Proof
Take a first binomial (X.48); the difference is the
first apotome.
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Full neighborhood
Depends on (3)
- X.48Proposition X.48To find the first binomial straight line.
- X.73Proposition X.73If from a rational straight line there be subtracted a rational straight line commensurable with the whole in square…
- X.III.1Definition X.III.1Given a rational straight line and an apotome (i.e. a difference of two rationals commensurable in square only), if the…
Required by (dependents) (3)
- X.86Proposition X.86To find the second apotome.
- X.91Proposition X.91If an area be contained by a rational straight line and a first apotome, the side of the area is an apotome.
- X.97Proposition X.97The square on an apotome straight line applied to a rational straight line produces as breadth a first apotome.
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