Answer:
The length of the altitude is 9.3 yards and
The area of the triangle Δ UVW is 139.3 yd².
Step-by-step explanation:
Given
WU = 22 yd
WV = 30 yd
∠ UWV = 25°
To Find:
Altitude, UM = ?
area of the Δ UVW = ?
Construction:
Draw UM perpendicular to WV, that is altitude UM to WV.
Solution:
In right triangle Δ UWM if we apply Sine to angle W we get
[tex]\sin W = \frac{\textrm{side opposite to angle W}}{Hypotenuse}\\ \sin W=\frac{UM}{UW} \\[/tex]
substituting the values we get
[tex]\sin 25 = \frac{UM}{22}\\0.422 = \frac{UM}{22} \\UM = 0.422\times 22\\UM = 9.284\ yd[/tex]
Therefore, the altitude from U to WV is UM = 9.3 yd.(rounded to nearest tenth)
Now for area we have formula
[tex]\textrm{area of the triangle UVW} = \frac{1}{2}\times Base\times Altitude \\\textrm{area of the triangle UVW} = \frac{1}{2}\times VW \times UM\\=\frac{1}{2}\times 30\times 9.284\\ =139.26\ yd^{2}[/tex]
The area of the triangle Δ UVW is 139.3 yd². (rounded to nearest tenth)
