Talk:Section formula

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Coordinates of centroid

 

Centroid of a triangle

The centroid of a triangle is the intersection of the medians and divides each median in the ratio ${\textstyle 2:1}$ . Let the vertices of the triangle be ${\displaystyle A(x_{1},y_{1})}$ , ${\textstyle B(x_{2},y_{2})}$  and ${\textstyle C(x_{3},y_{3})}$ . So, a median from point A will intersect BC at ${\textstyle \left({\frac {x_{2}+x_{3}}{2}},{\frac {y_{2}+y_{3}}{2}}\right)}$ . Using the section formula, the centroid becomes:

$${\displaystyle G=\left({\frac {x_{1}+x_{2}+x_{3}}{3}},{\frac {y_{1}+y_{2}+y_{3}}{3}}\right)}$$

 

Coordinates of incenter

 

Let the sides of a triangle be ${\textstyle a}$ , ${\textstyle b}$  and ${\textstyle c}$  its vertices are ${\textstyle A(x_{1},y_{1})}$ , ${\textstyle B(x_{2},y_{2})}$  and ${\textstyle C(x_{3},y_{3})}$ . The Incentre (intersection of the angle bisectors) divides the angle bisectors in the ratio ${\textstyle (b+c):a}$ , ${\textstyle (a+c):b}$  and ${\textstyle (a+b):c}$ . An angle bisector also divides the opposite side in the ratio of the adjacent sides (Angle bisector theorem). So they meet at ${\textstyle \left({\frac {bx_{2}+cx_{3}}{b+c}},{\frac {by_{2}+cy_{3}}{b+c}}\right)}$ . Thus, the incenter is

$${\displaystyle I=\left({\frac {ax_{1}+bx_{2}+cx_{3}}{a+b+c}},{\frac {ay_{1}+by_{2}+cy_{3}}{a+b+c}}\right)}$$

 

This is essentially the weighted average of the vertices.

Shubhrajit Sadhukhan (talk) 13:25, 7 November 2020 (UTC)Reply