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Consider this mathematician,
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with her standard-issue infinitely sharp
knife and a perfect ball.
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She frantically slices and distributes
the ball into an infinite number of boxes.
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She then recombines the parts
into five precise sections.
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Gently moving and rotating
these sections around,
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seemingly impossibly, she recombines them
to form two identical, flawless,
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and complete copies
of the original ball.
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This is a result known in mathematics
as the Banach-Tarski paradox.
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The paradox here is not
in the logic or the proof—
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which are, like the balls, flawless—
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but instead in the tension
between mathematics
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and our own experience of reality.
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And in this tension lives some beautiful
and fundamental truths
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about what mathematics actually is.
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We’ll come back to that in a moment,
but first,
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we need to examine the foundation
of every mathematical system: axioms.
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Every mathematical system
is built and advanced
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by using logic to reach new conclusions.
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But logic can’t be applied to nothing;
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we have to start with some basic
statements, called axioms,
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that we declare to be true,
and make deductions from there.
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Often these match our intuition
for how the world works—
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for instance, that adding zero to a number
has no effect is an axiom.
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If the goal of mathematics is to build
a house, axioms form its foundation—
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the first thing that’s laid down,
that supports everything else.
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Where things get interesting is that
by laying a slightly different foundation,
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you can get a vastly different
but equally sound structure.
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For example, when Euclid laid
his foundations for geometry,
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one of his axioms implied that given
a line and a point off the line,
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only one parallel line exists
going through that point.
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But later mathematicians,
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wanting to see if geometry was
still possible without this axiom,
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produced spherical
and hyperbolic geometry.
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Each valid, logically sound,
and useful in different contexts.
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One axiom common in modern mathematics
is the Axiom of Choice.
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It typically comes into play in proofs
that require choosing elements from sets—
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which we’ll grossly simplify
to marbles in boxes.
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For our choices to be valid,
they need to be consistent,
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meaning if we approach a box,
choose a marble,
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and then go back in time and choose again,
we'd know how to find the same marble.
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If we have a finite number of boxes,
that’s easy.
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It’s even straightforward
when there are infinite boxes
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if each contains a marble that’s readily
distinguishable from the others.
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It’s when there are infinite boxes
with indistinguishable marbles
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that we have trouble.
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But in these scenarios,
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the Axiom of Choice lets us summon
a mysterious omniscient chooser
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that will always select the same marbles—
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without us having to know anything
about how those choices are made.
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Our stab-happy mathematician,
following Banach and Tarski’s proof,
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reaches a step in constructing
the five sections
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where she has infinitely many boxes
filled with indistinguishable parts.
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So she needs the Axiom of Choice
to make their construction possible.
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If the Axiom of Choice can lead
to such a counterintuitive result,
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should we just reject it?
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Mathematicians today say no,
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because it’s load-bearing for a lot
of important results in mathematics.
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Fields like measure theory
and functional analysis,
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which are crucial
for statistics and physics,
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are built upon the Axiom of Choice.
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While it leads to some
impractical results,
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it also leads to extremely practical ones.
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Fortunately, just as Euclidean geometry
exists alongside hyperbolic geometry,
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mathematics with the Axiom of Choice
coexists with mathematics without it.
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The question for many mathematicians
isn’t whether the Axiom of Choice,
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or for that matter any given axiom,
is right or not,
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but whether it’s right
for what you’re trying to do.
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The fate of the Banach-Tarski paradox
lies in this choice.
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This is the freedom mathematics gives us.
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Not only is it a way to model
our physical universe
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using the axioms we intuit
from our daily experiences,
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but a way to venture into abstract
mathematical universes
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and explore arcane geometries and laws
unlike anything we can ever experience.
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If we ever meet aliens, axioms which seem
absurd and incomprehensible to us
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might be everyday common sense to them.
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To investigate, we might start by handing
them an infinitely sharp knife
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and a perfect ball,
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and see what they do.
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