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 b (lado AC) = 3.5[br][/*][*]Cateto a (lado BC) = 6.9[br][/*][*]Ángulo C = 90°[br][/*][/list]1. Hallar el lado faltante (Hipotenusa c o lado AB):[br][math]c=\sqrt{a^2+b^2}=\sqrt{3.5^2+6.9^2}=\sqrt{12.25+47.61}=\sqrt{59.86}=7.74[/math][br][b]2. Hallar los ángulos faltantes (A y B):[/b][br][list][*]Para el ángulo A: Usamos la tangente (opuesto 6.9 sobre adyacente 3.5).[br][/*][/list][math]tan\left(A\right)=\frac{6.9}{3.5}=1.9714\Longrightarrow A=tan^{-1}\left(1.9714\right)=63.10°[/math][br]Para el ángulo B:[br][math]B=90°-63.10°=26.90°[/math]