Answer:
[tex]\displaystyle 89,91969885°, 90,08030115° ≈ x[/tex]
Step-by-step explanation:
In this SOMEWHAT right triangle, we need to use the Law of Sines to solve for the m∠X:
Solving for Angle Measures
[tex]\displaystyle \frac{sin∠C}{c} = \frac{sin∠B}{b} = \frac{sin∠A}{a}[/tex]
* In the end, you must use the inverse function, or else you will throw off your answer − [tex]\displaystyle arcsin\:[or\:sin^{-1}].[/tex]
Solving for Sides
[tex]\displaystyle \frac{c}{sin∠C} = \frac{b}{sin∠B} = \frac{a}{sin∠A}[/tex]
Alright. Let us solve this triangle:
[tex]\displaystyle \frac{sin\:67,38°}{24} = \frac{sin∠X}{26} → \frac{[sin\:67,38°][26]}{24} = sin∠X \\ \\ \\ -arcsin\:\frac{[sin\:67,38°][26]}{24} + 180° ≈ 90,08030115° \\ arcsin\:\frac{[sin\:67,38°][26]}{24} ≈ 89,91969885° \\ \\ OR \\ \\ -sin^{-1}\:\frac{[sin\:67,38°][26]}{24} + 180° ≈ 90,08030115° \\ sin^{-1}\:\frac{[sin\:67,38°][26]}{24} ≈ 89,91969885°[/tex]
* This is an extra step further because we are dealing with an actual right triangle, therefore the m∠X will have two angle measures.
I am joyous to assist you anytime.
