Trigonometry Objective: Use trigonometry functions to find the area of triangles. In ΔLMN, LM=10, LN=5, and m

Question

asked Jan 23, 2021 28.3k views

1 Answer

Ratbum · Answer 1 · 2021-01-28T05:19:54+0000

The area of the triangle LMN is 20.3 square units

Step-by-step explanation:

Given that the measurements of the sides of the triangle are
LM=10 ,
LN=5 and
$m\angle L=54^(\circ)$

We need to determine the area of the triangle.

Area of the triangle:

The area of the triangle can be determined using the formula,

$\text {Area}=(1)/(2) mn \sin L$

Substituting the values,
m=5 ,
n=10 and
$m\angle L=54^(\circ)$ , we get,

$\text {Area}=(1)/(2) (5)(10) \sin 54^(\circ)$

Simplifying the terms, we have,

$\text {Area}=(1)/(2) (5)(10) (0.81)$

Multiplying the values, we get,

$\text {Area}=(40.5)/(2)$

Dividing, we get,

Area=20.25

Rounding off to the nearest tenth, we get,

$\text {Area}=20.3$

Thus, the area of the triangle LMN is 20.3 square units.