The 3-4-5 Rule is the Pythagorean Theorem

Set Control Lines for Tile or Laminate Floors and Concrete Forms

Dec 30, 2008

The Pythagorean theorem is the basis for the 3-4-5 rule. This simple math equation is a carpenter's tool used to find or verify the squareness of a room or object.

No, it's not necessary to be a math major to use this rule. Like the homemade water level, sometimes the simplest tools are the best and most accurate. Best of all, no batteries or extension cords are needed!

Use the Rule to Verify Squareness

When is the rule used? Any time an object needs to be square; that is, the distance between diagonal corners is the same, or a precise 90 degree angle needs to be established. Consider a door and a door frame or jamb. If either is out of square, the door won't open or close properly.

If a room is out of square, the floor tiles will not have equal borders on at least one wall. If the finish floor is hardwood or a laminate floor, the border run of planks will have to be ripped at an angle. If the batter boards set up to pour a concrete form aren't square, nothing in the forthcoming home is going to be just right.

How to Use the Pythagorean Rule to Find a 90 Degree Angle

The concept is pretty simple and readily recalled from Euclidean geometry 101. 'A' squared plus 'B' squared equals 'C' squared, where A = 3, B = 4, and C = 5. And the beauty of it is that it doesn't matter if units are measured in inches, feet, miles, meters, or cubits.

To use the rule on a floor to strike control lines, first measure from one wall in two places and snap a chalk line through them. This line will be parallel to the wall. Mark a spot on the line and another 3 units away. Now sweep a short arc 4 units away and parallel to the first mark.

Finally, sweep an arc 5 units from the second mark at approximately a 45 degree angle to the chalk line. The point where the second arc intersects the first arc is the magic point. Strike a chalk line through the magic point and the first mark and viola! A perfect 90 degree angle!

The two chalk lines are the control lines and with proper measuring can be transferred anywhere else in the room.

History of the 3-4-5 Rule

As stated above, the rule is based on the Pythagorean theorem. It shouldn't actually be called a theorem since it's gone through many mathematical proofs.

Pythagoras was a Greek mathematician and philosopher. He started the Pythagorean School of Mathematics in Cortona, which was a Greek seaport located in Southern Italy.

Although it's common knowledge that Pythagoras set the rule forth in the manner that it's now taught, it is believed that the ancient Babylonians used it long before he was born.

The copyright of the article The 3-4-5 Rule is the Pythagorean Theorem in Home Renovation/Repair is owned by Kelly Smith. Permission to republish The 3-4-5 Rule is the Pythagorean Theorem in print or online must be granted by the author in writing.

Mar 10, 2009 12:46 PM

Guest :

I understand that 3-4-5 makes a perfect square. But I don't understand the arc-drawing steps. Could you post a little pic of this? I'm thinking that there might be an error (and it may exist between my chair and keyboard)

Mar 13, 2009 4:53 AM

Kelly Smith :

Think of doing geometry using a compass, the kind with a pencil on one end and a pointy part on the other. Anchor the point and sweep the pencil across to make the arc.

In practice though, I stretch out my tape measure, hold my left hand pinning the tape down on the measurement and the mark and then sweep the arc holding the pencil and the tip of the tape in my right hand.

For longer measurements, tie a string to a nail hammered in on the mark and sweep the arc on the other end of the string.