用戶:克勞棣/數學

過P點且與L垂直的直線方程式是${\displaystyle bx-ay+(an-bm)=0}$

解二元一次聯立方程組，求出兩直線交點Q的座標

${\displaystyle {\begin{cases}ax+by+c=0......(1)\\bx-ay+(an-bm)=0......(2)\\\end{cases}}}$

(1)式乘以a，(2)式乘以b

${\displaystyle \rightarrow {\begin{cases}a^{2}x+aby+ac=0\\b^{2}x-aby+(abn-b^{2}m)=0\\\end{cases}}}$

兩式相加，得${\displaystyle (a^{2}+b^{2})x+(abn-b^{2}m+ac)=0\rightarrow x={\frac {-abn+b^{2}m-ac}{a^{2}+b^{2}}}}$

(1)式乘以b，(2)式乘以a

${\displaystyle \rightarrow {\begin{cases}abx+b^{2}y+bc=0\\abx-a^{2}y+(a^{2}n-abm)=0\\\end{cases}}}$

兩式相減，得${\displaystyle (a^{2}+b^{2})y+(abm-a^{2}n+bc)=0\rightarrow y={\frac {-abm+a^{2}n-bc}{a^{2}+b^{2}}}}$

故${\displaystyle Q({\frac {-abn+b^{2}m-ac}{a^{2}+b^{2}}},{\frac {-abm+a^{2}n-bc}{a^{2}+b^{2}}})}$

利用兩點距離公式求出P與Q的距離

${\displaystyle {\begin{aligned}{\overline {PQ}}&={\sqrt {\left(m-{\frac {-abn+b^{2}m-ac}{a^{2}+b^{2}}}\right)^{2}+\left(n-{\frac {-abm+a^{2}n-bc}{a^{2}+b^{2}}}\right)^{2}}}\\&={\sqrt {\left({\frac {a^{2}m+b^{2}m+abn-b^{2}m+ac}{a^{2}+b^{2}}}\right)^{2}+\left({\frac {a^{2}n+b^{2}n+abm-a^{2}n+bc}{a^{2}+b^{2}}}\right)^{2}}}\\&={\sqrt {\left({\frac {a^{2}m+abn+ac}{a^{2}+b^{2}}}\right)^{2}+\left({\frac {b^{2}n+abm+bc}{a^{2}+b^{2}}}\right)^{2}}}\\&={\sqrt {\left[{\frac {a(am+bn+c)}{a^{2}+b^{2}}}\right]^{2}+\left[{\frac {b(bn+am+c)}{a^{2}+b^{2}}}\right]^{2}}}\\&={\sqrt {\frac {(a^{2}+b^{2})(am+bn+c)^{2}}{(a^{2}+b^{2})^{2}}}}\\&={\frac {|am+bn+c|}{\sqrt {a^{2}+b^{2}}}}\\\end{aligned}}}$

每一行、每一列、每條對角線的和=(1+2+3+4+5+6+7+8+9)/3=15

所以只要確定A,C,E的值，其他6格的值也就確定了

(A+E+I)+(C+E+G)+(B+E+H)+(D+E+F)=15+15+15+15=60=(A+B+C+D+E+F+G+H+I)+3E=45+3E，故E=(60-45)/3=5

所以只要再確定A,C的值即可

15為奇數，三個整數之和為奇數，則這三個整數須為「偶偶奇」或「奇奇奇」

若(A,C)為(偶,奇)，則(A,B,C,D,E,F,G,H,I)為(偶,偶,奇,偶,5,偶,奇,偶,偶)，共6個偶數，但1,2,3,...,9隻有4個偶數，不合，排除之

若(A,C)為(奇,偶)，則(A,B,C,D,E,F,G,H,I)為(奇,偶,偶,偶,5,偶,偶,偶,奇)，也是共6個偶數，同上，排除之

若(A,C)為(奇,奇)，則(A,B,C,D,E,F,G,H,I)為(奇,奇,奇,奇,5,奇,奇,奇,奇)，共9個奇數，同上，排除之

所以倘若有解，則(A,C)須為(偶,偶)，(A,B,C,D,E,F,G,H,I)為(偶,奇,偶,奇,5,奇,偶,奇,偶)，所以A,C,G,I皆為偶數

由於可以旋轉與翻轉，且2+5+4不等於15(即2,4不在同一條對角線上)，不失一般性，令A=2，C=4，則(A,B,C,D,E,F,G,H,I)為(2,9,4,7,5,3,6,1,8)，為8組解的其中一組。

${\displaystyle A+B+C=180^{\circ }}$

${\displaystyle {\begin{aligned}\tan C=\tan(180^{\circ }-(A+B))&=-\tan(A+B)\\&=-{\frac {\tan A+\tan B}{1-\tan A\tan B}}\\&={\frac {\tan A+\tan B}{\tan A\tan B-1}}\\\end{aligned}}}$

${\displaystyle \tan C\times (\tan A\tan B-1)=\tan A+\tan B}$

${\displaystyle \tan A\tan B\tan C-\tan C=\tan A+\tan B}$

${\displaystyle \tan A\tan B\tan C=\tan A+\tan B+\tan C}$

${\displaystyle \sum _{m=1}^{n}\sum _{k=1}^{m}\sum _{j=1}^{k}\sum _{i=1}^{j}i^{0}}$

${\displaystyle =\sum _{m=1}^{n}\sum _{k=1}^{m}\sum _{j=1}^{k}({\begin{matrix}\underbrace {1+1+1+\cdots +1} \\j\end{matrix}})}$

${\displaystyle =\sum _{m=1}^{n}\sum _{k=1}^{m}\sum _{j=1}^{k}j}$

${\displaystyle =\sum _{m=1}^{n}\sum _{k=1}^{m}(1+2+3+4+\cdots +k)}$

${\displaystyle =\sum _{m=1}^{n}\sum _{k=1}^{m}{\frac {k(k+1)}{2}}}$

${\displaystyle ={\frac {1}{2}}\sum _{m=1}^{n}\sum _{k=1}^{m}(k^{2}+k)}$

${\displaystyle ={\frac {1}{2}}\sum _{m=1}^{n}\left({\frac {m(m+1)(2m+1)}{6}}+{\frac {m(m+1)}{2}}\right)}$(分數通分，並因式分解)

${\displaystyle ={\frac {1}{2}}\sum _{m=1}^{n}{\frac {m(m+1)[(2m+1)+3]}{6}}}$

${\displaystyle =\sum _{m=1}^{n}{\frac {m(m+1)(m+2)}{6}}}$

${\displaystyle ={\frac {1}{6}}\sum _{m=1}^{n}[m(m+1)(m+2)]}$(把通項乘開)

${\displaystyle ={\frac {1}{6}}\sum _{m=1}^{n}(m^{3}+3m^{2}+2m)}$

${\displaystyle ={\frac {1}{6}}\times \left[{\frac {n^{2}(n+1)^{2}}{4}}+{\frac {3n(n+1)(2n+1)}{6}}+{\frac {2n(n+1)}{2}}\right]}$(分數通分，並因式分解)

${\displaystyle ={\frac {1}{6}}\times {\frac {n(n+1)[(n^{2}+n)+(4n+2)+4]}{4}}}$

${\displaystyle ={\frac {1}{6}}\times {\frac {n(n+1)(n^{2}+5n+6)}{4}}}$

${\displaystyle ={\frac {1}{6}}\times {\frac {n(n+1)(n+2)(n+3)}{4}}}$

${\displaystyle ={\frac {n(n+1)(n+2)(n+3)}{24}}}$

把個位數A移到最左邊，結果變成B倍

有一個正整數，不知道總共有幾位數，它的個位數是${\displaystyle A}$，若把個位數移到最左邊，成為最高位數，

則新數恰好是原數的${\displaystyle B}$倍。其中${\displaystyle A\in \left\{2,3,4,5,6,7,8,9\right\}}$，${\displaystyle B\in \left\{2,3,4,5,6,7,8,9\right\}}$，且${\displaystyle A\geq B}$。

考慮以下遞迴算式：

B×A=k₁

B×(k₁的個位數)+(k₁的十位數)=k₂ (k₁若為一位數，則其十位數視為0，下同)

B×(k₂的個位數)+(k₂的十位數)=k₃

B×(k₃的個位數)+(k₃的十位數)=k₄

.......

B×(k_n-1的個位數)+(k_n-1的十位數)=k_n

B×(k_n的個位數)+(k_n的十位數)=A (等號右邊第一次出現A)

請問為什麼原數最小為「(k_n的個位數) (k_n-1的個位數) (k_n-2的個位數).......(k₁的個位數) (A)」？

例如：有一個正整數，它的個位數是8，若把個位數移到最左邊，則新數恰好是原數的7倍。

7×8=56

7×6+5=47

7×7+4=53

7×3+5=26

7×6+2=44

7×4+4=32

7×2+3=17

7×7+1=50

7×0+5=5

7×5+0=35

7×5+3=38

7×8+3=59

7×9+5=68

7×8+6=62

7×2+6=20

7×0+2=2

7×2+0=14

7×4+1=29

7×9+2=65

7×5+6=41

7×1+4=11

7×1+1=8

所以原數最小是1159420289855072463768。

因為運算規則簡單但瑣碎，所以可以讓Excel幫我們算：

A1儲存格輸入「56」，A2儲存格輸入「=7*MOD(A1,10)+(A1-MOD(A1,10))/10」，

然後下拉複製即可。

${\displaystyle \cos \theta +i\sin \theta =e^{i\theta }=e^{i\theta \times 1}}$

${\displaystyle \cos 2\theta +i\sin 2\theta =e^{i2\theta }=e^{i\theta \times 2}}$

${\displaystyle \cos 3\theta +i\sin 3\theta =e^{i3\theta }=e^{i\theta \times 3}}$

${\displaystyle \cdots }$

${\displaystyle \cos n\theta +i\sin n\theta =e^{in\theta }=e^{i\theta \times n}}$

等號兩邊全部加起來

${\displaystyle (\cos \theta +\cos 2\theta +\cos 3\theta +\cdots +\cos n\theta )+i(\sin \theta +\sin 2\theta +\sin 3\theta +\cdots +\sin n\theta )}$

${\displaystyle =e^{i\theta \times 1}+e^{i\theta \times 2}+e^{i\theta \times 3}+\cdots +e^{i\theta \times n}}$（等比級數）

${\displaystyle ={\frac {e^{i\theta }\times (e^{i\theta \times n}-1)}{e^{i\theta }-1}}={\frac {e^{i{\color {Red}\theta \times (n+1)}}-e^{i\theta }}{e^{i\theta }-1}}={\frac {e^{i\times {\color {Red}2\pi }}-e^{i\theta }}{e^{i\theta }-1}}}$

（因為${\displaystyle e^{i\times 2\pi }=\cos 2\pi +i\sin 2\pi =1}$）

=${\displaystyle {\frac {1-e^{i\theta }}{e^{i\theta }-1}}={\frac {-(e^{i\theta }-1)}{e^{i\theta }-1}}=-1}$

實部等於實部，虛部等於虛部，故

${\displaystyle \cos \theta +\cos 2\theta +\cos 3\theta +\dots +\cos n\theta =-1}$，以及${\displaystyle \sin \theta +\sin 2\theta +\sin 3\theta +\dots +\sin n\theta =0}$

證明${\displaystyle F_{n}={\frac {1}{\sqrt {5}}}[\varphi ^{n}-(1-\varphi )^{n}]}$，其中${\displaystyle \varphi }$為黃金比例${\displaystyle {\frac {1+{\sqrt {5}}}{2}}}$，${\displaystyle n}$為任意整數

• 若${\displaystyle n}$為非負整數

當${\displaystyle n=0}$時，${\displaystyle {\frac {1}{\sqrt {5}}}[\varphi ^{0}-(1-\varphi )^{0}]={\frac {1}{\sqrt {5}}}[1-1]=0=F_{0}}$，成立

當${\displaystyle n=1}$時，${\displaystyle {\frac {1}{\sqrt {5}}}[\varphi ^{1}-(1-\varphi )^{1}]={\frac {1}{\sqrt {5}}}[\varphi -1+\varphi ]={\frac {1}{\sqrt {5}}}[2\varphi -1]={\frac {1}{\sqrt {5}}}\times {\sqrt {5}}=1=F_{1}}$，成立

設當${\displaystyle n=k}$及${\displaystyle n=k+1}$時皆成立，即${\displaystyle F_{k}={\frac {1}{\sqrt {5}}}[\varphi ^{k}-(1-\varphi )^{k}]}$且${\displaystyle F_{k+1}={\frac {1}{\sqrt {5}}}[\varphi ^{k+1}-(1-\varphi )^{k+1}]}$

當${\displaystyle n=k+2}$時

${\displaystyle {\begin{aligned}F_{k+2}&=F_{k+1}+F_{k}\\&={\frac {1}{\sqrt {5}}}[\varphi ^{k+1}-(1-\varphi )^{k+1}]+{\frac {1}{\sqrt {5}}}[\varphi ^{k}-(1-\varphi )^{k}]\\&={\frac {1}{\sqrt {5}}}[\varphi ^{k+1}+\varphi ^{k}-(1-\varphi )^{k+1}-(1-\varphi )^{k}]\\&={\frac {1}{\sqrt {5}}}\left\{\varphi ^{k}({\color {brown}\varphi +1})-(1-\varphi )^{k}[{\color {green}(1-\varphi )+1}]\right\}\\&={\frac {1}{\sqrt {5}}}\left\{\varphi ^{k}({\color {brown}\varphi ^{2}})-(1-\varphi )^{k}[{\color {green}(1-\varphi )^{2}}]\right\}\\&={\frac {1}{\sqrt {5}}}\left\{\varphi ^{k+2}-(1-\varphi )^{k+2}\right\}\\\end{aligned}}}$

亦成立

• 若${\displaystyle n}$為非正整數

當${\displaystyle n=0}$時，成立

當${\displaystyle n=-1}$時，${\displaystyle {\frac {1}{\sqrt {5}}}[{\color {brown}\varphi ^{-1}}-{\color {green}(1-\varphi )^{-1}}]={\frac {1}{\sqrt {5}}}[({\color {brown}\varphi -1})-({\color {green}-\varphi })]={\frac {1}{\sqrt {5}}}[2\varphi -1]={\frac {1}{\sqrt {5}}}\times {\sqrt {5}}=1=F_{-1}}$，成立

設當${\displaystyle n=-k}$及${\displaystyle n=-k-1}$時皆成立，即${\displaystyle F_{-k}={\frac {1}{\sqrt {5}}}[\varphi ^{-k}-(1-\varphi )^{-k}]}$且${\displaystyle F_{-k-1}={\frac {1}{\sqrt {5}}}[\varphi ^{-k-1}-(1-\varphi )^{-k-1}]}$

當${\displaystyle n=-k-2}$時

${\displaystyle {\begin{aligned}F_{-k-2}&=F_{-k}-F_{-k-1}\\&={\frac {1}{\sqrt {5}}}[\varphi ^{-k}-(1-\varphi )^{-k}]-{\frac {1}{\sqrt {5}}}[\varphi ^{-k-1}-(1-\varphi )^{-k-1}]\\&={\frac {1}{\sqrt {5}}}[\varphi ^{-k}-\varphi ^{-k-1}-(1-\varphi )^{-k}+(1-\varphi )^{-k-1}]\\&={\frac {1}{\sqrt {5}}}\left\{\varphi ^{-k-1}({\color {brown}\varphi -1})-(1-\varphi )^{-k-1}[{\color {green}(1-\varphi )-1}]\right\}\\&={\frac {1}{\sqrt {5}}}\left\{\varphi ^{-k-1}({\color {brown}\varphi ^{-1}})-(1-\varphi )^{-k-1}[{\color {green}(1-\varphi )^{-1}}]\right\}\\&={\frac {1}{\sqrt {5}}}\left\{\varphi ^{-k-2}-(1-\varphi )^{-k-2}\right\}\\\end{aligned}}}$

亦成立

根據數學歸納法原理，此通式對於任意整數${\displaystyle n}$皆成立

以${\displaystyle \varphi }$表示黃金分割數${\displaystyle {\frac {1+{\sqrt {5}}}{2}}}$，則有${\displaystyle \varphi (1-\varphi )=-1}$

故${\displaystyle (-1)^{m}=[\varphi (1-\varphi )]^{m}=\varphi ^{m}(1-\varphi )^{m}}$，因此

${\displaystyle {\begin{aligned}(-1)^{m+1}F_{-m}&=(-1)^{m+1}\times {\frac {1}{\sqrt {5}}}[\varphi ^{-m}-(1-\varphi )^{-m}]\\&=(-1)\times {\color {brown}(-1)^{m}}\times {\frac {1}{\sqrt {5}}}[\varphi ^{-m}-(1-\varphi )^{-m}]\\&=(-1)\times {\color {brown}\varphi ^{m}(1-\varphi )^{m}}\times {\frac {1}{\sqrt {5}}}[\varphi ^{-m}-(1-\varphi )^{-m}]\\&=(-1)\times {\frac {1}{\sqrt {5}}}[\varphi ^{-m+m}(1-\varphi )^{m}-(1-\varphi )^{-m+m}\varphi ^{m}]\\&=(-1)\times {\frac {1}{\sqrt {5}}}[(1-\varphi )^{m}-\varphi ^{m}]\\&={\frac {1}{\sqrt {5}}}[\varphi ^{m}-(1-\varphi )^{m}]\\&=F_{m}\\\end{aligned}}}$

將海倫公式略為變形，知

${\displaystyle 16\triangle ^{2}=[(a+b)+c][(a+b)-c]\times [c+(a-b)][c-(a-b)]}$

故

${\displaystyle {\begin{aligned}16\triangle ^{2}&=[(a+b)^{2}-c^{2}]\times [c^{2}-(a-b)^{2}]\\&=[2ab+(a^{2}+b^{2}-c^{2})]\times [2ab-(a^{2}+b^{2}-c^{2})]\\&=(2ab)^{2}-(a^{2}+b^{2}-c^{2})^{2}\\&=4a^{2}b^{2}-(a^{4}+b^{4}+c^{4}+2a^{2}b^{2}-2b^{2}c^{2}-2a^{2}c^{2})\\&=(2a^{2}b^{2}+2b^{2}c^{2}+2a^{2}c^{2})-(a^{4}+b^{4}+c^{4})\\&=2(a^{2}b^{2}+b^{2}c^{2}+a^{2}c^{2})-(a^{4}+b^{4}+c^{4})\\\end{aligned}}}$

等號兩邊開根號，再同除以4，得

${\displaystyle \triangle ={\frac {1}{4}}{\sqrt {2(a^{2}b^{2}+b^{2}c^{2}+a^{2}c^{2})-(a^{4}+b^{4}+c^{4})}}}$