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#!/usr/bin/python2

"""
Each new term in the Fibonacci sequence is generated by adding the previous two terms. By starting with 1 and 2, the first 10 terms will be:
1, 2, 3, 5, 8, 13, 21, 34, 55, 89, ...
By considering the terms in the Fibonacci sequence whose values do not exceed four million, find the sum of the even-valued terms.
"""

odd, even = 0,1
total = 0
while True:
    odd = odd + even  #Odd
    even = odd + even     #Even
    if even < 4000000:
        total += even
    else:
        break
print total

My algo:

  1. If I take first 2 numbers as 0, 1; the number that I find first in while loop will be an odd number and first of Fibonacci series.
  2. This way I calculate the even number and each time add the value of even to total.
  3. If value of even is greater than 4e6, I break from the infinite loop.

I have tried so much but my answer is always wrong. Googling says answer should be 4613732 but I always seem to get 5702886

Thanks for the support.

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3  
Is this homework? –  SpeedBirdNine Jan 29 '12 at 13:37
3  
This is PE problem 2: projecteuler.net/index.php?section=problems&id=2 –  larsmans Jan 29 '12 at 13:41

10 Answers 10

up vote 8 down vote accepted

Basically what you're doing here is adding every second element of the fibonacci sequence while the question asks to only sum the even elements.

What you should do instead is just iterate over all the fibonacci values below 4000000 and do a if value % 2 == 0: total += value. The % is the remainder on division operator, if the remainder when dividing by 2 equals 0 then the number is even.

E.g.:

prev, cur = 0, 1
total = 0
while True:
    prev, cur = cur, prev + cur
    if cur >= 4000000:
        break
    if cur % 2 == 0:
        total += cur
print(total)
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def fibonacci_iter(limit):
    a, b = 0, 1
    while a < limit:
        yield a
        a, b = b, a + b

print sum(a for a in fibonacci_iter(4e6) if not (a & 1))
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Your code includes every other term, not the even-valued ones. To see what's going on, print even just before total += even - you'll see odd numbers. What you need to do instead is check the number you're adding to the total for evenness with the modulo operator:

total = 0
x, y = 0, 1
while y < 4000000:
    x, y = y, x + y
    if x % 2:
        continue
    total += x

print total
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1  
You're lucky the first number above 4 million isn't even because you're still checking to see the number 5702887 is even. If the limit would be different (i.e. try < 400) this will lead to incorrect results. –  Rob Wouters Jan 29 '12 at 13:47
    
Thanks for the catch, fixed. –  AdamKG Jan 29 '12 at 13:54

it should be:

odd, even = 1,0

Also, every third numer is even (even + odd + odd = even).

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Thanks for the answer but that results in 3524577. It isn't right. –  yetanotherstacker Jan 29 '12 at 13:43
    
read the whole answer. your result is an odd number. –  Karoly Horvath Jan 29 '12 at 13:44

If you add every second value of the fibonacci sequence you'll get the next fibonacci value after the last added value. For example:

f(0) + f(2) + f(4) = f(5)
0 + 1 + 3 + 8 = 13

But your code currently does not add the first even value 1.

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Other answers are correct but note that to just add all even numbers in an array, just do myarray=[1, 2, 3, 5, 8, 13, 21, 34, 55, 89]

sum(map(lambda k:k if k%2 else 0, myarray))

or

sum([k if k%2 else 0 for k in [1,2,3,4,5]])
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Every 3rd item in the Fibonnaci sequence is even. So, you could have this:

prev, cur = 0, 1
count = 1
total = 0
while True:
    prev, cur = cur, prev + cur
    count = count + 1
    if cur >= 4000000:
        break
    if count % 3 == 0:
        total += cur
print(total)

or this (changing your code as little as possible):

even, odd = 0,1                       # this line was corrected
total = 0
while True:
    secondOdd = even + odd                   # this line was changed
    even = odd + secondOdd     #Even         # this line was changed
    if even < 4000000:
        total += even
        odd = secondOdd + even               # this line was added
    else:
        break
print total

Another way would be (by the use of some simple math) to check that the sum of a2+a5+a8+a11+...+a(3N+2) (the sum of even Fibonacci values) is equal to (a(3N+4)-1)/2. So, if you can calculate directly that number, there is no need to calculate all the previous Fibonacci numbers.

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not sure if your question is already answered or you've found a solution, but here's what you're doing wrong. The problem asks you to find even-valued terms, which means that you'll need to find every value in the fibonacci sequence which can be divided by 2 without a remainder. The problem does not ask you to find every even-indexed value. Here's the solution to your problem then, which gives a correct answer:

i = 1
total = 0
t = fib(i)
while t <= 4000000:
    t = fib(i)
    if t % 2 == 0:
        total += t
    i += 1
print total

Basically you loop through every each value in fibonacci sequence, checking if value is even by using 'mod' (% operator) to get remainder, and then if it's even you add it to sum.

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Here is simple solution in C:

#include <stdio.h>
#include <stdlib.h>

int main()
{
int i=1,j=1,sum=0;
    while(i<4000000)
    {
    i=i+j;
    j=i-j;
    if(i%2==0)
    sum+=i;
    }
printf("Sum is: %d",sum);

}
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Java style;

    int[] pivot = new int[100000];
    int counter = 0;

    for (int j = 0; j < pivot.length; j++) {

        if (j == 0) {
            pivot[j] = 1;
        } else if (j == 1){
            pivot[j] = 2;
        }else {
            pivot[j] = pivot[j-1] + pivot[j-2]; 
            // if you want to break loop before 4 mil.
            if (pivot[j] >= 4000000) {
                System.out.println(pivot[j-1]);
                System.out.println(pivot[j]);
                break;
            }
        }
    }
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