tan ๊ทธ๋ž˜ํ”„์˜ ์ ๊ทผ์„ 

์‚ผ๊ฐํ•จ์ˆ˜์ธ ํƒ„์  ํŠธ ๊ทธ๋ž˜ํ”„์˜ ์ ๊ทผ์„ ์˜ ๊ผด์€ ๋‹ค์Œ๊ณผ ๊ฐ™๋‹ค. (์•”๊ธฐ!): $y=tan$(์‹) ์ผ ๋•Œ ์—ฌ๊ธฐ์„œ (์‹)์— ๋“ค์–ด๊ฐˆ ๋ถ€๋ถ„(์ ๊ทผ์„ )์€ $n\pi +\frac{\pi}{2}$

  • format_list_bulleted ๐Ÿซ Study/Math
  • · 2021. 8. 13.
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์—ฌ๋Ÿฌ ๊ฐ€์ง€ ์ˆ˜์—ด์˜ ๊ท€๋‚ฉ์  ์ •์˜ & ์œ ํ˜•

$a_{n+1}=pa_n+q$ ๊ผด์˜ ์ˆ˜์—ด (pqํ˜• ์ ํ™”์‹(๊ด€๊ณ„์‹)) * ๊ด€๊ณ„์‹์ด ์ž˜ ์•ˆ๋ณด์ž„ [๋ณ€ํ˜• ๋ฐฉ๋ฒ• ์™ธ์šฐ๊ธฐ] $a_{n+1}-\alpha =p(a_n-\alpha )$ $a_{n+1} =p(a_n-p\alpha +\alpha)$ โ–ถ $q=-p\alpha +\alpha $ $\alpha=p\alpha +q$ ($a_{n+1}=pa_n+q$ ๊ผด๊ณผ ๋น„์Šท) ๋„์›€์ด ๋ ๋งŒํ•œ ์ž๋ฃŒ https://m.blog.naver.com/ao9364/221651296608 ์ˆ˜์—ด์˜ ์ ํ™”์‹์˜ ๊ธฐ์ดˆ ํ•ด๋ฒ•๊ณผ ํŠน์„ฑ๋ฐฉ์ •์‹ ์ดํ•ดํ•˜๊ธฐ ๋“ค์–ด๊ฐ€๊ธฐ... ์ ํ™”์‹์„ ์ง์ ‘ ํ’€์–ด๋‚ด๋Š” ๋ฐฉ๋ฒ•์€ ์‚ฌ์‹ค ๊ต์œก๊ณผ์ •์—์„œ ๋น ์ง„์ง€ ์ข€ ์˜ค๋ž˜๋˜์—ˆ์ฃ ... ๋ฌผ๋ก  ๊ณ ๋“ฑํ•™๊ต ๋ชจ... blog.naver.com ๋ถ„์ˆ˜ ๊ผด์˜ ๊ด€๊ณ„์‹ : ์—ญ์ˆ˜ ์ทจํ•ด์„œ(๋’ค์ง‘์–ด์„œ) ๊ณ„์‚ฐ ํ›„ $\frac{1..

  • format_list_bulleted ๐Ÿซ Study/Math
  • · 2021. 8. 10.
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์ˆ˜ํ•™์  ๊ท€๋‚ฉ๋ฒ•

์ˆ˜์—ด์˜ ๊ท€๋‚ฉ์  ์ •์˜ : ์ผ๋ฐ˜์ ์œผ๋กœ ์ˆ˜์—ด {$a_n$}์„ ์ฒ˜์Œ ๋ช‡ ๊ฐœ์˜ ํ•ญ๊ณผ ์ด์›ƒํ•˜๋Š” ์—ฌ๋Ÿฌ ํ•ญ ์‚ฌ์ด์˜ ๊ด€๊ณ„์‹์œผ๋กœ ์ •์˜ํ•˜๋Š” ๊ฒƒ ๋“ฑ์ฐจ์ˆ˜์—ด์˜ ๊ท€๋‚ฉ์  ์ •์˜ [1] $a_{n+1}=a_n+d$ $\Leftrightarrow a_{n+1}-a_n=d$ (์ผ์ •) (์ดํ•ญ) $\Leftrightarrow 2a_{n+1}=a_n+a_{n+2}$ (๋“ฑ์ฐจ์ค‘ํ•ญ์˜ ์„ฑ์งˆ ์ด์šฉ) [2] $a_{n+1}=a_n+f(n)$ → $a_n=a_1+f(1)+f(2)+...+f(n-1)$ (์ถ•์ฐจ๋Œ€์ž…๋ฒ• ์ด์šฉ) → $a_n=a_1+\sum_{k=1}^{n-1}f(k)$ (์™ธ์›Œ๋‘๋ฉด ์ •๋ง ํŽธ๋ฆฌ?) ๋“ฑ๋น„์ˆ˜์—ด์˜ ๊ท€๋‚ฉ์  ์ •์˜ [1] $a_{n+1}=r\times a_n$ $\Leftrightarrow \frac{a_{n+1}}{a_n}=r$ (์ผ์ •) $\L..

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  • · 2021. 8. 10.
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์œ ๋ฆฌ์‹๊ณผ ์œ ๋ฆฌํ•จ์ˆ˜ - ๋ถ€๋ถ„๋ถ„์ˆ˜ ํ’€๊ธฐ

$\frac{1}{AB}=\frac{1}{B-A}(\frac{1}{A}-\frac{1}{B})$ >> $\frac{C}{AB}=\frac{C}{B-A}(\frac{1}{A}-\frac{1}{B})$ ($a\neq b$) (B๊ฐ€ A๋ณด๋‹ค ํฐ๊ฒŒ ์ข‹์Œ) (๊ณ 1 ์ˆ˜ํ•™I ์ˆ˜์—ด์˜ ํ•ฉ(์‹œ๊ทธ๋งˆ)์—์„œ๋„ ์‘์šฉํ•˜์—ฌ ์‚ฌ์šฉ๋จ..) ์ˆ˜์—ด์˜ ํ•ฉ - ์‹œ๊ทธ๋งˆ ($\sum$) ํ•ฉ์˜ ๊ธฐํ˜ธ ์‹œ๊ทธ๋งˆ ($\sum$ | Sigma) : ์ˆ˜์—ด $\{a_n\}$์˜ ์ฒซ์งธํ•ญ๋ถ€ํ„ฐ ์ œnํ•ญ๊นŒ์ง€์˜ ํ•ฉ $a_1+a_2+a_3+...+a_n$์„ ํ•ฉ์˜ ๊ธฐํ˜ธ $\sum$(์‹œ๊ทธ๋งˆ)๋ฅผ ์ด์šฉํ•˜์—ฌ $\sum_{k=1}^{n}a_k$์™€ ๊ฐ™์ด ๋‚˜ํƒ€๋‚ธ๋‹ค. >> ๋“ฑ์ฐจ์ˆ˜์—ด๋„, ๋“ฑ๋น„์ˆ˜.. blog.scian.io

  • format_list_bulleted ๐Ÿซ Study/Math
  • · 2021. 8. 7.
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๋ถ€๋ถ„์˜ ํ•ฉ์ด ์ฃผ์–ด์ง„ ๋“ฑ๋น„์ˆ˜์—ด

๋ถ€๋ถ„์˜ ํ•ฉ์ด ์ฃผ์–ด์ง„ ๋“ฑ๋น„์ˆ˜์—ด

ex) ๋“ฑ๋น„์ˆ˜์—ด ${a_n}$์˜ ์ฒซ์งธํ•ญ๋ถ€ํ„ฐ ์ œnํ•ญ๊นŒ์ง€์˜ ํ•ฉ $S_n$์— ๋Œ€ํ•˜์—ฌ $S_n=30, S_{2n}=50$์ผ ๋•Œ, $S_{3n}$์˜ ๊ฐ’์„ ๊ตฌํ•˜์‹œ์˜ค. - ์Žˆ ์ˆ˜ํ•™ I / 146p 970๋ฒˆ ๋ฌธ์ œ $ \begin{aligned}\dfrac{a\left( r^{2n}-1\right) }{r-1}=50\\ \dfrac{a\left( r^{n}-1\right) }{r-1}=30\\ \dfrac{\dfrac{a\left( r^{2n}-1\right) }{r-1}}{\dfrac{a\left( r^{n}-1\right) }{r-1}}=\dfrac{5}{3}\\ \dfrac{r^{2n}-1^{2}}{r^{n}-1}=\dfrac{\left( r^{n}+1\right) \left( r^{n}-1\right) }{r^{..

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  • · 2021. 8. 7.
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1๋ถ€ํ„ฐ ์‹œ์ž‘ํ•˜๋Š” ์—ฐ์†๋œ ํ™€์ˆ˜์˜ ํ•ฉ

1๋ถ€ํ„ฐ ์‹œ์ž‘ํ•˜๋Š” ์—ฐ์†๋œ ํ™€์ˆ˜ n๊ฐœ์˜ ํ•ฉ: $n^2$๊ฐœ ex)$1=1^2$ $1+3 = 2^2$ $1+3+5 = 3^2$

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  • · 2021. 8. 6.
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