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Im new to python and although this following question seems easy I cant seem to get it right. After I put my input for n in the code and cant think of a way to get a formula that works.

This is the question: Write a program that asks the user for a positive even integer input n, and the outputs the sum 2+4+6+8+...+n, the sum of all the positive even integers up to n.

thanks for any help!!!

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Post your current code. –  Blender Jul 25 '13 at 0:30

4 Answers 4

Two tips, since this is an assignment and you haven't posted any code.

  1. The range function can produce the list you want. It takes 3 parameters, the start of the list, the stop (which is not included in the list), and the step. Since you're counting every other number, your step is 2.

  2. The sum function would be quite useful.

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Apparently the result you are looking for is twice the sum of the integers in [1, n/2], which evaluates to (n/2)*(n/2 + 1)/2. The formula you are looking for hence is (n/2)*(n/2 + 1).

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Which can be written as n*(n+2)/4 –  gnibbler Jul 25 '13 at 0:41

Simplest, but will give incorrect answer for odd or negative numbers:

n=int(raw_input('Enter a positive even integer:'))
print n*(n+2)/4

Gives correct answer for odd and negative numbers:

n=int(raw_input('Enter a positive even integer:')) >>1<<1
print n*(n+2)/4 if n>0 else 0


n=int(raw_input('Enter a positive even integer:'))
print sum(range(2, n+1, 2))
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Im using 3.3 which is just input instead of raw_input, however I seem to get invalid syntax messages? –  user2616576 Jul 25 '13 at 1:31

Suppose n=8. range gives you a list of the numbers you wish to add

>>> range(2, n+1,2)
[2, 4, 6, 8]

and sum gives you a way to add up the entries in the list

>>> sum(range(2, n+1, 2))

It's possible to calculate the sum without adding all the individual numbers using this formula

>>> n*(n+2)/4

But you should probably show how to derive the formula if you intend to use that answer.

Here is a sketch for n=12, A represents 10 and C represents 12


Looking at the top row, we see that this rectangle is (n+2) wide. And after a little thought you'll see that the height is n/4. The sum, is then just the product of those two terms.

A similar argument can work when n is not divisable by 4.

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