Originally posted by Euro-commuter
A simple proof that starts from the axioms would be like this:
a) x > 0 => x + y > 0 + y = y
b) x + y > y, y > 0 => x + y > 0
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Your proof indeed almost derives from the axioms - you haven't proved that if x>0, then -x<0.
A simple proof that starts from the axioms would be like this:
a) x > 0 => x + y > 0 + y = y
b) x + y > y, y > 0 => x + y > 0 -
Implicit in the definitions of unity and inverse, no?Originally posted by bored
What you prove on the way, and what is taken as obvious, has always intrigued me. Technically, all of mathematics is tautologically implicit in the axioms. A "proof" is an exposition of the steps in detail small enough for mathematicians to follow, and preferably too great for others to follow
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God made men. Sam Colt made them equal.Comment
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The statement is not part of the axioms, so it must be proved. The proof is trivial but so is the proof to the original question.Originally posted by Euro-commuterImplicit in the definitions of unity and inverse, no?
What you prove on the way, and what is taken as obvious, has always intrigued me. Technically, all of mathematics is tautologically implicit in the axioms. A "proof" is an exposition of the steps in detail small enough for mathematicians to follow, and preferably too great for others to follow.
x > 0 => x + (-x) > 0 + (-x) => 0 > -x QED
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My A-level maths is not good enough to follow some of these arguments.
Hard Brexit now!
#prayfornodealComment
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ok ok I'll rephrase it
R is the set of real numbers
so what we are proving is the following
The set X = {x:R | x > 0}
for all x1, x2 in X the following is true x1 + x2 > 0I'm alright JackComment
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Just when I thought I'd learnt the ruddiments of awk, this pops up.Originally posted by BlasterBatesComment
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