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My solid base to stand on

Comments

  • The inside is easier than you think. I think the effect could be achieved multiple ways. Easier is better.
  • What's in the box?
  • Heyjoe said:

    What's in the box?

    Stators, ignition coils. And like, two other things other things. lol. Stupid stuff. It’s for my short book.
  • Heyjoe said:

    What's in the box?

    Stators, ignition coils. And like, two other things other things. lol. Stupid stuff. It’s for my short book.
    If you noticed, Eds box he is standing on has 3 studs. 2 in the front 1 in the back. Possibly N+0+S
    On his red door is says Earth 21. On his A Book in every home his cover has 1 photo in front 2 photos in back, on the inside of the page there are 2 photos in front 1 photo in the back. His photo (At Work) his tree branch is 1 stem 2 arms. him standing next to it is 2 legs 1 torso.

    His box dimensions were probably made to the Golden rectangle/ratio. Using Chatgpt to calculate... Golden Ratio Box Dimensions

    To create a wooden box with a surface area equal to that of a sphere with diameter 13 inches (surface area ≈ 531.95 square inches), and with dimensions following the golden ratio (φ ≈ 1.618), use the following dimensions:

    Dimensions
    Width: 14.7 inches
    Height: 9.1 inches
    Depth: 5.6 inches

    Notes
    The width-to-height ratio is ( 14.7 / 9.1 \approx 1.618 ), and the height-to-depth ratio is ( 9.1 / 5.6 \approx 1.618 ), both matching the golden ratio.

    The surface area of the box is: [ 2 \times (14.7 \times 9.1 + 14.7 \times 5.6 + 9.1 \times 5.6) \approx 531.95 , \text{square inches} ]

    This matches the surface area of a sphere with diameter 13 inches (the longest dimension of the original 12 × 13 × 6 inch box).

    For woodworking, account for wood thickness (e.g., 0.5 inches) when cutting to achieve these outer dimensions.


    His wall blocks were made to the golden rectangle. A sphere with the same volume as a rectangular block measuring 8 feet (height), 4 feet (width), and 3 feet (depth) has:

    Radius ≈ 2.84 feet
    Diameter ≈ 5.68 feet (or approximately 5 feet 8.1 inches)

    The volume of both the block and the sphere is 96 cubic feet.



    The math might be wrong but his box surface area probably equaled a sphere that was equivalent to his body ratio.



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