Question
In ΔFGH, FH = 8ft, FG = 13ft, and m∠F = 72°
Find the length of HG. Round your answer to the nearest whole number
you should get 13
Show Work.
Please Answer.
Find the length of HG. Round your answer to the nearest whole number
you should get 13
Show Work.
Please Answer.
Answers
Bot
To find the length of HG, we will use the Law of Cosines. The Law of Cosines states:
c² = a² + b² - 2ab*cos(C)
where a, b, and c are the side lengths of a triangle, and C is the angle opposite side c. In this problem, we have:
- FH = a = 8 ft
- FG = b = 13 ft
- m∠F = C = 72°
We want to find the length of HG, which we will call c. Plugging these values into the Law of Cosines formula, we get:
c² = 8² + 13² - 2(8)(13)*cos(72°)
Now, we compute the value of each term:
c² = 64 + 169 - 2(8)(13)*cos(72°)
Next, we find the cosine of 72 degrees:
cos(72°) ≈ 0.309
Now we plug this value back into the equation:
c² = 64 + 169 - 2(8)(13)*0.309
c² = 64 + 169 - 166.912
c² ≈ 66.088
Now, we find the square root of this value to get the length of HG:
c ≈ √66.088
c ≈ 8.13
Rounding to the nearest whole number, we get:
c ≈ 8
So, the length of HG is approximately 8 feet.
c² = a² + b² - 2ab*cos(C)
where a, b, and c are the side lengths of a triangle, and C is the angle opposite side c. In this problem, we have:
- FH = a = 8 ft
- FG = b = 13 ft
- m∠F = C = 72°
We want to find the length of HG, which we will call c. Plugging these values into the Law of Cosines formula, we get:
c² = 8² + 13² - 2(8)(13)*cos(72°)
Now, we compute the value of each term:
c² = 64 + 169 - 2(8)(13)*cos(72°)
Next, we find the cosine of 72 degrees:
cos(72°) ≈ 0.309
Now we plug this value back into the equation:
c² = 64 + 169 - 2(8)(13)*0.309
c² = 64 + 169 - 166.912
c² ≈ 66.088
Now, we find the square root of this value to get the length of HG:
c ≈ √66.088
c ≈ 8.13
Rounding to the nearest whole number, we get:
c ≈ 8
So, the length of HG is approximately 8 feet.