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х W 50 75 Solve for: W = X= X= Round to the nearest tenth. Given that the triangle is Right-triangle.

х W 50 75 Solve for: W = X= X= Round to the nearest tenth. Given that the triangle-example-1
User Alene
by
2.8k points

1 Answer

22 votes
22 votes

To solve for X

X + 90 + 75 = 180° (Sum of interior angle of a triangle)

X + 165 = 180°

Subtract 165 from both-side of the equation

X = 180° - 165°

X = 15°

To solve for x

opposite =50

Adjacent = x

θ=75

Using the trigonometric ratio;

SOH CAH TOA


\begin{gathered} \tan \theta=\frac{opposite}{\text{adjacent}} \\ \\ \tan 75=(50)/(x) \\ \\ x\tan 75=50 \\ \\ x=(50)/(\tan 75) \end{gathered}
x\approx13.4

To solve for w,

opposite = 50

hypotenuse= w

θ=75

Hence, we will use sine.


\sin \theta=\frac{\text{opposite}}{\text{hypotenuse}}
\sin 75=(50)/(w)

Cross-multiply


w\sin 75=50

Divide both-side by sin75


w=(50)/(\sin 75)
w\approx51.8

User Tom Gebel
by
3.2k points