Answer:
Circumscribed circle: Around 80.95
Inscribed circle: Around 3.298
Step-by-step explanation:
Since C is a right angle, when the circle is circumscribed it will be an inscribed angle with a corresponding arc length of 2*90=180 degrees. This means that AB is the diameter of the circle. Since the cosine of an angle in a right triangle is equivalent to the length of the adjacent side divided by the length of the hypotenuse:
[tex]\cos 38= \dfrac{8}{AB} \\\\\\AB=\dfrac{8}{\cos 38}\approx 10.152[/tex]
To find the area of the circumscribed circle:
[tex]r=\dfrac{AB}{2}\approx 5.076 \\\\\\A=\pi r^2\approx 80.95[/tex]
To find the area of the inscribed circle, you need the length of AC, which you can find with the Pythagorean Theorem:
[tex]AC=\sqrt{10.152^2-8^2}\approx 6.25[/tex]
The area of the triangle is:
[tex]A=\dfrac{bh}{2}=\dfrac{8\cdot 6.25}{2}=25[/tex]
The semiperimeter of the triangle is:
[tex]\dfrac{10.152+6.25+8}{2}\approx 24.4[/tex]
The radius of the circle is therefore [tex]\dfrac{25}{24.4}\approx 1.025[/tex]
The area of the inscribed circle then is [tex]\pi\cdot (1.025)^2\approx 3.298[/tex].
Hope this helps!
