As indicated by the inquiry,
A triangle ABC with BC = a , CA = b and AB = c . Likewise, a circle is engraved which contacts the sides BC, CA and AB at D, E and F individually and s is semi-border of the triangle
To Prove: BD = s – b
Evidence:
As per the inquiry,
We have,
Semi Perimeter = s
Border = 2s
![\[2s\text{ }=\text{ }AB\text{ }+\text{ }BC\text{ }+\text{ }AC\text{ }\left[ 1 \right]\]](https://www.learnatnoon.com/s/wp-content/ql-cache/quicklatex.com-528dcf062a3c10334ff5f3aa4cfc3b9b_l3.png "Rendered by QuickLaTeX.com")
As we probably are aware,
Digressions drawn from an outside highlight a circle are equivalent
So we have
AF = AE [2] [Tangents from point A]
BF = BD [3] [Tangents From point B]
Compact disc = CE [4] [Tangents From point C]
Adding [2] [3] and [4]
![\[AF\text{ }+\text{ }BF\text{ }+\text{ }CD\text{ }=\text{ }AE\text{ }+\text{ }BD\text{ }+\text{ }CE\]](https://www.learnatnoon.com/s/wp-content/ql-cache/quicklatex.com-35d8017724a3408becefac87f705e7ac_l3.png "Rendered by QuickLaTeX.com")
Stomach muscle + CD = AC + BD
Adding BD both side
Abdominal muscle + CD + BD = AC + BD + BD
Stomach muscle + BC – AC = 2BD
Stomach muscle + BC + AC – AC – AC = 2BD
2s – 2AC = 2BD [From 1]
2BD = 2s – 2b [as AC = b]
BD = s – b
Consequently Proved.