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![](https://rs.olm.vn/images/avt/0.png?1311)
Gọi H là giao điểm của NC và BM
Vẽ HK là phân giác BHC => BHK = CHK = BHC/2
Có: A + ABC + ACB = 180o
=> 60o + ABC + ACB = 180o
=> ABC + ACB = 180o - 60o = 120o
=> ABC/2 + ACB/2 = 60o
Mà NBH = HBK = ABC/2; KCH = MCH = ACB/2
Nên HBK + HCK = 60o
=> BHC = 180o - (HBK + HCK) = 180o - 60o = 120o
=> BHK = KHC = BHC/2 = 60o
Có: BHN + BHC = 180o ( kề bù)
=> BHN + 120o = 180o
=> BHN = 180o - 120o = 60o
Xét t/g BHK và t/g BHN có:
BHK = BHN = 60o (cmt)
BH là cạnh chung
NBH = KBH (gt)
Do đó, t/g BHK = t/g BHN (g.c.g)
=> BK = BN (2 cạnh tương ứng) (1)
Tương tự như vậy ta cũng có: t/g KHC = t/g MHC (g.c.g)
=> KC = MC (2 cạnh tương ứng) (2)
Từ (1) và (2) => BN + MC = BK + KC = BC (đpcm)
![](https://rs.olm.vn/images/avt/0.png?1311)
-Gọi I là giao điểm của BM và CN.
-Kẻ tia ID là tia phân giác của góc BIC.
![](https://rs.olm.vn/images/avt/0.png?1311)
Tia phân giác của \(\widehat{BIC}\)cắt BC ở D.\(\Delta ABC\)có \(\widehat{A}=60^0\)
=> \(\widehat{A}+\widehat{B}+\widehat{C}=180^0\)(định lí tổng ba góc trong một tam giác)
=> \(60^0+\widehat{B}+\widehat{C}=180^0\)
=> \(\widehat{B}+\widehat{C}=120^0\)
\(\widehat{B}_1+\widehat{C_1}=\frac{\widehat{B}+\widehat{C}}{2}=\frac{120^0}{2}=60^0\)
=> \(\widehat{I}_1=\widehat{I}_2=60^0\)
\(\Delta BIC\)có : \(\widehat{B_1}+\widehat{C_1}=60^0\)
=> \(\widehat{BIC}=180^0-60^0=120^0\)
Do đó \(\widehat{I_3}=\widehat{I_4}=60^0\)
Xét \(\Delta BIN\)và \(\Delta BID\)có :
\(\widehat{B_2}=\widehat{B_1}\)
BI cạnh chung
\(\widehat{I_2}=\widehat{I_3}=60^0\)(cmt)
=> \(\Delta BIN=\Delta BID\left(g-c-g\right)\)
=> BN = BD(hai cạnh tương ứng) (1)
Xét \(\Delta CIM\)và \(\Delta CID\)có :
\(\widehat{C_1}=\widehat{C}_2\)
CI cạnh chung
\(\widehat{I}_1=\widehat{I_4}=60^0\)
=> \(\Delta\)CIM = \(\Delta\)CID(c-g-c)
=> CM = CD(hai cạnh tương ứng) (2)
Từ (1) và (2) ta có : BN = BD
CM = CD
=> BM + CM = BD + CD = BC
Vậy BN + CM = BC
![](https://rs.olm.vn/images/avt/0.png?1311)
Số đo góc chưa chính xác :(
Gọi giao điểm của \(BM\) và \(CN\)là \(O\)
Từ \(O\)kẻ \(OH\)là phân giác \(\widehat{BOC}\)\(\left(H\in BC\right)\)
Xét \(\Delta ABC\)có:
\(\widehat{A}+\widehat{ABC}+\widehat{ACB}=180^o\) (định lí tổng ba góc \(\Delta\))
\(\Rightarrow\widehat{ABC}+\widehat{ACB}=180^o-60^o=120^o\)
Ta có:
\(\widehat{OBC}=\widehat{OBA}=\frac{\widehat{ABC}}{2}\) (\(OB\): phân giác \(\widehat{ABC}\))
\(\widehat{OCB}=\widehat{OCA}=\frac{\widehat{ACB}}{2}\) (\(OC\): phân giác \(\widehat{ACB}\))
\(\Rightarrow\widehat{OBC}+\widehat{OCB}=\frac{\widehat{ABC}+\widehat{ACB}}{2}=\frac{120^o}{2}=60^o\)
Xét \(\Delta BOC\)có:
\(\widehat{OBC}+\widehat{OCB}+\widehat{BOC}=180^o\) (định lí tổng ba góc \(\Delta\))
\(\Rightarrow\widehat{BOC}=180^o-60^o=120^o\)
Ta có:
\(\widehat{BOH}=\widehat{HOC}=\frac{\widehat{BOC}}{2}=\frac{120^o}{2}=60^o\) (\(OH\): phân giác \(\widehat{BOC}\))
Ta có:
\(\widehat{BOC}+\widehat{BON}=180^o\) (kề bù)
\(\Rightarrow\widehat{BON}=180^o-120^o=60^o\)
\(\Rightarrow\widehat{BON}=\widehat{BOH}\left(=60^o\right)\)
Ta có:
\(\widehat{BOC}+\widehat{COM}=180^o\) (kề bù)
\(\Rightarrow\widehat{COM}=180^o-120^o=60^o\)
\(\Rightarrow\widehat{COM}=\widehat{HOC}\left(=60^o\right)\)
Xét \(\Delta BON\)và \(\Delta BOH\)có:
\(\widehat{OBN}=\widehat{OBH}\) (\(OB\): phân giác \(\widehat{ABC}\))
\(OB\): chung
\(\widehat{BON}=\widehat{BOH}\) (cmt)
\(\Rightarrow\Delta BON=\Delta BOH\left(g.c.g\right)\)
\(\Rightarrow BN=BH\) (2 cạnh tương ứng)
Xét \(\Delta COM\)và \(\Delta COH\)có:
\(\widehat{COM}=\widehat{COH}\) (cmt)
\(OC\) : chung
\(\widehat{MCO}=\widehat{HCO}\) (\(OC\): phân giác \(\widehat{ACB}\))
\(\Rightarrow\Delta COM=\Delta COH\left(g.c.g\right)\)
\(\Rightarrow MC=HC\) (2 cạnh tương ứng)
Ta có:
\(BC=BH+HC\)
Mà \(\hept{\begin{cases}BN=BH\\MC=HC\end{cases}}\)
\(\Rightarrow BC=BN+MC\left(đpcm\right)\)
![](https://rs.olm.vn/images/avt/0.png?1311)
Gọi I là giao điểm của BM và CN . Ta có : \(\widehat{A}=60^o\)
\(\Rightarrow\widehat{B}+\widehat{C}=180^o-60^o=120^o\)
Do đó : \(\widehat{B_1}+\widehat{C_1}=120^o:2=60^o\)
Vì vậy \(\widehat{I}_1=60^o,\widehat{I}_2=60^o\)
Kẻ tia phân giác của góc BIC , cắt BC ở D . Tam giác BIC có \(\widehat{B}_1+\widehat{C}_1=120^o\) nên góc BIC = \(120^o\) . Do đó \(\widehat{I}_3=\widehat{I}_4=60^o\)
Xét \(\Delta BIN\) và \(\Delta BID\) có :
\(\widehat{B}_2=\widehat{B}_1\)
BI : cạnh chung
\(\widehat{I}_2=\widehat{I}_3=60^o\)
Suy ra \(\Delta BIN=\Delta BID\left(g.c.g\right)\)
\(\Rightarrow BN=CD\) ( 2 cạnh tương ứng ) (1)
Bạn tự chứn minh \(\Delta CIM=\Delta CID\left(g.c.g\right)\Rightarrow CM=CD\)(2)
Từ (1) và (2) suy ra : BN + CM = BD + CD =BC
Chúc bạn học tốt !!!
![](https://rs.olm.vn/images/avt/0.png?1311)
Do \(\widehat{BAC}=60^o\Rightarrow\widehat{ABC}+\widehat{ACB}=180^o-60^o=120^o\).
Suy ra \(\widehat{IBC}+\widehat{ICB}=\dfrac{1}{2}\left(\widehat{ABC}+\widehat{ACB}\right)=60^o\).
Suy ra \(\widehat{BIC}=180^o-\left(\widehat{IBC}+\widehat{ICB}\right)=120^o\).
Vì vậy \(\widehat{EIB}=\widehat{DIC}=180^o-120^o=60^o\).
Kẻ tia phân giác IF của góc BIC (F thuộc BC). Suy ra \(\widehat{BIF}=\widehat{FIC}=120^o:2=60^o\).
Xét tam giác EIB và tam giác FIB có:
BI chung.
\(\widehat{EBI}=\widehat{IBF}\)
\(\widehat{EIB}=\widehat{FIB}\)
Suy ra \(\Delta EIB=\Delta FIB\left(g.c.g\right)\).
Vì vậy IE = IF.
Chứng minh tương tự ta có ID = IF.
vì vậy ID = IE.
mik nhé bạn ly 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)
khó thế bạn minhyf nha