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The program is set to calculate the area of a triangle. Triangle sides (a,b,c) are an input. The code works fine only with certian numbers and not with others. E.g.

when a,b and c are respectively: 2,3,4 the code is OK. 2,3,5 the output in 0.00 which is wrong. 2,3,6 the program prints a math domain error

def main():
    print "Program calculates the area of a triangle."
    a, b, c = input("Enter triangle's sides length: ")
    s = (a+b+c) / 2.0
    area = sqrt(s*(s-a)*(s-b)*(s-c))
    print "The area is %.2f" % area


can you see what's wrong?

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thanks for that. the formula was in the book im reading. why please for 2,3,5 the output is 0.00 ? –  nutship Jan 30 '13 at 15:52
You get zero when rour s variable, called the semiperimeter, is the same length as one of the triangle sides. For example, (2 + 3 + 5)/2 = 5, and then the (s-c) term will be zero. –  radical7 Jan 30 '13 at 15:57

3 Answers 3

up vote 1 down vote accepted

Your code seems legit, let's look at your test cases in math:

Case 1:

a=2; b=3; c=5;

 = 5.00

And you have area = sqrt(s*(s-a)(s-b)(s-c))

See there is (s-c) in the formula, which turn out to be (5.00 - 5) = 0 In this case area = 0.00, which is correct.

Case 2:

a=2; b=3; c=6;

 = 5.50

in terms of (s-c), you have (5.50 - 6) = -0.5

sqrt of a negative number gives you the "math domain error"

The above results implies that these numbers cannot form legit triangles. There is nothing wrong with your code or the formula. However, make sure your test cases are legit before you test your code next time.

I hope it helps =]

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The formula is working; it's your expectations which are a little off.

2,3,5 the output in 0.00 which is wrong.

Really? Could you draw a triangle with side lengths of of 2, 3, and 5, then? :^) The only possibility is a degenerate triangle -- a line (a 2-inch segment joined to a 3-inch segment), which obviously has zero area.

Not every combination of three numbers works as a triangle. You need to have a+b>c, b+c>a, and c+a>b. For (2,3,6), you have

3+6 > 2 and 6+2 > 3, but 2+3 < 6, so there's no such triangle.

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thanks! definitelly you're right –  nutship Jan 30 '13 at 17:05

Try doing this

a = 10 b = 10

area = (a+b)/2.0

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