Respuesta :
Suppose that, in the triangle ABC, the hypothenuse is AC. Let's call its length [tex ] \overline{AC} = x [/tex].
The hypothenuse is 2 ft longer than one of the legs (say AB, for example). This means that [tex] \overline{AB} = x-2 [/tex]
Finally, we can find the other leg with the pythagorean theorem:
[tex] \overline{BC} = \sqrt{\overline{AC}^2 - \overline{AB}^2} = \sqrt{x^2 - (x-2)^2} = \sqrt{x^2 - x^2 + 4x - 4} = \sqrt{4x-4} = \sqrt{4(x-1)} = 2\sqrt{x-1} [/tex]
So, the perimeter (i.e. the sum of the sides) is given by
[tex] x + (x-2) + 2\sqrt{x-1} = 364 \iff 2x - 2 + 2\sqrt{x-1} = 364 [/tex]
Isolate the square root to get
[tex]2\sqrt{x-1} = 2 - 2x + 364 = 366 - 2x [/tex]
Divide all sides by 2:
[tex]\sqrt{x-1} = 183 - x [/tex]
Square both sides:
[tex]x-1 = x^2 - 366 x + 33489 \iff x^2 - 367x + 33490 = 0[/tex]
This equation has solutions [tex] x = 170 [/tex] or [tex] x=197 [/tex]. These solutions lead to, in the first case,
[tex] \overline{AC} = x = 170,\quad \overline{AB} = x-2 = 168,\quad \overline{BC} = 2\sqrt{x-1} = 2\sqrt{169} = 2\cdot 13 = 26 [/tex]
In the second case, you have
[tex] \overline{AC} = x = 197,\quad \overline{AB} = x-2 = 195,\quad \overline{BC} = 2\sqrt{x-1} = 2\sqrt{196} = 2\cdot 14 = 28 [/tex]
