3. 如图,已知$l_1// l_2$,$l_3// l_4$,$\angle1 = 52^{\circ}$,求$\angle3$的度数.
$\because l_1// l_2$(已知),
$\therefore\angle2 =$_______( ).
$\because\angle1 = 52^{\circ}$(已知),
$\therefore\angle2 =$_______$^{\circ}$( ).
$\because l_3// l_4$(已知),
$\therefore\angle4 =$_______( ).
$\because\angle1 = 52^{\circ}$(已知),
$\therefore\angle4 =$_______$^{\circ}$( ).
$\because l_1// l_2$(已知),
$\therefore\angle3 +$_______$ = 180^{\circ}$( ).
$\therefore\angle3 = 180 -$_______$^{\circ} =$_______$^{\circ}$.

$\because l_1// l_2$(已知),
$\therefore\angle2 =$_______( ).
$\because\angle1 = 52^{\circ}$(已知),
$\therefore\angle2 =$_______$^{\circ}$( ).
$\because l_3// l_4$(已知),
$\therefore\angle4 =$_______( ).
$\because\angle1 = 52^{\circ}$(已知),
$\therefore\angle4 =$_______$^{\circ}$( ).
$\because l_1// l_2$(已知),
$\therefore\angle3 +$_______$ = 180^{\circ}$( ).
$\therefore\angle3 = 180 -$_______$^{\circ} =$_______$^{\circ}$.
答案
4. 如图,已知$CD$平分$\angle ACB$,$DE// AC$,$\angle2 = 66^{\circ}$,则$\angle1$的度数为_______.

答案
5. 已知:如图,$\angle1 = \angle2$,$BD$和$B'D'$分别平分$\angle ABC$和$\angle A'B'C'$. 求证:$\angle ABC = \angle A'B'C'$.

答案
6. 已知:如图,$AB// CD$,$AD// BC$. 求证:$\angle A=\angle C$.

答案
登录