$BM = BA$ nên $\Delta BAM$ cân tại $B$.

Suy ra $\widehat{M_1} = \dfrac{180^{\circ} - \widehat{B}}2$.

$CN = CA$ nên $\Delta CAN$ cân tại $C$.

Suy ra $\widehat{N_1} = \dfrac{180^{\circ} - \widehat{C}}2$.

Suy ra $\widehat{N_1} + \widehat{M_1} = 180^{\circ} - \dfrac12(\widehat{B} + \widehat{C})$

nên $180^{\circ} - \widehat{N_1} - \widehat{M_1} = \dfrac12(\widehat{B} + \widehat{C})$

Trong $\Delta MAN$ có $\widehat{MAN} = 180^{\circ} - \widehat{N_1} - \widehat{M_1}$

nên $\widehat{MAN} = \dfrac12(\widehat{B} + \widehat{C}) = \dfrac12.90^{\circ} = 45^{\circ}$.

Ta có 

BM=AB suy ra tam giác BAM cân tại B suy ra \(\widehat{BAM}=\frac{180^o-\widehat{B}}{2}\)

CN=AC suy ra tam giác NAC cân tại C suy ra \(\widehat{NAC}=\frac{180^o-\widehat{C}}{2}\)

(nếu cần thì bạn phải cm thêm cả N nằm giữa B và M nhé!)

MÀ ta thấy \(\widehat{BAM}+\widehat{ACN}=\widehat{BAC}+\widehat{NAM}\)

\(\Rightarrow\frac{180^o-\widehat{B}}{2}+\frac{180^o-\widehat{C}}{2}=90^o+\widehat{NAM}\)

\(\Rightarrow\frac{360^o-\left(\widehat{B}+\widehat{C}\right)}{2}=90^o+\widehat{NAM}\)

\(\Rightarrow\frac{360^o-90^o}{2}=90^o+\widehat{NAM}\)

\(\Rightarrow\widehat{NAM}=45^o\)

Bài nè:

xet tam giac ABM can tai B co  ^A1= ^BAM - ^A2 

                                               va ^M1= \(\frac{180-B}{2}\); ^BAM=  ^M1

xet tam giac ACN can tai C co  ^A3= ^NAC - ^A2 

                                                 va ^N1=\(\frac{180-C}{2}\); ^NAC= ^N1

ta co ^A1 + ^ A2 + ^ A3 =90

    ^A2+ ^BAM - ^A2 +^NAC - ^A2 =90

^N1 + ^M1 =90+ ^A2

\(\frac{180-B}{2}\)+\(\frac{180-C}{2}\)=90+ ^A2

\(\frac{360-\left(B+C\right)}{2}=90+A2\)

\(\frac{360-90}{2}=90+A2\)

=> ^A2=45

chữ mk hơi xấu

a) Ta có \(\widehat{B}+\widehat{C}=90^o\) mà \(\widehat{B_1}=\widehat{B_2}=\frac{\widehat{B}}{2};\widehat{C_1}=\widehat{C_2}=\frac{\widehat{C}}{2}\) nên \(\widehat{B_2}+\widehat{C_2}=\frac{\widehat{B}+\widehat{C}}{2}=\frac{90^o}{2}=45^o\)

Xét tam giác BOC, có \(\widehat{BOC}+\widehat{B_2}+\widehat{C_2}=180^o\Rightarrow\widehat{BOC}=180^o-45^o=135^o\)

b) Xét tam giác BAD và BMD có:

Cạnh BD chung

\(\widehat{B_1}=\widehat{B_2}\)

AB = MB  (gt)

\(\Rightarrow\Delta BAD=\Delta BMD\left(c-g-c\right)\)

\(\Rightarrow\widehat{BMD}=\widehat{BAD}=90^o\)

Hoàn toàn tương tự \(\Delta EAC=\Delta ENC\left(c-g-c\right)\Rightarrow\widehat{ENC}=\widehat{EAC}=90^o\)

Ta có EN và DM cùng vuông góc với BC nên EN // DM

c) Theo câu b, \(\Delta BAD=\Delta BMD\Rightarrow AD=MD;\widehat{BDA}=\widehat{BDM}\)

Từ đó ta có \(\Delta OAD=\Delta OMD\left(c-g-c\right)\Rightarrow OA=OM.\)

Tương tự : \(\Delta OAE=\Delta ONE\left(c-g-c\right)\Rightarrow OA=ON.\)

Vậy nên OA = OM = ON

d) Ta có \(\Delta OAD=\Delta OMD\left(c-g-c\right)\Rightarrow\widehat{OAD}=\widehat{OMD}\)

\(\Delta OAE=\Delta ONE\left(c-g-c\right)\Rightarrow\widehat{OAE}=\widehat{ONE}\)

\(\Rightarrow\widehat{ONE}+\widehat{OMD}=\widehat{OAE}+\widehat{OAD}=\widehat{EAD}=90^o\)

\(\Rightarrow\widehat{NOM}=90^o\)  (Dạng bài qua O kẻ đường thẳng song song với EN và DM)

Vậy tam giác OMN vuông cân hay \(\widehat{ONM}+\widehat{OMN}=90^o\)

Xét tam giác AMN có \(\widehat{MAN}+\widehat{ANM}+\widehat{AMN}=180^o\)

\(\Leftrightarrow\widehat{MAN}+\widehat{ANO}+\widehat{ONM}+\widehat{AMO}+\widehat{OMN}=180^o\)

\(\Leftrightarrow\widehat{MAN}+\widehat{NAO}+\widehat{MAO}=180^o-90^o=90^o\)

\(\Leftrightarrow\widehat{2MAN}=90^o\)

\(\Leftrightarrow\widehat{MAN}=45^o\)