"울프람알파의 활용"의 두 판 사이의 차이
Pythagoras0 (토론 | 기여) 잔글 (찾아 바꾸기 – “<h5>” 문자열을 “==” 문자열로) |
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| 7번째 줄: | 7번째 줄: | ||
| − | + | ==개요</h5> | |
* 울프람 알파 | * 울프람 알파 | ||
| 16번째 줄: | 16번째 줄: | ||
| − | + | ==문제풀이와 울프람알파</h5> | |
* [http://blog.wolframalpha.com/2009/12/01/step-by-step-math/ Step-by-Step Math] | * [http://blog.wolframalpha.com/2009/12/01/step-by-step-math/ Step-by-Step Math] | ||
| 25번째 줄: | 25번째 줄: | ||
| − | + | ==방정식의 풀이</h5> | |
* [http://blog.wolframalpha.com/2010/01/14/solving-equations-with-wolframalpha/ Solving Equations with Wolfram|Alpha] | * [http://blog.wolframalpha.com/2010/01/14/solving-equations-with-wolframalpha/ Solving Equations with Wolfram|Alpha] | ||
| 33번째 줄: | 33번째 줄: | ||
| − | + | ==숙제와 울프람알파</h5> | |
* http://blog.wolframalpha.com/2010/01/22/is-it-cheating-to-use-wolframalpha-for-math-homework/ | * http://blog.wolframalpha.com/2010/01/22/is-it-cheating-to-use-wolframalpha-for-math-homework/ | ||
| 41번째 줄: | 41번째 줄: | ||
| − | + | ==그래프 그리기</h5> | |
| 100번째 줄: | 100번째 줄: | ||
| − | + | ==관련된 항목들</h5> | |
* [[프랙탈]] | * [[프랙탈]] | ||
2012년 11월 1일 (목) 01:37 판
이 항목의 스프링노트 원문주소
==개요
- 울프람 알파
- 연산능력을 갖춘 지식엔진
- http://www.wolframalpha.com
- http://mathdl.maa.org/images/upload_library/23/karaali/alpha/index.html
==문제풀이와 울프람알파
==방정식의 풀이
==숙제와 울프람알파
==그래프 그리기
10.4.44.
http://www.wolframalpha.com/input/?i=(r-(8%2B8sin+theta))(r+sin+theta+-4)%3D0
[/pages/4176465/attachments/2110589 1MSP761197847h1hg25e7he00004g3ehh9ag590ea81.gif]
Note that \(2\sin^2 \alpha +2\sin \alpha-1=0\).
Since \(0< \alpha <\frac{\pi}{2}\), \(\sin \alpha =\frac{\sqrt 3 -1}{2}\) and \(\cos \alpha =\sqrt{\frac{\sqrt 3}{2}}\)
\(\frac{1}{2}\int_{\alpha}^{\pi-\alpha}r^2 d\theta=\int_{\alpha}^{\pi/2}r^2 d\theta=\int_{\alpha}^{\pi/2}64(1+\sin\theta)^2d\theta\)
\(=64\int_{\alpha}^{\pi/2}(1+\sin\theta)^2d\theta=64\int_{\alpha}^{\pi/2}1+2\sin\theta+\sin^2\theta d\theta\)
\(=64[\frac{3}{2}\theta - 2 \cos \theta- \frac{1}{4}\sin 2\theta]_{\alpha}^{\pi/2}=[96\theta - 128 \cos \theta- 16\sin 2\theta]_{\alpha}^{\pi/2}\)
\(=[96\theta - 128 \cos \theta- 16\sin 2\theta]_{\alpha}^{\pi/2}=48\pi-96\alpha+128\cos \alpha+16\sin 2\alpha\)
We need to subtract from this the area of the triangle which is given by \[2\times \frac{1}{2}\cdot 4 (8+8\sin\alpha)\sin (\pi/2-\alpha)=32(1+\sin\alpha)\cos \alpha=32\cos \alpha+16 \sin 2\alpha\]
So the area will be given by \[48\pi-96\alpha+128\cos \alpha+16\sin 2\alpha-(32\cos \alpha+16 \sin 2\alpha)=48\pi-96\alpha+96\cos \alpha\approx 204.16\]
http://www.wolframalpha.com/input/?i=N[48pi+-96(arcsin{(sqrt+3+-+1)/2})%2B96(sqrt((sqrt+3)/2)),10]
사용예
- http://www.wolframalpha.com/input/?i=r^2
- http://www.wolframalpha.com/input/?i=
- http://www.wolframalpha.com/input/?i=
- http://www.wolframalpha.com/input/?i=
==관련된 항목들