1. Calcula las seis funciones trigonométricas para cada uno de los siguientes triángulos rectángulos.[br][img]data:image/png;base64,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[/img][br][*][b]Datos dados:[/b][br][list][*]Cateto a (horizontal, lado BC) = 8[br][/*][*]Cateto b (vertical, lado AC) = 12[br][/*][*]Ángulo C = 90°[br][/*][/list][/*][*][b]1. Hallar el lado faltante (Hipotenusa c o lado AB):[/b][br][/*][*][b][math]c=\sqrt{a^2+b^2}=\sqrt{8^2+12^2}=\sqrt{64+144}=\sqrt{208}=14.42[/math][br][/b][/*] [b]2. Hallar los ángulos faltantes (A y B):[/b][br][list][*]Para el ángulo $A$: Usamos la tangente (opuesto $8$ sobre adyacente $12$).[br][/*][/list][math]tan\left(A\right)=\frac{8}{12}=0.667\Longrightarrow A=tan^{-1}\left(0.6667\right)=33.69°[/math][br]Para el ángulo B:[br][math]B=90°-33.69°=56.31°[/math]