confidence rating #$&*: 0

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Given Solution:

We can pair up 55 and 945, 56 and 944, etc., obtaining 1000 for each pair. There are 945 - 55 + 1 = 891 numbers in the sum (we have to add 1 because 945 - 55 = 890 tells us how many 1-unit 'jumps' there are between 55 and 945--from 55 to 56, from 56 to 57, etc.. The first 'jump' ends up at 56 and the last 'jump' ends up at 945, so every number except 55 is the end of one of the 890 'jumps'. But 55 is included in the numbers to be summed, so we have 890 + 1 = 891 numbers in the sum).

If we have 891 numbers in the sum, we have 891/2 = 445.5 pairs, each adding up to 1000.

So we have a total of 445.5 * 1000 = 445,500.

STUDENT COMMENT

I got very confused on this one. I don’t quite understand why you add a 1.

INSTRUCTOR RESPONSE

For example, how many numbers are there in the sum 5 + 6 + 7 + ... + 13 + 14 + 15?

15 - 5 = 10.

However there are 11 numbers in the sum (5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15).

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Self-critique (if necessary):

HELP

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The 1000 comes from 55 + 945 = 1000, 56 + 944 = 1000, 57 + 943 = 1000, etc.. The numbers can be arranged in pairs, each pair adding up to 1000, with possibly one number left over in the middle.

For the numbers from 4 to 13:

How many pairs of numbers are there?

What does each pair add up to?

After pairing, is there a number left over in the middle? If so what is it?

If you mark the numbers 4 through 13 on a number line, place your finger on the 4 and then 'jump' it from one number to the next, how many 'jumps' do you make?

How does the number of numbers from 4 to 13 compare with the number of 'jumps'?

Now how would you answer the same questions for the numbers from 55 through 945?

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Self-critique Rating:

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Question: `q006. Devise a strategy to add the numbers 4 + 8 + 12 + 16 + ... + 900.

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Your solution:

896 / 4 = 224

224 + 1= 225

225 / 2 = 112.5

112.5 * 904 = 101,700

confidence rating #$&*: 3

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Given Solution:

Pairing 4 with 900, 8 with 896, etc., we get pairs adding up to 904. The difference between 4 and 900 is 896.

The numbers 'jump' by 4, so there are 896 / 4 = 224 'jumps'. None of these 'jumps' ends at the first number so there are 224 + 1 = 225 numbers.

Thus we have 225 / 2 = 112.5 pairs each adding up to 904, and our total is 112.5 * 904.

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Self-critique (if necessary):

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Self-critique Rating: OK

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Question: `q007. What expression would stand for the sum 1 + 2 + 3 + ... + n, where n is some whole number?

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Your solution:

N + 1

N / 2

N / 2 + (N + 1) = (total)

confidence rating #$&*: 3

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Given Solution:

We can pair 1 and n, 2 and n-1, 3 and n-2, etc., in each case obtaining a sum of n + 1. There are n numbers so there are n/2 pairs, each totaling n + 1. Thus the total is n/2 * (n+1).

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Self-critique (if necessary):

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Self-critique rating:

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Question: `q007. What expression would stand for the sum 1 + 2 + 3 + ... + n, where n is some whole number?

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Your solution:

N + 1

N / 2

N / 2 + (N + 1) = (total)

confidence rating #$&*: 3

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Given Solution:

We can pair 1 and n, 2 and n-1, 3 and n-2, etc., in each case obtaining a sum of n + 1. There are n numbers so there are n/2 pairs, each totaling n + 1. Thus the total is n/2 * (n+1).

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Self-critique (if necessary):

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Self-critique rating:

#*&!

Assignment 8

&#Good responses. See my notes and let me know if you have questions. &#