Excircles

ins- · 13/10/07 755 Роман/София, България

Let $k_a$ , $k_b$ , $k_c$ are the excircles of the triangle $ABC$ (tangent to BC, CA, AB, respectively). $k_1(r_1)$ is a circle, tangent to $k_a$ and the lines $AB$ and $BC$ . $k_2(r_2)$ is a circle, tangent to $k_a$ and the lines $BC$ and $AC$ . $k_3(r_3)$ is a circle, tangent to $k_b$ and the lines $AC$ and $BC$ . $k_4(r_4)$ is a circle, tangent to $k_b$ and the lines $BC$ and $AB$ . $k_5(r_5)$ is a circle, tangent to $k_c$ and the lines $AB$ and $AC$ . $k_6(r_6)$ is a circle, tangent to $k_c$ and the lines $AB$ and $BC$ . Prove that: $r_1r_3r_5=r_2r_4r_6$ .

Slip · 13/11/09 117

There are 2 circles tangent to, for example, $AB$ , $BC$ and $k_a$ , which of them is $k_1$ ? If all circles are "nearest to the vertex", then it's enough to compute $r_i$ using $r_a$ , $r_b$ , $r_c$ and the angles of the triangle, which is quite simple

ins- · 13/10/07 755 Роман/София, България

Smaller circles I meant, excuse me.

ins- · 13/10/07 755 Роман/София, България

This problem is not easy and not hard. It can be solved with or without trigonometry.

nnosipov · 20/12/10 9179

Mechanical proving with complex numbers works too.

ins- · 13/10/07 755 Роман/София, България

I think it can be done easier - my idea was to create a Sangaku-like problem with level of difficulty - regional round of bulgarian olympiad.

Sergic Primazon · 30/03/08 196 St.Peterburg

ins- в сообщении #812863 писал(а):

Let $k_a$ , $k_b$ , $k_c$ are the excircles of the triangle $ABC$ (tangent to BC, CA, AB, respectively). $k_1(r_1)$ is a circle, tangent to $k_a$ and the lines $AB$ and $BC$ . $k_2(r_2)$ is a circle, tangent to $k_a$ and the lines $BC$ and $AC$ . $k_3(r_3)$ is a circle, tangent to $k_b$ and the lines $AC$ and $BC$ . $k_4(r_4)$ is a circle, tangent to $k_b$ and the lines $BC$ and $AB$ . $k_5(r_5)$ is a circle, tangent to $k_c$ and the lines $AB$ and $AC$ . $k_6(r_6)$ is a circle, tangent to $k_c$ and the lines $AB$ and $BC$ . Prove that: $r_1r_3r_5=r_2r_4r_6$ .

$\frac{r_1}{r_6}=\frac{r_a}{r_c} , \frac{r_3}{r_2}=\frac{r_b}{r_a} , \frac{r_5}{r_4}=\frac{r_c}{r_b}$

ins- · 13/10/07 755 Роман/София, България

I have one more question. How can we express the radii of a circle tangent to exactly two excircles of a triangle and the incircle by triangle any triangle elements? It is also interesting how can we construct such a circle.

The circles I mentioned are in some way similar to the Feuerbach circle.

ins- · 13/10/07 755 Роман/София, България

http://en.wikipedia.org/wiki/Problem_of_Apollonius I suppose there exist many circles tangent to two excircles and the incircle and it makes my question not defined as it must be.

Научный форум dxdy

Excircles

Кто сейчас на конференции