答案：3. (1) $29^{\circ}$ 解析:由折叠可知$∠ AOC=∠ BOC=\dfrac{1}{2}∠ AOB$.$\because ∠ AOB = 58^{\circ}$,$\therefore ∠ BOC=\dfrac{1}{2}∠ AOB=\dfrac{1}{2}×58^{\circ}=29^{\circ}$.
(2) ①由折叠可知$∠ AOC=∠ A'OC$,$\therefore ∠ AOA'=2∠ AOC$.由折叠知,$∠ BOD=∠ B'OD$,$\therefore ∠ BOB'=2∠ BOD$.$\because$点$B'$落在$OA'$上,$\therefore ∠ AOA'+∠ BOB'=180^{\circ}$,$\therefore 2∠ AOC + 2∠ BOD = 180^{\circ}$,$\therefore ∠ AOC+∠ BOD = 90^{\circ}$,即$∠ COD = 90^{\circ}$.
②由折叠可知$∠ AOA'=2∠ AOC$,$∠ BOB'=2∠ BOD$.$\because ∠ AOC = 44^{\circ}$,$∠ BOD = 61^{\circ}$,$\therefore ∠ AOA'=2∠ AOC=2×44^{\circ}=88^{\circ}$,$∠ BOB'=2∠ BOD=2×61^{\circ}=122^{\circ}$,$\therefore ∠ A'OB'=∠ AOA'+∠ BOB'-180^{\circ}=88^{\circ}+122^{\circ}-180^{\circ}=30^{\circ}$,即$∠ A'OB'=30^{\circ}$.

答案：
4. (1) 如图①,$∠ BDG = x$,$∠ FEG = y$,$\because BD// EF$,$\therefore GH// EF$,$GH// BD$,$\therefore ∠ BDG=∠ DGH = x$,$∠ GEF=∠ HGE = y$,$\therefore ∠ DGE=∠ DGH+∠ HGE = x + y$.
　　　 　
(2) $∠ DGE=∠ BDG-∠ FEG$.理由如下:如图②,过点G作$GH// DB$交DA于点H,由①得$BD// EF$,$\therefore GH// DB// EF$,$\therefore ∠ BDG=∠ DGH$,$∠ FEG=∠ EGH$,$\therefore ∠ DGE=∠ DGH-∠ EGH$,$\therefore ∠ DGE=∠ BDG-∠ FEG$.
(3) $∠ B$的度数是$60^{\circ}$. 解析:设$∠ BDM=∠ MDG=α$,则$∠ BDG=∠ EDG=∠ DGB=2α$,则$DE// BF$,$∠ PDE=180^{\circ}-∠ BDE=180^{\circ}-4α$,$∠ PDM=180^{\circ}-α$.$\because DN$平分$∠ PDM$,$\therefore ∠ PDN=∠ MDN=\dfrac{1}{2}∠ PDM=90^{\circ}-\dfrac{α}{2}$,$\therefore ∠ EDN=∠ PDN-∠ PDE=90^{\circ}-\dfrac{α}{2}-(180^{\circ}-4α)=\dfrac{7}{2}α-90^{\circ}$,$∠ GDN=∠ MDN-∠ MDG=90^{\circ}-\dfrac{α}{2}-α=90^{\circ}-\dfrac{3}{2}α$.$\because DG⊥ NG$,$\therefore ∠ DGN=90^{\circ}$,$\therefore ∠ DNG=90^{\circ}-∠ GDN=90^{\circ}-(90^{\circ}-\dfrac{3}{2}α)=\dfrac{3}{2}α$.$\because DE// BF$,$\therefore ∠ B=∠ PDE=180^{\circ}-4α$.$\because ∠ B-∠ DNG=∠ EDN$,$\therefore 180^{\circ}-4α-\dfrac{3}{2}α=\dfrac{7}{2}α-90^{\circ}$,$\therefore α=30^{\circ}$,$\therefore ∠ B=180^{\circ}-4α=60^{\circ}$.