A triangle has corners at $(5 ,7 )$ , $(3 ,9 )$ , and $(4 ,6 )$ . What is the area of the triangle's circumscribed circle?

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Answer 1 · 2018-03-02T13:02:32

Area of the circumscribed circle is

$A_c = pi * R^2 ~~ 7.84$ sq units

Steps :
1. Find the lengths of the three sides using distance formula
$d = sqrt((x2 - x1)^2 + (y2 - y1)^2)$

Find the area of the triangle using formula
$A_t = sqrt(s (s - a) (s - b) ( s - c))$

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$a = sqrt((3-4)^2 + (9-6)^2) ~~3.16$

$b = sqrt((5-4)^2 + (7-6)^2) ~~ 1.414$

$c = sqrt((5-3)^2 + (7-9)^2) ~~ 2.83$

$s = (a+b+c)/2 = (3.16+1.414+2.83)/2 ~~ 3.7$

$A_t = sqrt((3.7 (3.7-3.16) (3.7-1.414) (3.7-2.83)) ~~ 2$

Radius of the circumscribed circle is

$R = (abc) / (4 A_t) = (3.16*1.414.2.83)/ (4 * 2) ~~ 1.58$

Area of the circumscribed circle is

$A_c = pi * R^2 = pi * 1.58^2 ~~ 7.84$ sq units

A triangle has corners at (5 ,7 )(5 ,7 ), (3 ,9 )(3 ,9 ), and (4 ,6 )(4 ,6 ). What is the area of the triangle's circumscribed circle?