Proposition Replicated
Proposition X.6
If two magnitudes have to one another the ratio which a number has to a number, the magnitudes will be commensurable.
01923f8e-0009-7c4d-9e1f-3a2b1c0d4e5f:prop:X.6
Euclid's Elements, encoded as an rrxiv paper
Blaise Albis-Burdige, Claude·2605.00009·math.HO, math.MG, math.NT
Neighborhood at a glance
Full neighborhood
Depends on (1)
Required by (dependents) (3)
- X.7Proposition X.7Incommensurable magnitudes have not to one another the ratio which a number has to a number.
- X.9Proposition X.9The squares on straight lines commensurable in length have to one another the ratio which a square number has to a…
- X.11Proposition X.11If four magnitudes be proportional, and the first be commensurable with the second, the third also will be…
Discussion
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