What is Pi: Definition and 513 Discussions

The number π () is a mathematical constant. It is defined as the ratio of a circle's circumference to its diameter, and it also has various equivalent definitions. It appears in many formulas in all areas of mathematics and physics. The earliest known use of the Greek letter π to represent the ratio of a circle's circumference to its diameter was by Welsh mathematician William Jones in 1706. It is approximately equal to 3.14159. It has been represented by the Greek letter "π" since the mid-18th century, and is spelled out as "pi". It is also referred to as Archimedes' constant.Being an irrational number, π cannot be expressed as a common fraction, although fractions such as 22/7 are commonly used to approximate it. Equivalently, its decimal representation never ends and never settles into a permanently repeating pattern. Its decimal (or other base) digits appear to be randomly distributed, and are conjectured to satisfy a specific kind of statistical randomness.
It is known that π is a transcendental number: it is not the root of any polynomial with rational coefficients. The transcendence of π implies that it is impossible to solve the ancient challenge of squaring the circle with a compass and straightedge.
Ancient civilizations, including the Egyptians and Babylonians, required fairly accurate approximations of π for practical computations. Around 250 BC, the Greek mathematician Archimedes created an algorithm to approximate π with arbitrary accuracy. In the 5th century AD, Chinese mathematics approximated π to seven digits, while Indian mathematics made a five-digit approximation, both using geometrical techniques. The first exact formula for π, based on infinite series, was discovered a millennium later, when in the 14th century the Madhava–Leibniz series was discovered in Indian mathematics.The invention of calculus soon led to the calculation of hundreds of digits of π, enough for all practical scientific computations. Nevertheless, in the 20th and 21st centuries, mathematicians and computer scientists have pursued new approaches that, when combined with increasing computational power, extended the decimal representation of π to many trillions of digits. The primary motivation for these computations is as a test case to develop efficient algorithms to calculate numeric series, as well as the quest to break records. The extensive calculations involved have also been used to test supercomputers and high-precision multiplication algorithms.
Because its most elementary definition relates to the circle, π is found in many formulae in trigonometry and geometry, especially those concerning circles, ellipses, and spheres. In more modern mathematical analysis, the number is instead defined using the spectral properties of the real number system, as an eigenvalue or a period, without any reference to geometry. It appears therefore in areas of mathematics and sciences having little to do with geometry of circles, such as number theory and statistics, as well as in almost all areas of physics. The ubiquity of π makes it one of the most widely known mathematical constants—both inside and outside the scientific community. Several books devoted to π have been published, and record-setting calculations of the digits of π often result in news headlines.

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  1. R

    Hybridization and Sigma and Pi bonds

    Say we have sp2 hybridization of nitrogen, can the unhybridized p orbital form sigma bonds too or can it only form pi bonds? So in the case of nitrogen, it would be able to form molecules with 2 sigma bonds and one pi bond, correct? Thanks
  2. M

    Is Pi a Transcendental Number and How Can a Circle Have a Radius of Pi?

    A passage from "Excursions in Number Theory": "A transcendental number is not a solution of any algebraic equation. Pi is a familiar example of such a number and there are infinitely many others. A circle, centered at the origin, with radius pi (or any other transcendental number) has on it...
  3. marcus

    Bianchi's PI talk on quantum polyhedra in LQG

    http://pirsa.org/10110052/ Quantum polyhedra in loop quantum gravity Eugenio Bianchi "Interwiners describe quanta of space in loop quantum gravity. In this talk I show that the Hilbert space of SU(2) intertwiners has as semiclassical limit the phase space of a classical system originally...
  4. N

    PI controller (feed back control) for boost converter

    Hello Everyone, I am trying to put together a PI controller for a boost converter. Vin = 150V Vout = 300V (Require this much boost) Switching Frequency = 25KHz I am attaching a schematic in PSPICE. Please , someone, tell me if the connections are right. Also V-PULSE / SAWTOOTH = (0...
  5. F

    Understanding the \Pi Notation for Calculus Homework | Help and Explanation

    Homework Statement \Pi_{n=1}^{5} n Homework Equations My teacher assumed I learned this in calc 2 but I was never taught this. Can someone tell me what this thing is called?
  6. P

    Delocalised pi electrons in benzene

    Why do pi electrons in a benzene move?
  7. R

    Exploring the Impact of Extreme Gravity on Pi

    Hi, this thought came to my mind..not sure how correct this is. In extreme gravity, the space curves. Will the value of Pi change in this case, for a circle near such gravity ? pi = circumference/diameter.
  8. P

    Is this considered a closed expression for pi?

    ln(-1)/i=pi this equation does not use limits or integrals, as you can see, but it does involve imaginary numbers. Does this make it an open expression, or does the fact that it uses i not matter?
  9. M

    What is the Integral of x^2 sin pi x?

    My calc is a bit rusty & i can not solve this problem for the life of me. its the integral of x^2sin pi x. I know you must integrate by parts..& i am have tried using both x^2 and sin pi x as my u. Any help? time is of the essence.
  10. S

    Proof That Pi = 2: Intuitively Wrong?

    The proof is intuitively wrong, but I just can't figure out where. (Circumference = 2pi*r) 1. Consider a rod of length L = 2. Draw a semicircle around it, which has radius R=1 and arclength C= pi 2. Now draw two small semi circles, one going from the midpoint of the rod to the top and to...
  11. G

    Buckingham PI Theorem proof - Dimensional Analysis

    Homework Statement I am looking for a proof of Buckingham PI theorem in dimensional analysis, but can't really find one anywhere. I saw a proof involving posing the problem as a question in linear algebra, but it was quite unclear.
  12. P

    Does there exist a limit for calculating pi?

    note that by limit I mean the calculus operation, as in limf(x) as x->a. I was playing around with numbers earlier today and came up with a limit that gives an exact value for pi. I want to know if others have devised limits that equal to pi, because I am not sure if I am the first because my...
  13. T

    A billion consective zeros in pi

    Pi is an irrational number with an unpredictable distribution of the numbers 0 to 9. Yet patterns do emerge. Can we say with certainty that there is some point in pi where there are a billion consecutive zeros? Is there any way to calculate the number of digits of pi that must be expanded to...
  14. N

    Is Pi More Complex than E? Insights from Number Theory

    I was reading a book on number theory, and there was an interesting dicussion about pi and e. It state that it took about one third less time to compute e to 100,000 places when compare to pi. Additionally, it stated that no "simple" partial fraction (that is, one in which all numerators are...
  15. G

    What Are Some Interesting Properties of Pi?

    So if Pi is an irrational number, and therefore has an infinite line of numbers after the decimal point; my intuition tells me it would take an infinite amount of time to determine its exact value. a) Do calculators and computers somehow know Pi's exact value or is it just an estimate? b)...
  16. Char. Limit

    Pi or Pie: Which is More Important to You?

    So, I was browsing the complaints in the Forum Feedback today, just for fun, and I thought of something. Pi is commonly misspelled as "pie". And I got thinking, which is more important? Pi or pie? Which would you rather have? And this poll was born, in a feverish stupor I might add. So...
  17. D

    Numeric result for an integral solution to pi

    Homework Statement I am posting for my son, who needs the full readout for a formula, more than what a small graphing calculator can do. Is there such a program for that? Am I in the right place to get an answer for this? I would appreciate any help in this for my mathmatical skills are...
  18. D

    Integral solution to pi numeric result

    I am posting for my son, who needs the full readout for a formula, more than what a small graphing calculator can do. Is there such a program for that? Am I in the right place to get an answer for this? I need the numeric result of "2 times the inverted sign of 1 minus the inverted sign of...
  19. M

    Understanding Dedekind Cuts and the Construction of Real Numbers in Analysis

    Hi, I am independently learning analysis, I found videos online and Rudin's textbook, though I am unclear on one thing. I thought the point of dedekind cuts was to construct the reals without explicitly talking about the irrationals, which is why to get at the square root of 2 you let the cut be...
  20. D

    Solve for Θ: Find Value of Θ When pi ≤ Θ ≤ 2pi, cos Θ = cos 1

    Homework Statement If pi ≤ Θ ≤ 2pi and cos Θ = cos 1, what is the value of Θ? Round to nearest hundredth. Homework Equations The Attempt at a Solution cos 1 = ~.54 then I didn't really understand how to interpret the "If pi ≤ Θ ≤ 2pi" Thanks for your help.
  21. A

    To PI or not to PI challenge. Stern-Brocot

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  22. M

    Approximating Pi with Power series

    How can I go about using a power series representation of arctan(x) to approximate Pi to five digits?
  23. M

    Fourier Series of a constant (Pi)?

    Homework Statement Determine the Fourier series of f(x) = pi + x Homework Equations The Attempt at a Solution I see you have to calculate the two "series" separately and then add them. I know that the Fourier series of pi is just pi - but i was wondering why (i know that sounds...
  24. P

    The derivation of pi using limits

    I was looking up how pi was derived, and found this: http://mathforum.org/library/drmath/view/52589.html Question: How were the quantities n*sin(180/n) and n*tan(180/n) found/derived?
  25. E

    Exploring e^{\pi i}: Is It -1 or -e^{-2k\pi^{2}}?

    1. Compute all the values of e^ {\pi i} , indicating clearly whether there is just one or many of them. Trivially, exp(pi * i) = -1. However, we can also consider e to be the complex number z, and pi * i to be the complex number alpha. Then we get: e^{\pi i} = z^{\alpha} = e^{\alpha...
  26. T

    Number sequence is present in the decimal expansion of pi?

    Is it true that every possible finite number sequence is present in the decimal expansion of pi?
  27. D

    Fourier series (integration of pi)

    Homework Statement Hi First of all this a textbook question from Stroud Advanced Engineering Mathematics, solution is given, but no steps are shown. A question I just can't seem to solve at the moment, as below. A function f(x) is defined by f(x) = \pi - x:0 < x < \pi f(x + 2\pi) = f(x)...
  28. S

    Calculating Pi Electron Count with Huckel Rule

    I was studying Huckel Rule. And I stuck on one of the point. (iv) The total number of pi electrons in the molecular species or ion should be 4n + 2 where n = 0, 1, 2, ...... etc. But I don't know how to calculate the number of pi electron. Do you have any idea about it.
  29. M

    Orthogonal Properties for Sine Don't Hold if Pi is involded?

    Orthogonal Properties for Sine Don't Hold if Pi is involded?? Normally I know \int_{-L}^L \sin \frac{n x}{L} \sin \frac{\m x}{L} ~ dx = 0\mbox{ if }n\not =m , \ =L \mbox{ if }n=m but apparently this doesn't work for \int_{-L}^L \sin \frac{\pi n x}{L} \sin \frac{\pi m x}{L} ~ dx I am...
  30. L

    Residue of e^(az)/(1+e^z)^2 at I Pi

    Homework Statement I need to find the residue of e^(az)/(1+e^z)^2 at I Pi. For some reason this is such much harder than I thought it was going to be. Mathematica is not even helping :(. Homework Equations Cauchy's kth Integral formula. The Attempt at a Solution I made an...
  31. P

    Help Calculating Pi using Arctangent formula

    Homework Statement Using the Arctangent formula pi = 16 * arctan (1 / 5) - 4*arctan(1 / 239) to calculate the value of pi to 53 significant digits.Homework Equations The power series of arctangent(x) is = x − x^3/3 + x^5/5 − x^7/7 + x^9/9... The Attempt at a Solution...
  32. E

    How is Pi Generated? Answers to Your Questions

    I was thinking about this recently since it was pi a few days ago :) How is pi, the number, generated in a way that can go on forever? How are extra characters discovered? Thanks.
  33. L

    What is the numerical value of Pi and why do we celebrate it on March 14th?

    Happy Pi day everyone :) 3.141 5926 5358 9793 2384 6264 3383 2795 0288 4197 1693 9937 5105 8209 7494 4592 3078 1640 6286 2089 9862 8034 8253 4211 7067 9821 4808 6513 2823 0664 7093 8446 0955 0582 2317 2535 9408 1284 8111 7450 2841 0270 1938 5211 0555 9644 6229 4895 4930 3819 6442 8810 9756...
  34. Borg

    Happy PI Day 2010: Google Finds Math Fun!

    I went to Google this morning and found out that today is http://www.cnn.com/2010/TECH/03/12/pi.day.math/" . :biggrin:
  35. G

    Make this definition of pi work

    I quite like the following definition of pi and I wonder which minimal algebraic rules are needed to make this definition work? \lim_{n\to\infty}\left(1+\frac{a}{n}\right)^n=1 \therefore |a|=2\pi k (For example, are there algebras more general than complex numbers, where this works?)
  36. I

    Pi and Einstein field equations

    I understand the difference betw mathematical and physical pi. I also understand that in non-Euclidean space the value of pi would differ depending on a surface's deviation from flatness. But is there a different symbol for physical pi, to distinguish it from mathematical pi? Because I...
  37. I

    Why does PI occur so much in physics?

    What's so special about PI? Why does it appear in so much in physics? Einstein's field equations, Coulomb's Law, Kepler's Third law constant, uncertainty principle... This wouldn't be a co-incidence. Surely there's an underlying reason for this that we don't know yet?
  38. R

    How is the number Pi, derived?

    How is the number 3.14159...etc, derived? I know it has been calculated out to very great lengths and I'm wondering how it's done.
  39. e2m2a

    Pi, momentum, and kinetic energy

    There is a geometric way one can show the relation between kinetic energy and momentum which is a mathematical curiosity in my opinion. Let the mass of an object be equal to 2 PI. Then: P = 2 pi v KE = 1/2 (2 pi ) v sq or KE = pi v...
  40. M

    Writing decimal radians in terms of Pi

    Hello :smile: Sorry if this is in the wrong place, I don't know where else to put it. Is there a way to write radians as decimals in terms of Pi? I'm currently doing Polar Coordinates with Argand Diagrams, and this is something I'm curious about. I've just done a question and come...
  41. D

    ~(p->q) of part of A Probabilistic Proof of Wallis's Formula for pi

    Homework Statement Write in symbols the negation of the theorem stated in part a. part a:We immediately see that if g(x) is a nonnegative continuous function whose integral is finite, then there exists an a>0 such that a*g(x) is a continuous probability distribution (take a=1/\int g(x)dx...
  42. E

    Line segment of length pi (Just a thought I've had)

    If you were to imagine a line segment of length pi, I would guess it would have to be finite. But since pi is an irrational number, it has infinitely many decimals so can't you just keep sort of zooming in on the end of the segment so that it sort of keeps on getting longer indefinitely? Pi...
  43. P

    Solving the Pendulum Equation: L, T, pi & g

    This is one question that's giving me a bit of trouble to handle. The Period of a pendulum is given by the following equation: where T= period of pendulum (seconds) L= Length of pendulum (meters) g= acceleration doe to gravity (meters per second2) Solve this equation in terms of L, T...
  44. S

    Calculating Period T in Terms of pi, λ, and g

    Homework Statement Find the period T for a wave of wavelength (lambda) . Express the period in terms of pi, lambda , and g. Homework Equations T = lambda/velocity, lambda = velocity/frequency T= 1/frequency k (wave number) = 2pi/lambda V = Squareroot of (g/k) The Attempt at a...
  45. W

    Buckingham Pi Theorem Explained: Understanding Variables and Parameters

    Heya, I'm new here and really need help! So I'm having trouble with the *Buckingham Pi Theorem*. I think I've got the jist of it bar one thing...So you have a bunch of variables e.g a force, velocity, denisty, length, viscosity, speed of sound: f(F, V, roh, L, mu, a) Do the (N variables - M...
  46. J

    Why is pi = circumference / diameter ?

    Why do we take pi as the ratio of the circumference to the diameter, and not diameter to the circumference? Is it because circumference is always bigger than the diameter, so that it will be easy to work with the ratio? Or is it something fixed by those who discovered it and we can't change it?
  47. A

    2nd order non-homogeneneous ODE - how to find PI

    Homework Statement Find the general and, if possible, particular solutions of the following ordinary differential equations: y''+9y=36sin3x (hint: modification rule for PI) Homework Equations Knowledge of ODE's y = y_{aux}+y_{particular} The Attempt at a Solution I get the compementary...
  48. J

    How Do You Integrate 4cos(n pi t)?

    Homework Statement integrate: 4*cos(n pi t) d(t) Homework Equations The Attempt at a Solution is it: [4sin(n pi t)]/n.pi or [4t sin (n pi t)]/n.pi any help very much welcome.
  49. B

    Last Digit of Pi in the measurable universe

    as constrained by the Plank Length. Any ideas on how to solve this
  50. V

    Can YOU Beat My Record for Memorizing Digits of Pi?

    Pi. An infinite number. INFINITE. People have been memorizing the digits of pi to a certain number of decimal places. A challenge for you: how many can YOU remember? I hold the world age record(i actually don't, because i haven't told anyone except my friends about it) for memorizing 1500...
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