# Better way to write this in Ruby?

I'm new to Ruby. After a ton of refactoring I came down to this. Is there a better way to write this?

`````` 51   def tri_num?(n)
52     i = 1
53     while i < n
54       return i if i * (i + 1) / 2 == n
55       i += 1
56     end
57     raise InvalidTree
58   end
``````
-
define 'better'? You mean visually, or speed? Because if it's the latter you care about, a while loop is probably the fastest. I agree it's not too visually appealing though. Check out Fixnum#times: `n.times { |i| return i if i * (i + 1) / 2 == n` for example –  Lee Jarvis Oct 4 '11 at 23:18

``````def tri_num? n

i = (0.5*(-1.0 + Math.sqrt(1.0 + 8.0*n))).to_i

if i*(i+1)/2 == n
return i
else
raise InvalidTree
end

end
``````

Though I don't know if `tri_num?` is a good name. Usually a function ending with a ? should return `true` or `false`.

-
I'm not acquainted with that equation, any reference? –  CamelCamelCamel Oct 4 '11 at 23:33
I just did a little algebra and solved the quadratic equation i^2 + i - 2*n = 0. –  dantswain Oct 4 '11 at 23:42
I wish I had math skills. Good solution. –  CamelCamelCamel Oct 4 '11 at 23:47

Yes.

``````def tri_num?(n)
1.upto(n-1) do |i|
return i if i * (i + 1) / 2 == n
end
raise InvalidTree
end
``````
-
+1 :) you beat me by a few seconds –  Tilo Oct 4 '11 at 23:19
Isn't this wasting cycles? say n is 11, which is not a triangle number: this is running up until the 10th triangle number which is 55, way above n. –  CamelCamelCamel Oct 4 '11 at 23:21
My algorithm is basically the same as the one you originally posted in the question, but it is just written more concisely. Your algorithm has the same inefficiency. I noticed it but did not bother to improve it. A "break" statement at the appropriate time would make this algorithm more efficient in the case where it raises an exception. –  David Grayson Oct 5 '11 at 5:24

I thought the same as dantswain, basically invert the equation:

``````=> i * (i + 1) / 2 = n
=> i * (i + 1) = 2*n
=> i^2 + i = 2*n
=> i^2 + i -2*n = 0
``````

And the solutions for the above are:

``````i = (-1 +- sqrt(1+8n))/2
``````

Here I don't consider the `-` solution as it will give negative for any value of n bigger than 0, in the end the code is:

``````def tri_num?(n)
i = (-1 + Math.sqrt(1 + 8*n))/2.0
return i.to_i if i == i.to_i
raise InvalidTree
end
``````
-
``````def tri_num?(n)
Don't you mean `(1...n)`? You could also do `(1...n).find { |i| i * (i + 1) / 2 == n } or raise InvalidTree`. –  mu is too short Oct 4 '11 at 23:31
You're looking at the wrong end of the range, there is no `i` when you `(i...n)`. –  mu is too short Oct 4 '11 at 23:41