# Given three side of a triangle, how can I define whether it is a degenerate triangle or not?

We know that degenerate triangle is a triangle which has all three of its points in a line, and thus has all of its sides on top of each other. So there is a three sides of triangle and now I have to determine whether it degenerate triangle or generate triangle.

How can I proceed to solve this using C language ?

• How do you get the points? Do you have int arrays with the point coordinates? – Arc676 Oct 9 '15 at 11:47
• The sides are taken as int arrays – Salman Sourav Oct 9 '15 at 11:49
• What do you mean the side of the triangle? A line segment is usually defined by 2 points. – Arc676 Oct 9 '15 at 11:52
• When you say "sides", do you mean side lengths? Please be more specific about what input you have, ideally with an example. – M Oehm Oct 9 '15 at 11:56

## 4 Answers

When you have three side lengths, `a``b``c`, the triangle is degenerate, when `a` + `b` = `c`. (Other triangles have `a` + `b` > `c` and triangles with `a` + `b` < `c` are not possible.)

• Yes - the nice simple answer. – chux - Reinstate Monica Oct 9 '15 at 13:40
• Whats possible whats not is this even english i didnt understand anything – nikoss Nov 3 '17 at 3:47
• @nikoss: What's hard to understand? Or have you just stopped by to insult me? – M Oehm Nov 3 '17 at 6:20

If a, b, and c are the lengths of the three sides of a triangle, then

``````a + b > c

a + c > b

b + c > a
``````

If any one of these inequalities is not true, then we get a degenerate triangle.

In simple term,first sort the a, b, c in ascending order then check below condition

``````a + b <= c
``````

if this condition satisfy then triangle is degenerate triangle.

• <= is the catch – raksja Apr 17 '18 at 5:35

You need to figure out if points A, B and C are on the same line. If AB and AC have the same slope then they are colinear (on the same line).

You've now reduced the problem to calculating slope which should be easy in C.

Given the side lengths `a`,`b`,`c` of the triangle, you can calculate the triangle's area via Heron's formula. If the area is 0 (or smaller than a given threshold, b/c of roundoff errors), then the triangle is degenerate.

Given the triangle's vertices `A`,`B`,`C`, you can calculate the area of the parallelogram spanned by `(A-B)` and `(B-C)` by taking their cross product's magnitude. If this area is zero, your triangle is degenerate. Also you can equivalently calculate the side lengths from the vertices and go back to using Heron's formula.