# Sum of all numbers

I need to write a function that calculates the sum of all numbers n.

``````Row 1:          1
Row 2:         2 3
Row 3:        4 5 6
Row 4:       7 8 9 10
Row 5:     11 12 13 14 15
Row 6:   16 17 18 19 20 21
``````

It helps to imagine the above rows as a 'number triangle.' The function should take a number, n, which denotes how many numbers as well as which row to use. Row 5's sum is 65. How would I get my function to do this computation for any n-value?

For clarity's sake, this is not homework. It was on a recent midterm and needless to say, I was stumped.

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Hint: see the regularity in the leftmost numbers of each row? 1,2,4,7,11,16,... –  Junuxx Oct 11 '12 at 17:12
oeis.org/A006003 –  OrangeDog Oct 11 '12 at 18:36

The leftmost number in column 5 is `11 = (4+3+2+1)+1` which is `sum(range(5))+1`. This is generally true for any `n`.

So:

``````def triangle_sum(n):
start = sum(range(n))+1
return sum(range(start,start+n))
``````

As noted by a bunch of people, you can express `sum(range(n))` analytically as `n*(n-1)//2` so this could be done even slightly more elegantly by:

``````def triangle_sum(n):
start = n*(n-1)//2+1
return sum(range(start,start+n))
``````
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I would say the second version is actually slightly less elegant, but slightly more efficient. –  fletom Oct 11 '12 at 18:33
+1 nice solution. –  Ashwini Chaudhary Oct 11 '12 at 18:36

A solution that uses an equation, but its a bit of work to arrive at that equation.

``````def sumRow(n):
return int(1./2*(n**3+n))
``````
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best i could think of –  Rahul Gautam Oct 11 '12 at 17:32

The numbers 1, 3, 6, 10, etc. are called triangle numbers and have a definite progression. Simply calculate the two bounding triangle numbers, use `range()` to get the numbers in the appropriate row from both triangle numbers, and `sum()` them.

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Here is a generic solution:

``````start=1
n=5
for i in range(n):
start += len (range(i))
``````

As a function:

``````def trio(n):
start=1
for i in range(n):
start += len (range(i))
``````
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``````def sum_row(n):
final = n*(n+1)/2
start = final - n
return final*(final+1)/2 - start*(start+1)/2
``````

or maybe

``````def sum_row(n):
final = n*(n+1)/2
return sum((final - i) for i in range(n))
``````

How does it work:

The first thing that the function does is to calculate the last number in each row. For n = 5, it returns 15. Why does it work? Because each row you increment the number on the right by the number of the row; at first you have 1; then 1+2 = 3; then 3+3=6; then 6+4=10, ecc. This impy that you are simply computing 1 + 2 + 3 + .. + n, which is equal to n(n+1)/2 for a famous formula.

then you can sum the numbers from final to final - n + 1 (a simple for loop will work, or maybe fancy stuff like list comprehension) Or sum all the numbers from 1 to final and then subtract the sum of the numbers from 1 to final - n, like I did in the formula shown; you can do better with some mathematical operations

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``````def compute(n):