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NO LINKS!! Please help me with this problem. Part 13​

NO LINKS!! Please help me with this problem. Part 13​-example-1
User Draw
by
3.0k points

2 Answers

12 votes
12 votes

Answer:

7.65 ft

Explanation:

The distance can be figured using the Law of Cosines, or it can be figured by considering half of the isosceles A-frame to be a right triangle. We choose the latter.

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An altitude of the A-frame bisects the vertex angle so that the angle of interest in our right triangle is 22.5°. Then half the distance between the footings will be given by ...

Sin = Opposite/Hypotenuse

Opposite = Hypotenuse × Sin

half-distance = (10 ft)·sin(22.5°)

footing spacing = 2 × half-distance = (20 ft)sin(22.5°) ≈ 7.654 ft

The footings for each A-frame should be about 7.65 feet apart.

User Arnold Roa
by
2.8k points
21 votes
21 votes

Answer:

7.65 ft apart (to nearest hundredth)

Explanation:

The A frame creates an isosceles triangle with equal legs of 10 ft and a vertex of 45°. To find how far apart the footings should be, we need to find the base of the triangle.

To find the base, use the cosine rule:


c^2=a^2+b^2-2ab \cos(C)

where:

  • C is the angle
  • a and b are the sides adjacent to the angle C
  • c is the side opposite the angle C

So for this triangle:

  • a = 10
  • b = 10
  • c = base
  • ∠C = 45°

Substitute these values into the formula and solve for c:


c^2=10^2+10^2-2(10)(10) \cos(45)


\implies c^2=200-200\cos(45)


\implies c=√(200-200\cos(45))


\implies c=7.653668647...

Therefore, the footings should be 7.65 ft apart (to nearest hundredth)

User Louis Gerbarg
by
2.5k points