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  • This problem is a direct application of the chromatic polynomial of a graph, represented by <math>P_k(G)</math>,
    14 KB (2,425 words) - 09:13, 5 November 2023
  • To compute this, we use a clever application of the [[binomial theorem]]. ...1} \equiv 11^{11} \pmod{1000}</math>. We can then proceed using the clever application of the Binomial Theorem, or we can just proceed with solution 6 from here.
    9 KB (1,288 words) - 20:47, 13 June 2024
  • ...are within a certain margin of error (which might change depending on the application) of each other, as seen below. So this code is bad:
    2 KB (313 words) - 16:16, 31 July 2020
  • ..., we can simply use the number of coordinate points to get the formula. In application, we get the formula <math>\frac{3}{2} + 0 - 1</math>, which equals <math>\f
    3 KB (378 words) - 11:31, 27 June 2023
  • A simple application of [[De Moivre's Theorem]] shows that <math>w</math> is a ninth root of uni
    3 KB (447 words) - 21:21, 17 July 2020
  • ...ations ->Type 'terminal' in the search box -> Double click on the terminal application icon.)
    2 KB (373 words) - 21:44, 15 March 2012
  • ...rac{1 + \frac{169}{225} - \frac{64}{225}}{\frac{26}{15}}</math> by another application of the Law of Cosines to triangle <math>DCB</math>, so <math>\cos \angle B
    9 KB (1,523 words) - 12:23, 7 September 2022
  • ...''' Go to your installation directory and double click on the Eclipse.exe application to run it. Each time you run Eclipse, it will ask you for a workspace for * The HelloWorldApp class implements an application that
    8 KB (1,222 words) - 17:47, 9 October 2014
  • ==Solution 6 (Heron's Formula Application)==
    6 KB (934 words) - 20:06, 24 January 2021
  • The regular application tuition for the residential program is &#036;3185 in 2014, and for the day
    658 bytes (105 words) - 17:23, 11 August 2014
  • ...inimized when it is equal to <math>C_2B</math>. (Proving this is a simple application of the triangle inequality; for an example of a simpler case, see Heron's S
    4 KB (665 words) - 04:35, 22 January 2024
  • ...n of <math>B'C'</math> and <math>AE</math> with <math>G</math>. By another application of the law of sines, <math>B'G = \frac{23}{\sqrt{24}}</math> and <math>AE =
    2 KB (376 words) - 22:41, 26 December 2016
  • Of course, the immediate application of greedy algorithms does not always produce the optimal result. For exampl
    9 KB (1,535 words) - 17:44, 24 November 2016
  • ...}{5}</math>. Thus, <math>EB=3</math> and <math>EC=4</math> from simple sin application.
    2 KB (314 words) - 23:23, 21 June 2018
  • This looks like an easy application of Routh's Theorem, except we are only given information about the ratios o
    13 KB (2,008 words) - 23:42, 17 July 2023
  • ...is and applications will be closed once maximum enrollment is reached. The application contains a required problem set with a two-week deadline to submit.
    941 bytes (135 words) - 12:56, 26 November 2019
  • ...t <math>AX=d</math>, <math>BX=s</math>, and <math>CX=32-s</math>. After an application of Stewart's Theorem, we will get that <cmath>d=\sqrt{s^2-24s+900}</cmath> ...the inradius of <math>ACX</math> be <math>r_2</math>, we'll find, after an application of basic geometry and careful calculations on paper, that <math>[DBCEI_2I_1
    13 KB (2,200 words) - 21:36, 6 January 2024
  • This is a somewhat standard application of Titu's lemma. Notice that <cmath>\frac{1}{a} + \frac{4}{b} + \frac{9}{c} ...ath> <cmath>\geq \frac{(a + b + c)^2}{2(ab + ac + bc)}</cmath> This is the application of Titu's lemma. <cmath>\geq \frac{3(ab + bc + ac)}{2(ab + ac + bc)}</cmath
    5 KB (761 words) - 20:10, 29 April 2024
  • (This is an application of Legendre's formula).
    1 KB (191 words) - 04:14, 27 November 2021
  • ...letting point <math>C</math> be above the <math>x</math>-axis. Through an application of the Pythagorean Theorem and dropping an altitude to side <math>AB</math>
    12 KB (1,985 words) - 19:52, 28 January 2024

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