Calcula las funciones trigonométricas restantes para los ángulos agudos en cada triángulo rectángulo, del cual se indica una de sus funciones.[br][math]sen\left(a\right)=\frac{Co}{H}|csc\left(a\right)=\frac{H}{Co}[/math][br][math]Cos\left(a\right)=\frac{Ca}{H}|sec\left(a\right)=\frac{H}{Ca}[/math][br][math]tan\left(a\right)=\frac{Co}{Ca}|cot\left(a\right)=\frac{Ca}{Co}[/math][br][b](Donde Co = Cateto Opuesto, Ca = Cateto Adyacente, H = Hipotenusa)[br][img]data:image/png;base64,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[/img][br][*][b]Identificación de lados:[/b]Co = 15 Ca = 19.[br][/*][*][b]Encontrar la Hipotenusa (H):[/b][br][/*][*][b][math]H=\sqrt{15^2+19^2}=\sqrt{225+361}=\sqrt{586}=24.21[/math][br][/b][/*][*][b]Funciones restantes para B:[br][/b][/*][*][b][/b][/*][*][b]sen(B) = [math]\frac{15}{\sqrt{586}}[/math][br][/b][/*][*][b]cos(B) = [math]\frac{19}{\sqrt{586}}[/math][br][/b][/*][*][b]csc(B) = [math]\frac{\sqrt{586}}{15}[/math][br][/b][/*][*][b]sec(B[math]\frac{\sqrt{586}}{19}[/math][br][/b][/*][*][b]cot(B) = [math]\frac{19}{15}[/math][br][img]data:image/png;base64,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[/img][/b][/*][*][b][/b][/*][*][b][b]Identificación de lados:[/b] Como la secante es [math]\frac{H}{Ca}[/math], tenemos que H =[math]\sqrt{74}[/math] y Ca=3[br][/b][/*][*][b][b]Encontrar el Cateto Opuesto (Co):[/b][br][/b][/*][*][b][b][math]Co=\sqrt{\left(74\right)^2-3^2}=\sqrt{74-9}=\sqrt{65}=8.06[/math][br][/b][/b][/*][*][b][b][b]Funciones restantes para A:[/b][br][list][*]sen(A) =[math]\frac{\sqrt{65}}{\sqrt{74}}=\sqrt{\frac{65}{74}}[/math] [br][/*][*]cos(A) = [math]\frac{3}{\sqrt{74}}[/math][br][/*][*]tan(A) = [math]\frac{\sqrt{65}}{3}[/math][br][/*][*]csc(A) = [math]\frac{\sqrt{74}}{\sqrt{65}}=\sqrt{\frac{74}{65}}[/math][br][/*][*]cot(A) = [math]\frac{3}{\sqrt{65}}[/math][/*][/list][br][/b][/b][/*][b][br][br][/b][/b][b][br][/b]