7

OBJECTIVE

Given two numbers in an array, sum all the numbers including (and between) both integers (e.g [4,2] -> 2 + 3 + 4 = 9).

I've managed to solve the question but was wondering if there is a more elegant solution (especially using Math.max and Math.min) - see below for more questions...

MY SOLUTION

//arrange array for lowest to highest number
function order(min,max) {
  return min - max;
}


function sumAll(arr) {
  var list = arr.sort(order);
  var a = list[0]; //smallest number
  var b = list[1]; //largest number
  var c = 0;

  while (a <= b) {
    c = c + a; //add c to itself
    a += 1; // increment a by one each time
  }

  return c;
}

sumAll([10, 5]);

MY QUESTION(S)

  1. Is there a more efficient way to do this?
  2. How would I use Math.max() and Math.min() for an array?
  • 1
    What you are trying to do is to find the sum of the elements of an arithmetic series. There is a formula for that that does not require looping. – hugomg May 21 '15 at 23:37
  • elegant way would be to use jquery – Ritesh Karwa May 21 '15 at 23:37
  • 2
    @RiteshK I can't even tell if you're being more serious because you couldn't be more wrong. – Etheryte May 21 '15 at 23:43
12
var array = [4, 2];
var max = Math.max.apply(Math, array); // 4
var min = Math.min.apply(Math, array); // 2

function sumSeries (smallest, largest) {
    // The formulate to sum a series of integers is
    // n * (max + min) / 2, where n is the length of the series.
    var n = (largest - smallest + 1);
    var sum = n * (smallest + largest) / 2; // note integer division

    return sum;
}

var sum = sumSeries(min, max);
console.log(sum);
| improve this answer | |
  • I am going to mark this answer as the correct answer as I asked for an example using Math.min and Math.max – jonplaca May 22 '15 at 3:11
19

Optimum algorithm

function sumAll(min, max) {
    return ((max-min)+1) * (min + max) / 2;
}
| improve this answer | |
  • 1
    Oh the genius Gauss himself in javascript, I was just about to submit this. – dbarnes May 21 '15 at 23:44
  • Thank you for this - looks like I need to brush up on my Algorithms :) – jonplaca May 21 '15 at 23:49
  • Wasn't Guass 10 when he realized that? @dbarnes – Tobias May 21 '15 at 23:56
  • sumAll(1,0) how solve this ? when 1 + 0 is 1 it's returns 0 – user13198697 Apr 12 at 21:10
2

The sum of the first n integers (1 to n, inclusive) is given by the formula n(n+1)/2. This is also the nth triangular number.

         S1 = 1 + 2 + ... + (a-1) + a + (a+1) + ... + (b-1) + b
            = b(b+1)/2
         S2 = 1 + 2 + ... + (a-1)
            = (a-1)a/2
    S1 - S2 = a + (a+1) + ... + (b-1) + b
            = (b(b+1)-a(a-1))/2

Now we have a general formula for calculating the sum. This will be much more efficient if we are summing a large range (e.g. 1 million to 2 million).

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0

Here is a one liner recursive program solution of SumAll using es6.

const SumAll = (num, sum = 0) =>  num - 1 > 0 ? SumAll(num-1,sum += num) : sum+num;
console.log(SumAll(10));

Note :: Although the best Example is using the Algorithm, as mentioned above. However if the above can be improved.

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