7. 如图,直线AB,CD相交于点O,∠1 + ∠2 = 120°,∠3 = 125°,则∠2的度数是( )
A. 37.5° B. 75° C. 50° D. 65°

A. 37.5° B. 75° C. 50° D. 65°
答案
D
8. 如图,直线AB,CD,EF相交于点O.若∠1 + ∠2 + 2∠3 = 210°,则∠3的度数为_______.

答案
$30^{\circ}$
9.(教材P3练习第3题变式)如图,直线AB,CD相交于点O,∠AOD = 120°,OE把∠BOD分成两部分,且∠BOE:∠EOD = 1:2,则∠BOE = _______.

答案
$20^{\circ}$
10. 如图,直线AB,CD,EF相交于点O.
(1)若∠EOC + ∠DOF = 300°,则∠DOE = _______;
(2)若∠EOC + ∠COB = 248°,则∠AOE = _______.

(1)若∠EOC + ∠DOF = 300°,则∠DOE = _______;
(2)若∠EOC + ∠COB = 248°,则∠AOE = _______.
答案
(1) $30^{\circ}$ (2) $68^{\circ}$
11. 如图,直线a,b,c两两相交,∠1 = 2∠3,∠2 = 60°,则∠4 = _______.

答案
$150^{\circ}$
12. 如图,直线AB,CD相交于点O,OC平分∠AOM,且∠AOM = 88°,射线ON在∠BOM的内部.
(1)求∠AOD的度数;
(2)若∠BOC = 4∠BON,求∠MON的度数.

(1)求∠AOD的度数;
(2)若∠BOC = 4∠BON,求∠MON的度数.
答案
(1) 因为$OC$平分$\angle AOM$,且$\angle AOM = 88^{\circ}$,所以$\angle AOC=\angle COM=\frac{1}{2}\angle AOM = 44^{\circ}$. 所以$\angle AOD = 180^{\circ}-44^{\circ}=136^{\circ}$
(2) 因为$\angle AOD = 136^{\circ}$,所以$\angle BOC = 136^{\circ}$. 又因为$\angle BOC = 4\angle BON$,所以$\angle BON = 34^{\circ}$. 因为$\angle COM = 44^{\circ}$,所以$\angle MON=\angle BOC-\angle BON-\angle COM = 136^{\circ}-34^{\circ}-44^{\circ}=58^{\circ}$
(2) 因为$\angle AOD = 136^{\circ}$,所以$\angle BOC = 136^{\circ}$. 又因为$\angle BOC = 4\angle BON$,所以$\angle BON = 34^{\circ}$. 因为$\angle COM = 44^{\circ}$,所以$\angle MON=\angle BOC-\angle BON-\angle COM = 136^{\circ}-34^{\circ}-44^{\circ}=58^{\circ}$
13. 如图①,直线AB与CD相交于点E,射线EG在∠AEC内.
(1)若∠BEC的邻补角是它的余角的3倍,则∠BEC = _______;
(2)在(1)的条件下,若∠CEG比∠AEG小25°,求∠AEG的度数;
(3)如图②,若射线EF平分∠AED,∠FEG = m(m > 90°),则∠AEG - ∠CEG = _______(用含m的式子表示).

(1)若∠BEC的邻补角是它的余角的3倍,则∠BEC = _______;
(2)在(1)的条件下,若∠CEG比∠AEG小25°,求∠AEG的度数;
(3)如图②,若射线EF平分∠AED,∠FEG = m(m > 90°),则∠AEG - ∠CEG = _______(用含m的式子表示).
答案
(1) $45^{\circ}$ (2) 设$\angle AEG = x$,则$\angle CEG = x - 25^{\circ}$. 因为$\angle AEG+\angle CEG+\angle BEC = 180^{\circ}$,由(1),知$\angle BEC = 45^{\circ}$,所以$x + x - 25^{\circ}+45^{\circ}=180^{\circ}$,解得$x = 80^{\circ}$. 所以$\angle AEG = 80^{\circ}$
(3) $2m - 180^{\circ}$
(3) $2m - 180^{\circ}$
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