Is there a formula to derive a square from round stock?
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black85vette
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Hmmm. If you connect the 4 corners of a box in a circle you get 4 right triangles with each equal leg the same as the radius of the circle. So the square root of the sum of the squares of both sides will be the side of the box inside the circle. Can't remember how to notate it. Try: Square root (R squared + R squared)= side of the box inside the circle.
Edit; changed the word square to box when it refers to the shape inside the circle. With two uses of the same word it became confusing.
Edit; changed the word square to box when it refers to the shape inside the circle. With two uses of the same word it became confusing.
hammers-n-nails
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diameter / square root of 2(1.414)= side of square
Engine maker
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Yep, sure is. Remember the song, the square of the hypotenuse of a right triangle is equal to the sum of the square of the adjacent two sides? So just do it backwards. The hypotenuse is the diameter.
Say you have a 3" round -
3" X 3" = 9
9 divided by 2 (sides) = 4.5"
The square root of 4.5" = 2.1213203"
2.1213203" is each side
This is how I lay out bolt hole patterns, Easier than a rotary table and just as accurate for me. Just X and Y on my milling table feed.
Jim
Say you have a 3" round -
3" X 3" = 9
9 divided by 2 (sides) = 4.5"
The square root of 4.5" = 2.1213203"
2.1213203" is each side
This is how I lay out bolt hole patterns, Easier than a rotary table and just as accurate for me. Just X and Y on my milling table feed.
Jim
ChooChooMike
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HEY MARV !!
I would have thought by now that you'd have a program ready for this calculation
Mike
I would have thought by now that you'd have a program ready for this calculation
Mike
mklotz
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Way, way too trivial to merit a program.
hammers-n-nails
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what maryak said is the same thing exept inversing it so you multiply instead of divide
A slightly more interesting question is what sizes of flat-stock can you get out of a given diameter round-bar.
I suspect Marv's TENON program does something pretty close to that, but I've not investigated it further than reading the description.
I suspect Marv's TENON program does something pretty close to that, but I've not investigated it further than reading the description.
mklotz
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TENON won't be of any help. It calculates the DOC needed to cut *regular* polygonal tenons.
Rectangular stock would still require that the diagonal of the stock correspond to the diameter of the round.
a,b = stock dimensions
D = diameter of round
a^2 + b^2 = D^2
So, once you've chosen one of the stock dimensions, a, the maximum size of the other dimension is given by:
b = sqrt(D^2 - a^2)
Rectangular stock would still require that the diagonal of the stock correspond to the diameter of the round.
a,b = stock dimensions
D = diameter of round
a^2 + b^2 = D^2
So, once you've chosen one of the stock dimensions, a, the maximum size of the other dimension is given by:
b = sqrt(D^2 - a^2)
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