The incenter (center of the incircle) of the triangle $ ABC $ is point:
$$ \left(3.1396,~5.3019\right) $$explanation
The incenter of a triangle is given by:
$$ C = \left( ~ \frac{a \cdot A_x + b \cdot B_x + c \cdot C_x}{a + b + c}~,~ \frac{a \cdot A_y + b \cdot B_y + c \cdot C_y}{a + b + c} \right) $$where $ a = d(B,C)$ , $ b = d(A,C) $ and $ c = d(A,B) $.
In this example we have : $ A_x = 1 $ , $ A_y = 3 $ , $ B_x = 6 $ , $ B_y = 4 $ , $ C_x = 2 $ and $ C_y = 11 $ .
The sides lengths are: $ a = \sqrt{ 65 } $ , $ b = \sqrt{ 65 } $ and $ c = \sqrt{ 26 } $.
When we insert these values into the formula, we obtain the given result.