@article {MATHEDUC.06520661,
author = {Palfreyman, Andrew},
title = {Equable triangles -- the general case.},
year = {2015},
journal = {SYMmetryplus},
volume = {57},
issn = {1464-7060},
pages = {5-7},
publisher = {Mathematical Association (MA), Leicester},
abstract = {From the text: A shape was said to be equable in my last two articles if the value of its area is equal to the value of its perimeter and I was particularly interested in shapes that had integers for all their side lengths. In the previous article, however, we found that no equable isosceles triangle exists, although a nice example did exist with a base of $12$ and equal sides being $7\frac{1}{2}$. We will now consider the general case for a triangle which has a slightly different approach to that in the last article. However, we will begin with Heron's formula again.},
msc2010 = {G40xx (G70xx G30xx F60xx)},
identifier = {2016a.00619},
}