a, b, c - side lengths (a ≤ b ≤ c)
If [tex]a^2+b^2 < c^2[/tex], then is Obtuse triangle.
If [tex]a^2+b^2=c^2[/tex], then is Right triangle.
If [tex]a^2+b^2 > c^2[/tex], then Acute triangle.
[tex]a=4\sqrt5,\ b=\sqrt{145},\ c=19\to a < b < c[/tex]
Check to see if the sum of the first two sides is greater than the third.
[tex]a+b=4\sqrt5+\sqrt{145}\approx9+12=21 > 19=c\\\\CORRECT[/tex]
[tex]a\neq b\neq c\neq a[/tex], therefore is Scalene triangle.
[tex]a^2=(4\sqrt5)^2=4^2(\sqrt5)^2=16(5)=80\\\\b^2=(\sqrt{145})^2=145\\\\c^2=19^2=361\\\\a^2+b^2=80+145=225 < 361=c^2\\\\a^2+b^2 < c^2[/tex]
It's Obtuse triangle.
