Pi: Difference between revisions

Latest revision as of 01:44, 2 July 2024

Pi, or π, is the ratio between the circumference and the diameter of a circle. π is not a number, because the numerical value of π depends on context: which circle is under consideration, and how precise are one's measurements? π should be thought of as more like a number-valued variable, which stands only for a very specific, limited, class of things.

The traditional concept

Standard mathematics says that π is the ratio between the circumference and the diameter of a perfect circle.

Standard mathematics "measures" this ratio using the methods of calculus.

Standard mathematics' notion of π is an irrational number---a number which cannot be written as a ratio of two whole numbers.

Thus in standard mathematics,

π = 3.141592653589793238462643383279502884197169399375105 8209749445923078164062862089986280348253421170679...

where the "..." signifies that the digits go on forever.

Examples

π shows up in many places, besides just circles.

a disk of radius $r$ has area $\pi r^{2}$

a cone with height $h$ and with base of radius $r$ , has area ${\frac {1}{3}}\pi r^{2}h$

a sphere of radius $r$ has volume ${\frac {4}{3}}\pi r^{3}$ , and surface area $4\pi r^{2}$

the area under a Gaussian distribution is proportional to some power of $\pi ^{1/2}$ .

@@ Line 1: / Line 1: @@
-'''Pi''', or '''π''', is the [[ratio]] between the circumference and the diameter of a [[circle]]. The numerical value of π depends on context: which circle is under consideration, and how precise are one's measurements?
+'''Pi''', or '''π''', is the [[ratio]] between the circumference and the diameter of a [[circle]]. π is not a number, because the numerical value of π depends on context: which circle is under consideration, and how precise are one's measurements? π should be thought of as more like a number-valued variable, which stands only for a very specific, limited, class of things.
 == The traditional concept ==
@@ Line 14: / Line 14: @@
 where the "..." signifies that the digits go on forever.
-== delete me ==
+== Examples ==
-editing stuff to try to get it to crash <math>\mathbb{Q} \rightarrow \int_0^\infty \frac{\Gamma(x + i\epsilon + y)\Gamma(z + x)}{\Gamma(x - z)} dx</math>
+π shows up in many places, besides just circles.
-blahblahblah <math>a</math> <math>b</math> <math>c </math> <math>\int \int \int \int \int 1\int \int \sqrt{ } sdaf </math>
+a disk of radius <math>r</math> has area <math>\pi r^2</math>
-sadlkfjklsdajflkajsdflkasj asldfjlsk l asdlkjd sflj sfkljsfl jlkasfjlkasfj
+a cone with height <math>h</math> and with base of radius <math>r</math>, has area <math>\frac{1}{3}\pi r^2 h</math>
-fasdljafs lk alfsk jjs dflkja
+a sphere of radius <math>r</math> has volume <math>\frac{4}{3} \pi r^3</math>, and surface area <math>4 \pi r^2</math>
-lkasdjf l j aslfdjlkfd jlkasfdj lksafj. sd
+the area under a Gaussian distribution is proportional to some power of <math>\pi^{1/2}</math>.
-asd lsaj lkjf ljf asdflkj lkasdjf dfsal safj lkjas jlksdjfsadlkfjla ksf;fa j;lsdjfals;kfj asdlkf jasdl;f
-lasdfj las'dkjf las;kfj asdl;kfj a

Pi: Difference between revisions

Latest revision as of 01:44, 2 July 2024

The traditional concept

Examples

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