397,885 views
37 votes
37 votes
TRIGONOMETRY What is the area round to the nearest square foot

TRIGONOMETRY What is the area round to the nearest square foot-example-1
User Greeneco
by
2.2k points

1 Answer

26 votes
26 votes

ANSWER

852 ft²

Step-by-step explanation

The gable is a triangle with two sides of 42 feet - which means that it is an isosceles triangle, that meet at a 105° angle. To find the area, we need to find the length of the base, b, and the height, h, of this triangle.

The height is also the height of the two right triangles formed by the blue line in the diagram above. Both triangles are congruent, so the base of each of these is half the base of the gable. The blue line showing the height divides the 105° angle in two - i.e. it is the angle bisector. Thus, we have two congruent triangles with measures,

Using trigonometric ratios, we can find the values of h and a.

The height, h, is the adjacent side to the 52.5° angle and we know the length of the hypotenuse, 42 ft. To find h, we have to use the cosine of the angle,


\cos 52.5\degree=(h)/(42ft)

Solving for h,


h=42ft\cdot\cos 52.5\degree\approx25.568ft

The base, a, is the opposite side to the 52.5° angle, so, to find it, we have to use the sine of the angle,


\sin 52.5\degree=(a)/(42ft)

Solving for a,


a=42ft\cdot\sin 52.5\degree=33.321ft

The area of one of the right triangles is,


A_{right\text{ }triangle}=(h\cdot a)/(2)=(25.568ft\cdot33.321ft)/(2)\approx425.976ft^2

The gable is formed by two of these right triangles, so the area of the gable is twice the area of this right triangle,


A_(gable)=2\cdot A_{right\text{ }triangle}=2\cdot425.976ft^2\approx851.951\approx852ft^2

Hence, the area of the gable is 852 square feet, rounded to the nearest square foot.

TRIGONOMETRY What is the area round to the nearest square foot-example-1
TRIGONOMETRY What is the area round to the nearest square foot-example-2
User Edsamiracle
by
3.0k points