Can someone PROVE hero’s (or Heron’s) formula?
Answer
We use the formula area = (1/2)bc.sin(A)
The formula above can be “proven” easily by definition that a triangle’s area is just 1/2 x “base” x “height”.
Note in above, base = b. and height = c sinA.
Its one way of looking at it. Draw a diagram.
We’ll use that and some basic trigonometry to prove “Hero’s formula”.
And sin(A) = 2 sin(A/2).cos(A/2)
So area = bc.sin(A/2).cos(A/2)
Next we find expressions for cos(A/2) and sin(A/2) in terms of
s, a, b, c, where a, b, c are the sides of the triangle and s is
the semi-perimeter.
So s = (a+b+c)/2
cos(A)
= 2cos^2(A/2) – 1
= [ b^2 + c^2 – a^2 ] / [2bc]
So,
2cos^2(A/2)
= 1 + [ b^2 + c^2 – a^2 ] / [2bc]
= [(b+c)^2 – a^2 ]/[2bc] = [(b+c-a)(b+c+a)]/[2bc]
= [(2s-2a)2s ]/[2bc]
So,
cos^2(A/2) = [s(s-a)] / [bc]
b^2 + c^2 – a^2
Next,
cos(A)
= 1 – 2 sin^2(A/2)
= [b^2 + c^2 – a^2] / [2bc]
So,
2sin^2(A/2) = 1 – [b^2 + c^2 – a^2] / [2bc]
2sin^2(A/2) = [a^2 – (b-c)^2] / [2bc]
2sin^2(A/2) = [(a-b+c)(a+b-c)] / [2bc]
2sin^2(A/2) = [(2s-2b)(2s-2c)] / [2bc]
Hence,
sin^2(A/2) = [(s-b)(s-c)] / [bc]
We can now return to the formula for the area of the triangle using the above:
(1/2)bc.sin(A) = bc.sin(A/2).cos(A/2)
(1/2)bc.sin(A) = [bc.sqrt[s(s-a)(s-b(s-c)]/[bc]
(1/2)bc.sin(A) = sqrt[s(s-a)(s-b)(s-c)]
Done.
Note : The dots “.” mean nothing just “spacing”.
