Exhaustion, method of
A method of proof used by mathematicians of antiquity in order to determine areas and volumes. The name "method of exhaustion" was introduced in the 17th century.
The typical scheme of proof by the method of exhaustion can, in modern terms, be explained as follows. In order to determine a quantity $ A $ one constructs a certain sequence of quantities $ C _ {1} , C _ {2} \dots $ such that
$$ \tag{1 } C _ {n} < A ; $$
one assumes that a $ B $ is known such that
$$ \tag{2 } C _ {n} < B , $$
and that for any integer $ K $ and all sufficiently large $ n $ the inequalities
$$ \tag{3 } K ( A - C _ {n} ) < D ,\ \ K ( B - C _ {n} ) < D $$
are fulfilled, with $ D $ a constant. From the modern point of view, to transfer (3) to
$$ \tag{4 } A = B $$
one only has to notice that (1)–(3) imply
$$ \lim\limits _ {n \rightarrow \infty } ( A - C _ {n} ) = 0 ,\ \ \lim\limits _ {n \rightarrow \infty } ( B - C _ {n} ) = 0 , $$
$$ A = \lim\limits _ {n \rightarrow \infty } C _ {n} = B . $$
The mathematicians of antiquity, not having developed the theory of limits (cf. Limit), used a reductio ad absurdum argument here: they proved that neither of the inequalities $ A < B $, $ A > B $ is possible. To disprove the first one, they established by the Archimedean axiom that for $ R = B - A $ there exists a $ K $ such that $ K R > D $, and (1) then led to
$$ K ( B - C _ {n} ) > \ K ( B - A ) > D , $$
which contradicts the second inequality in (3). The other assertion is disproved in a similar way. Hence (4) remains.
The introduction of the method of exhaustion and of the axiom that lies at its foundation is ascribed to Eudoxus of Cnidus. The method was extensively used by Eudoxus, while Archimedes used it with extraordinary skill and variety. E.g., in order to determine the area $ A $ of a segment of a parabola, Archimedes constructs the areas $ C _ {1} , C _ {2} \dots $ of segments that are stepwise "exhausting" the area $ A $.
Here
$$ C _ {2} = C _ {1} + \frac{1}{4} C _ {1} , $$
$$ {\dots \dots \dots \dots } $$
$$ C _ {n} = C _ {1} + \frac{1}{4} C _ {1} + \dots + \frac{1}{4 ^ {n-} 1 } C _ {1} . $$
Instead of the limit transition
$$ A = \lim\limits _ {n \rightarrow \infty } \ C _ {n} = \ \left ( 1 + \frac{1}{4} + \frac{1}{16} + \dots \right ) C _ {1} = \frac{4}{3} C _ {1} , $$
Archimedes proves geometrically that for any $ n $,
$$ A - C _ {n} < \ \frac{1}{4 ^ {n-} 1 } C _ {1} . $$
Introducing the area
$$ B = \frac{4}{3} C _ {1} , $$
he obtains
$$ B - C _ {n} = \ \frac{1}{3 \cdot 4 ^ {n-} 1 } C _ {1} , $$
and, following the reasoning explained above, finishes his proof with
$$ A = B = \ \frac{4}{3} C _ {1} . $$
Comments
References
[a1] | C.B. Boyer, "A history of mathematics" , Wiley (1968) pp. 100; 142–146 |
Exhaustion, method of. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Exhaustion,_method_of&oldid=11968