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答案：

(1) 題圖①中，$∠BOC = ∠AOC - ∠AOB = 20^{\circ}$。因?yàn)?OD 是$∠BOC$的平分線，所以$∠COD = \frac{1}{2}∠BOC = \frac{1}{2}×20^{\circ} = 10^{\circ}$，所以$∠AOD = ∠AOC - ∠COD = 70^{\circ} - 10^{\circ} = 60^{\circ}$；題圖②中，$∠BOC = ∠AOC + ∠AOB = 120^{\circ}$。因?yàn)?OD 是$∠BOC$的平分線，所以$∠BOD = \frac{1}{2}∠BOC = \frac{1}{2}×120^{\circ} = 60^{\circ}$，所以$∠AOD = ∠BOD - ∠AOB = 60^{\circ} - 50^{\circ} = 10^{\circ}$。
(2)$∠AOD = \frac{n + m}{2}$或$\frac{n - m}{2}$。解析：如圖①，當(dāng) OB 在$∠AOC$的內(nèi)部時，$∠BOC = ∠AOC - ∠AOB = n - m$。因?yàn)?OD 是$∠BOC$的平分線，所以$∠BOD = \frac{1}{2}∠BOC = \frac{n - m}{2}$，所以$∠AOD = ∠AOB + ∠BOD = \frac{n + m}{2}$。
　　　　　　 　　　
如圖②，當(dāng) OB 在$∠AOC$的外部時，$∠BOC = ∠AOC + ∠AOB = n + m$。因?yàn)?OD 是$∠BOC$的平分線，所以$∠BOD = \frac{1}{2}∠BOC = \frac{n + m}{2}$，所以$∠AOD = ∠BOD - ∠AOB = \frac{n - m}{2}$。
方法總結(jié)

答案：

(1) 因?yàn)?∠AOC$與$∠AOB$互補(bǔ)，$∠AOC = 70^{\circ}$，所以$∠AOB = 180^{\circ} - ∠AOC = 180^{\circ} - 70^{\circ} = 110^{\circ}$，所以$∠BOC = ∠AOB - ∠AOC = 110^{\circ} - 70^{\circ} = 40^{\circ}$。因?yàn)?OE，OF 分別平分$∠AOC$和$∠BOC$，所以$∠COE = \frac{1}{2}∠AOC = \frac{1}{2}×70^{\circ} = 35^{\circ}$，$∠COF = \frac{1}{2}∠BOC = \frac{1}{2}×40^{\circ} = 20^{\circ}$，所以$∠EOF = ∠COE + ∠COF = 35^{\circ} + 20^{\circ} = 55^{\circ}$。
(2) ① 因?yàn)?∠AOC$與$∠AOB$互補(bǔ)，所以$∠AOB = 180^{\circ} - ∠AOC$。又因?yàn)?OD 平分$∠AOB$，所以$∠AOD = \frac{1}{2}∠AOB = \frac{1}{2}(180^{\circ} - ∠AOC) = 90^{\circ} - \frac{1}{2}∠AOC$，所以$∠COD = ∠AOC - ∠AOD = ∠AOC - (90^{\circ} - \frac{1}{2}∠AOC) = \frac{3}{2}∠AOC - 90^{\circ}$，所以$∠AOC - 3∠COD = ∠AOC - 3(\frac{3}{2}∠AOC - 90^{\circ}) = 32^{\circ}$，解得$∠AOC = 68^{\circ}$，所以$∠AOB = 180^{\circ} - ∠AOC = 112^{\circ}$，所以$∠BOC = ∠AOB - ∠AOC = 44^{\circ}$。因?yàn)?OE，OF 分別平分$∠AOC$和$∠BOC$，所以$∠COE = \frac{1}{2}∠AOC = \frac{1}{2}×68^{\circ} = 34^{\circ}$，$∠COF = \frac{1}{2}∠BOC = \frac{1}{2}×44^{\circ} = 22^{\circ}$，所以$∠EOF = ∠COE + ∠COF = 34^{\circ} + 22^{\circ} = 56^{\circ}$。
② 由①可得$∠AOB = 180^{\circ} - ∠AOC$，$∠COD = \frac{3}{2}∠AOC - 90^{\circ}$，$∠DOE = ∠COE - ∠COD = \frac{1}{2}∠AOC - (\frac{3}{2}∠AOC - 90^{\circ}) = 90^{\circ} - ∠AOC$，所以$\frac{k∠AOB - ∠COD}{∠DOE} = \frac{k(180^{\circ} - ∠AOC) - (\frac{3}{2}∠AOC - 90^{\circ})}{90^{\circ} - ∠AOC} = \frac{90^{\circ}×(2k + 1) - (\frac{3}{2} + k)∠AOC}{90^{\circ} - ∠AOC}$。因?yàn)?\frac{k∠AOB - ∠COD}{∠DOE}$的值是一個定值，所以$2k + 1 = \frac{3}{2} + k$，解得$k = \frac{1}{2}$，所以定值為$2k + 1 = 2$。
歸納總結(jié)

答案：(1) 因?yàn)?OB 是$∠AOC$的平分線，所以$∠BOC = ∠AOB = 50^{\circ}$。因?yàn)?OD 是$∠COE$的平分線，所以$∠COD = ∠DOE = 30^{\circ}$，所以$∠BOD = ∠BOC + ∠COD = 50^{\circ} + 30^{\circ} = 80^{\circ}$。
(2) 因?yàn)?OB 平分$∠AOC$，OD 平分$∠COE$，所以$∠EOD = ∠DOC$，$∠AOB = ∠COB$。設(shè)$∠EOD = ∠DOC = x^{\circ}$，則$∠AOB = ∠COB = (100 - 2x)^{\circ}$。因?yàn)?∠COD + ∠COB + ∠AOB = 110^{\circ}$，所以$x + 100 - 2x + 100 - 2x = 110$，解得$x = 30$，即$∠EOD = ∠DOC = 30^{\circ}$，所以$∠BOD = ∠BOE - ∠DOE = 100^{\circ} - 30^{\circ} = 70^{\circ}$。
(3) 設(shè)$∠AOB = ∠BOC = x$，$∠EOD = ∠DOC = y$，依題意可知$∠AOD = 2x + y$，$∠BOE = x + 2y$。由$∠AOD + ∠BOE = n$，得$3x + 3y = n$，即$x + y = \frac{1}{3}n$，所以$∠BOD = ∠BOC + ∠COD = x + y = \frac{1}{3}n$。