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I'm going through the ruby koans, I'm on 151 and I just hit a brick wall.

Here is the koan:

# You need to write the triangle method in the file 'triangle.rb'
require 'triangle.rb'

class AboutTriangleProject2 < EdgeCase::Koan
  # The first assignment did not talk about how to handle errors.
  # Let's handle that part now.
  def test_illegal_triangles_throw_exceptions
    assert_raise(TriangleError) do triangle(0, 0, 0) end
    assert_raise(TriangleError) do triangle(3, 4, -5) end
    assert_raise(TriangleError) do triangle(1, 1, 3) end
    assert_raise(TriangleError) do triangle(2, 4, 2) end
 end
end

Then in triangle.rb we have:

def triangle(a, b, c)
  # WRITE THIS CODE
  if a==b && a==c
    return :equilateral
  end
  if (a==b && a!=c) || (a==c && a!=b) || (b==c && b!=a)
    return :isosceles
  end
  if a!=b && a!=c && b!=c
    return :scalene
  end
  if a==0 && b==0 && c==0
    raise new.TriangleError
  end



end

# Error class used in part 2.  No need to change this code.
class TriangleError < StandardError

end

I am beyond confused - any help at all would be much appreciated!

EDIT: To complete this koan, I need to put something in the TriangleError class - but I have no idea what

UPDATE: Here is what the koan karma thing is saying:

<TriangleError> exception expected but none was thrown.
share|improve this question
    
What's the question here? –  Daniel Vandersluis Sep 30 '10 at 19:44
    
Hi Daniel - updated my question to be a little more clear –  Elliot Sep 30 '10 at 19:45
3  
Here's my minimal solution: gist.github.com/1126423 –  danneu Aug 4 '11 at 22:11
1  
@ColonelPanic: The geometric definition of a triangle is secondary, and very nearly irrelevant, here; the goal is to write code that passes the test shown at the beginning of the question. You can do that without knowing anything about geometry. (The reason the :equilateral etc are returned, is that this test builds upon a previous test that defined what should be returned.) –  cHao Oct 13 '12 at 21:51

28 Answers 28

up vote 27 down vote accepted
  1. A triangle should not have any sides of length 0. If it does, it's either a line segment or a point, depending on how many sides are 0.
  2. Negative length doesn't make sense.
  3. Any two sides of a triangle should add up to more than the third side.
  4. See 3, and focus on the "more".

You shouldn't need to change the TriangleError code, AFAICS. Looks like your syntax is just a little wacky. Try changing

raise new.TriangleError

to

raise TriangleError, "why the exception happened"

Also, you should be testing the values (and throwing exceptions) before you do anything with them. Move the exception stuff to the beginning of the function.

share|improve this answer
    
Hi cHao, thanks for your comment! I undestand when to raise the exceptions, I just dont understand what goes in the TriangleError class –  Elliot Sep 30 '10 at 19:55
3  
Doesn't the code itself say "No need to change this code"? It should just work. –  cHao Sep 30 '10 at 19:57
    
That was from part 1 of the class, in part 2 (this part) you do change the code –  Elliot Sep 30 '10 at 20:00
    
You sure? People don't normally say "you don't need to change this" if they require you to change it. –  cHao Sep 30 '10 at 20:05
    
I'm not 100% sure, I updated the question at the bottom. The koan won't let me proceed until I change something here. –  Elliot Sep 30 '10 at 20:06

You forgot the case when a,b, or c are negative:

def triangle(a, b, c)
  raise TriangleError if [a,b,c].min <= 0
  x, y, z = [a,b,c].sort
  raise TriangleError if x + y <= z
  [:equilateral,:isosceles,:scalene].fetch([a,b,c].uniq.size - 1)
end
share|improve this answer
    
Good correction, thank you! –  Sergey Zhizhin Jul 9 '12 at 10:03
1  
More concise if you sort first then test once with condition x <= 0 || x + y <= z. Also no need to use fetch as [a,b,c].uniq.size will always be in (1..3) owing to the fact that a,b,c are required parameters. –  SLD Nov 19 '13 at 15:39
1  
Concise. But I'm not sure if this much of brevity makes up for the sacrificed readability (esp. for the people who will be reading this code later). –  Halil Özgür Mar 27 at 7:08

I like Cory's answer. But I wonder if there's any reason or anything to gain by having four tests, when you could have two:

raise TriangleError, "Sides must by numbers greater than zero" if (a <= 0) || (b <= 0) || (c <= 0)
raise TriangleError, "No two sides can add to be less than or equal to the other side" if (a+b <= c) || (a+c <= b) || (b+c <= a)
share|improve this answer
    
Should work fine. The only useful difference is the ability to specify different error messages for, say, zero vs negative lengths. Which i don't really see a need for either. People are just doing 4 checks cause there's explicitly 4 cases that the test is checking for, and they're coding to pass the test. –  cHao Jun 3 '11 at 13:58
    
True, although greater than zero implies positive doesn't it? –  Matt Connolly Jun 6 '11 at 0:01
1  
Yep. But there are 4 tests the code has to pass, and some people do a tunnel vision thing where they focus only on the current test, ignoring all the others. I imagine someone will argue it's more correct or something from a TDD perspective, but yeah. There's no reason not to condense it to 2 checks, IMO. –  cHao Jun 6 '11 at 3:36

Ended up doing this:

def triangle(a, b, c)
  a, b, c = [a, b, c].sort
  raise TriangleError if a <= 0 || a + b <= c
  [nil, :equilateral, :isosceles, :scalene][[a, b, c].uniq.size]
end

Thanks to commenters here :)

share|improve this answer

You don't need to modify the Exception. Something like this should work;

def triangle(*args)
  args.sort!
  raise TriangleError if args[0] + args[1] <= args[2] || args[0] <= 0
  [nil, :equilateral, :isosceles, :scalene][args.uniq.length]
end
share|improve this answer

You definately do not update the TriangleError class - I am stuck on 152 myself. I think I need to use the pythag theorem here.

def triangle(a, b, c)
  # WRITE THIS CODE

  if a == 0 || b == 0 || c == 0
    raise TriangleError
  end

  # The sum of two sides should be less than the other side
  if((a+b < c) || (a+c < b) || (b+c < a))
    raise TriangleError
  end
  if a==b && b==c
    return :equilateral
  end
  if (a==b && a!=c) || (a==c && a!=b) || (b==c && b!=a)
    return :isosceles
  end
  if(a!=b && a!=c && b!=c)
    return :scalene
  end


end

# Error class used in part 2.  No need to change this code.
class TriangleError < StandardError
end
share|improve this answer
1  
What you've done is fine, but it's not the Pythagorean theorem ;) Pythagorean theorem states c^2 = a^2 + b^2 and is only valid for right-angled triangles. –  Jordan Arseno May 8 '11 at 6:00
2  
If you start by doing a, b, c = [a, b, c].sort you'll find the rest of your code becomes much simpler. ;) –  davidchambers Oct 16 '11 at 22:44
def triangle(a, b, c)
  [a, b, c].permutation do |sides|
    raise TriangleError unless sides[0] + sides[1] > sides[2]
  end
  case [a,b,c].uniq.size
    when 3; :scalene
    when 2; :isosceles
    when 1; :equilateral
  end
end
share|improve this answer

I ended up with this code:

def triangle(a, b, c)
    raise TriangleError, "impossible triangle" if [a,b,c].min <= 0
    x, y, z = [a,b,c].sort
    raise TriangleError, "no two sides can be < than the third" if x + y <= z

    if a == b && b == c # && a == c # XXX: last check implied by previous 2
        :equilateral
    elsif a == b || b == c || c == a
        :isosceles
    else
        :scalene
    end
end 

I don't like the second condition/raise, but I'm unsure how to improve it further.

share|improve this answer

I wanted a method that parsed all arguments effectively instead of relying on the order given in the test assertions.

def triangle(a, b, c)
  # WRITE THIS CODE
  [a,b,c].permutation { |p| 
     if p[0] + p[1] <= p[2]
       raise TriangleError, "Two sides of a triangle must be greater than the remaining side."
     elsif p.count { |x| x <= 0} > 0
       raise TriangleError, "A triangle cannot have sides of zero or less length."
     end
  }

  if [a,b,c].uniq.count == 1
    return :equilateral
  elsif [a,b,c].uniq.count == 2
    return :isosceles
  elsif [a,b,c].uniq.count == 3
    return :scalene
  end
end

Hopefully this helps other realize there is more than one way to skin a cat.

share|improve this answer
    
Nice functional approach to classification. Could use a case statement instead of if/elsif chain at the end to avoid repeating calls to uniq and count. –  Alex Blakemore Jun 24 '12 at 1:37

In fact in the following code the condition a <= 0 is redundant. a + b will always be less than c if a < 0 and we know that b < c

    raise TriangleError if a <= 0 || a + b <= c
share|improve this answer

Here is what I wrote and it all worked fine.

def triangle(a, b, c)
  # WRITE THIS CODE
  raise TriangleError, "Sides have to be greater than zero" if (a == 0) | (b == 0) | (c == 0)
  raise TriangleError, "Sides have to be a postive number" if (a < 0) | (b < 0) | (c < 0)
  raise TriangleError, "Two sides can never be less than the sum of one side" if ((a + b) < c) | ((a + c) < b) | ((b + c) < a)
  raise TriangleError, "Two sides can never be equal one side" if ((a + b) ==  c) | ((a + c) ==  b) | ((b + c) ==  a)
  return :equilateral if (a == b) & (a == c) & (b == c)
  return :isosceles if (a == b) | (a == c) | (b == c)
  return :scalene

end

# Error class used in part 2.  No need to change this code.
class TriangleError < StandardError
end
share|improve this answer
    
Any reason to do four tests when you can do this: ` raise TriangleError, "Sides must by numbers greater than zero" if (a <= 0) || (b <= 0) || (c <= 0) raise TriangleError, "No two sides can add to be less than or equal to the other side" if (a+b <= c) || (a+c <= b) || (b+c <= a) ` –  Matt Connolly Apr 2 '11 at 14:44
2  
Why are you using a single pipe (|)? –  Andrew Grimm Aug 12 '11 at 3:38

You have to check that the new created triangle don't break the "Triangle inequality". You can ensure this by this little formula.

if !((a-b).abs < c && c < a + b)
  raise TriangleError
end

When you get the Error:

<TriangleError> exception expected but none was thrown.

Your code is probably throwing an exception while creating a regular triangle in this file. about_triangle_project.rb

share|improve this answer
    
You'd need to make sure a, b, and c are in a certain order, lest your test only cover 1/3 of the possible cases. –  cHao Jul 10 '11 at 3:49

For the Koan about_triangle_project_2.rb there's no need to change TriangleError class. Insert this code before your triangle algorithm to pass all tests:

if ((a<=0 || b<=0 || c<=0))
    raise TriangleError
end

if ((a+b<=c) || (b+c<=a) || (a+c<=b))
    raise TriangleError
end
share|improve this answer

This one did take some brain time. But here's my solution

def triangle(a, b, c)
  # WRITE THIS CODE
  raise TriangleError, "All sides must be positive number" if a <= 0 || b <= 0 || c <= 0
  raise TriangleError, "Impossible triangle" if ( a + b + c - ( 2 *  [a,b,c].max ) <= 0  )

  if(a == b && a == c)
      :equilateral
  elsif (a == b || b == c || a == c)
      :isosceles
  else
    :scalene
  end
end
share|improve this answer

You could also try to instance the exception with:

raise TriangleError.new("All sides must be greater than 0") if a * b * c <= 0
share|improve this answer

Here is my version... :-)

def triangle(a, b, c)

  if a <= 0 ||  b <= 0 || c <= 0
    raise TriangleError
  end 

  if a + b <= c  || a + c <= b ||  b + c <= a
    raise TriangleError
  end 

  return :equilateral if a == b && b == c
  return :isosceles   if a == b || a == c ||  b == c
  return :scalene     if a != b && a != c &&  b != c 

end
share|improve this answer

This is what I ended up with. It is sort of a combination of a few of the above examples with my own unique take on the triangle inequality exception (it considers the degenerate case as well). Seems to work.

def triangle(a, b, c)

  raise TriangleError if [a,b,c].min <= 0 
  raise TriangleError if [a,b,c].sort.reverse.reduce(:-) >= 0

  return :equilateral if a == b && b == c
  return :isosceles   if a == b || a == c ||  b == c
  return :scalene 

end
share|improve this answer

Here is my elegant answer, with a lot of help from the comments above

def triangle(a, b, c)

   test_tri = [a,b,c]

   if test_tri.min <=0
     raise TriangleError
   end

   test_tri.sort!

   if test_tri[0]+ test_tri[1] <= test_tri[2]
     raise TriangleError
   end

   if a == b and b == c
     :equilateral
   elsif a != b and b != c and a != c 
     :scalene   
   else
     :isosceles     
   end
end
share|improve this answer

Leon wins on fancy elegance, Benji for his knowledge the Array API. Here's my brute elegant answer:

def triangle(a, b, c)
   [a, b, c].each { | side | raise TriangleError, "Sides must be positive" unless side > 0 }
   raise TriangleError, "Two sides can never be less than or equal to third side" if ((a + b) <= c) | ((a + c) <= b) | ((b + c) <= a)

   return :equilateral if (a == b) && (b == c)
   return :isosceles if (a == b) || (b == c) || (a == c)
   return :scalene
end
share|improve this answer

No Need to change the TriangleError code for either challenge. You just need to check for invalid triangles and raise the error if the triangle isn't.

def triangle(a, b, c)
  if a==0 && b==0 && c==0
    raise TriangleError, "This isn't a triangle"
  end
  if a <0 or b < 0 or c <0
    raise TriangleError, "Negative length - thats not right"
  end
  if a + b <= c  or a + c <= b or  b + c <= a
    raise TriangleError, "One length can't be more (or the same as) than the other two added together.  If it was the same, the whole thing would be a line.  If more, it wouldn't reach. "
  end    
  # WRITE THIS CODE
  if a == b and b == c 
    return :equilateral    
  end      
  if (a==b or b == c or a == c) 
    return :isosceles
  end 
  :scalene      
end
share|improve this answer

An 8 line solution for triangle.rb in Ruby Koans 156, 157, 158 (got me to 159/280):

def triangle (a, b, c) 
  if (((a+b+c)/3) < 1) raise TriangleError, "Sides cannot be zero or negative numbers"
  elsif (((a+b)<=c) || ((a+c)<=b) || ((b+c)<=a)) raise TriangleError, "Two sides of the     triangle must add to be greater than the third"
  elsif ((a != b) && (a != c) && ( b != c)) :scalene
  elsif (((a == b) || (a == c) || (b == c)) && ((a != b)|| (a != c)|| (b !=c))) :isosceles
  else :equilateral
  end
end
share|improve this answer

There are some absolutely brilliant people on StackOverflow...I'm reminded of that every time I visit :D Just to contribute to the conversation, here's the solution I came up with:

def triangle(a, b, c)
    raise TriangleError if [a,b,c].min <= 0
    x,y,z = [a,b,c].sort
    raise TriangleError if x + y <= z

    equal_sides = 0
    equal_sides +=1 if a == b
    equal_sides +=1 if a == c
    equal_sides +=1 if b == c

    # Note that equal_sides will never be 2.  If it hits 2 
    # of the conditions, it will have to hit all 3 by the law
    # of associativity
    return [:scalene, :isosceles, nil, :equilateral][equal_sides] 
end 
share|improve this answer

After try to understand what I must to do with koan 151, I got it with the first posts, and get lot fun to check everyone solution :) ... here is the mine:

def triangle(a, b, c)
  array = [a, b, c].sort
  raise TriangleError if array.min <= 0 || array[0]+array[1] <= array[2]
  array.uniq!
  array.length == 1 ? :equilateral: array.length == 2 ? :isosceles : :scalene
end

Koan is a very interesting way to learn Ruby

share|improve this answer

your previous triangle method should appear here

class TriangleError < StandardError
end

def triangle(x,y,z)
if(x>=y+z||y>=x+z||z>=x+y)
raise TriangleError,"impossible triangle"
elsif(x==0&&y==0&&z==0)||(x<0||y<0||z<0)
raise TriangleError,"length cannot be zero or negative"
elsif(x==y&&x==z)
:equilateral
elsif(x==y||y==z||x==z)
:isosceles
else
:scalene
end
end
share|improve this answer
    
hmm ... if this is an answer, please format the code to make it readable –  kleopatra Jun 30 '13 at 9:48

I don't think I see this one here, yet.

I believe all the illegal triangle conditions imply that the longest side can't be more than half the total. i.e:

def triangle(a, b, c)

  fail TriangleError, "Illegal triangle: [#{a}, #{b}, #{c}]" if
    [a, b, c].max >= (a + b + c) / 2.0

  return :equilateral if a == b and b == c
  return :isosceles if a == b or b == c or a == c
  return :scalene

end
share|improve this answer

Here's my solution... honestly I can't think of a more concise and readable one!

def triangle(a, b, c)
  raise TriangleError unless a > 0 && b > 0 && c > 0
  raise TriangleError if a == b && a + b <= c
  raise TriangleError if a == c && a + c <= b
  return :equilateral if a == b && b == c
  return :isosceles   if a == b || b == c || c == a
  :scalene
end
share|improve this answer

Rules:

  1. size must be > 0

  2. Total of any 2 sides, must be bigger that the 3rd

Code:

raise TriangleError if ( [a,b,c].any? {|x| (x <= 0)} ) or ( ((a+b)<=c) or ((b+c)<=a) or ((a+c)<=b))
[:equilateral, :isosceles, :scalene].fetch([a,b,c].uniq.size - 1)
share|improve this answer
  #(1)Any zero or -ve values
  if [a,b,c].any? { |side_length| side_length <= 0 }
    raise TriangleError
  end

  #(2)Any side of a triangle must be less than the sum of the other two sides
  # a <  b+c, b <  a+c  and c <  a+b  a  valid   triangle
  # a >= b+c, b >= a+c  and c >= a+b  an invalid triangle

  total_of_side_lengths = [a,b,c].inject {|total,x| total += x}

  if [a,b,c].any? { |side_length| side_length >= (total_of_side_lengths - side_length)}
    raise TriangleError
  end
share|improve this answer

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