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- '''Heron's Formula''' (sometimes called Hero's formula) is a [[mathematical formula * [http://www.scriptspedia.org/Heron%27s_Formula Heron's formula implementations in C++, Java and PHP]4 KB (675 words) - 22:45, 6 October 2024
- #REDIRECT [[Heron's Formula]]29 bytes (3 words) - 12:55, 22 December 2007
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- '''Heron's Formula''' (sometimes called Hero's formula) is a [[mathematical formula * [http://www.scriptspedia.org/Heron%27s_Formula Heron's formula implementations in C++, Java and PHP]4 KB (675 words) - 22:45, 6 October 2024
- Brahmagupta's formula reduces to [[Heron's formula]] by setting the side length <math>{d}=0</math>.3 KB (543 words) - 18:35, 29 October 2024
- ...s(s-a)(s-b)(s-c)}</math>, where <math>s</math> is the [[semiperimeter]] ([[Heron's Formula]]).4 KB (631 words) - 20:16, 8 October 2024
- Two other well-known examples of formulas involving the semiperimeter are [[Heron's formula]] and [[Brahmagupta's formula]].740 bytes (113 words) - 14:19, 11 July 2024
- * [[Heron's formula]]: <math>K=\sqrt{s(s-a)(s-b)(s-c)}</math>, where <math>a, b</math === Other formulas <math>K = f(a,b,c)</math> equivalent to Heron's ===6 KB (1,181 words) - 13:01, 23 October 2024
- ...thagorean Theorem]] and is used to prove several famous results, such as [[Heron's Formula]] and [[Stewart's Theorem]]. However, it sees limited applicabili8 KB (1,217 words) - 19:15, 7 September 2023
- ...ath>m = 4\sqrt{2}</math>, and thus <math>AB = 26</math>. You can now use [[Heron's Formula]] to finish. The answer is <math>24 \sqrt{14}</math>, or <math>\b Finally, you can use [[Heron's Formula]] to get that the area is <math>24\sqrt{14}</math>, giving an ans5 KB (906 words) - 22:15, 6 January 2024
- From here, we can use Heron's Formula to find the altitude. The area of the triangle is <math>\sqrt{21*14 KB (2,340 words) - 15:38, 21 August 2024
- This triangle has [[semiperimeter]] <math>\frac{2 + 3 + 4}{2}</math> so by [[Heron's formula]] it has [[area]] <math>K = \sqrt{\frac92 \cdot \frac52 \cdot \fr5 KB (763 words) - 15:20, 28 September 2019
- ...th side-lengths <math>2\sqrt5,2\sqrt6,</math> and <math>2\sqrt7,</math> by Heron's Formula, the area is the square root of the original expression.3 KB (460 words) - 23:44, 4 February 2022
- === Solution 2 (Mass Points, Stewart's Theorem, Heron's Formula) === .../math> and <math>h_{\triangle ABC} = 2h_{\triangle BCP}</math>. Applying [[Heron's formula]] on triangle <math>BCP</math> with sides <math>15</math>, <math>14 KB (2,234 words) - 22:46, 30 June 2024
- ...>, so the area is <math>\frac14\sqrt {(81^2 - 81x^2)(81x^2 - 1)}</math> by Heron's formula. By AM-GM, <math>\sqrt {(81^2 - 81x^2)(81x^2 - 1)}\le\frac {81^2 ...e after letting the two sides equal <math>40x</math> and <math>41x</math>. Heron's gives4 KB (703 words) - 22:13, 30 August 2024
- ...minor arc <math>\stackrel{\frown}{BC}</math>. The former can be found by [[Heron's formula]] to be <math>[BCE] = \sqrt{60(60-48)(60-42)(60-30)} = 360\sqrt{33 KB (484 words) - 12:11, 14 January 2023
- Now see that by Heron's, <cmath>[DEP] = [DEF] = \sqrt{(16 + 2 \sqrt{13})(16 - 2 \sqrt{13})(1 + 27 KB (1,175 words) - 12:26, 3 September 2024
- ...th>[CAP] + [ABP] + [BCP] = [ABC] = \sqrt {(21)(8)(7)(6)} = 84</math>, by [[Heron's formula]].7 KB (1,184 words) - 12:25, 22 December 2022
- ...x \cdot 2}{2} = 50 + x</math>, we get <math>(21)(50 + x) = A</math>. By [[Heron's formula]], <math>A = \sqrt{s(s-a)(s-b)(s-c)} = \sqrt{(50+x)(x)(23)(27)}</3 KB (472 words) - 18:03, 21 June 2024
- ...</math> and <math>\sqrt{4^{2}+6^{2}}</math>, so using the expanded form of heron's formula, <cmath>\begin{align*}[ABC]&=\sqrt{\dfrac{2(a^{2}b^{2}+b^{2}c^{2}8 KB (1,241 words) - 12:47, 1 October 2024
- ...ABC</math> is <math>s = \frac{20 + 21 + 22}{2} = \frac{63}{2}</math>. By [[Heron's formula]], the area of the whole triangle is <math>A = \sqrt{s(s-a)(s-b)(11 KB (1,829 words) - 05:57, 30 September 2024
- ...asy to get that <math>\sin \angle AEP = \frac{\sqrt{55}}{8}</math> (equate Heron's and <math>\frac{1}{2}ab\sin C</math> to find this). Now note that <math>\ \end{matrix}\right|=\frac{16}{81}.</cmath>By Heron's Formula, we have <math>[ABC]=\frac{81\sqrt{55}}{2}</math> which immediate7 KB (1,170 words) - 22:15, 11 July 2024
- ...Now we have all segments of triangles AGF and ADC. Joy! It's time for some Heron's Formula. This gives area 10.95 for triangle AGF and 158.68 for triangle A4 KB (643 words) - 21:44, 8 August 2023
