kẻ xA//BC

\(=>\angle\left(A3\right)=\angle\left(C\right)\left(so-le-trong\right)\)

\(=>\angle\left(A1\right)=\angle\left(B\right)\left(so-le-trong\right)\)

mà \(\angle\left(A1\right)+\angle\left(A2\right)+\angle\left(A3\right)=180^o\left(ke-bu\right)\)

\(=>\angle\left(A2\right)+\angle\left(B\right)+\angle\left(C\right)=180^o\)

a)

 

=> Ta có : \(\widehat{A}+\widehat{B}+\widehat{C}\) = 180^o

100^o + \(\widehat{B}+\widehat{C}\) = 180^o

\(\widehat{B}+\widehat{C}\) = 180^o - 100^o

\(\widehat{B}+\widehat{C}\) = 80^o

Góc B = (80^o+50^o):2 = 65^o

=> \(\widehat{C}\) = 65^o - 50^o = 15^o

Vậy \(\widehat{B}\) = 65^o ; \(\widehat{C}\) = 15^o

b)

 

Ta có : \(\widehat{3A}+\widehat{B}+\widehat{2C}\) = 180^o

\(\widehat{3A}+\widehat{2C}\) = 180^o - 80^o

\(\widehat{3A}+\widehat{2C}\) = 100^o

=> \(\widehat{A}\) = 100^o:(3+2).3 = 60^o

\(\widehat{C}\) = 100^o - 60^o = 40^o

Vậy \(\widehat{A}\) = 60^o ; \(\widehat{C}\) = 40^o

a. Ta có: \(\widehat{HAB}+\widehat{HAD}=\widehat{BAD}\)

\(\widehat{HAC}-\widehat{HAD}=\widehat{DAC}\)

Vì AD là tia phân giác của góc BAC => \(\widehat{BAD}=\widehat{DAC}\) =.> ĐPCM

b. Xét tam giác HAC có \(\widehat{AHC}+\widehat{HCA}+\widehat{HAC}=180\text{đ}\text{ộ}\)

=>\(\widehat{HAC}=180^o-\widehat{AHC}-\widehat{HCA}\)

Xét tam giác HAB có \(\widehat{HAB}+\widehat{ABH}+\widehat{BHA}=180^o\)

=> \(\widehat{HAB}=180^o-\widehat{ABH}-\widehat{BHA}\)

Ta có: \(\widehat{HAC}-\widehat{HAB}=180^o-\widehat{AHC}-\widehat{HAC}-\left(180^o-\widehat{ABH}-\widehat{BHA}\right)\)

\(=180^o-90^o-\widehat{HCA}-180^o+\widehat{ABH}+90^o\)

\(=180^o-180^o+90^o-90^o+\widehat{ABH}-\widehat{HCA}\)

\(=\widehat{ABH}-\widehat{HCA}=>\text{Đ}PCM\)

c. Ta có: \(\dfrac{1}{2}\left(\widehat{ABC}-\widehat{ACB}\right)=\dfrac{\widehat{ABC}-\widehat{ACB}}{2}=\dfrac{\widehat{HAC}-\widehat{HAB}}{2}\)

\(=\dfrac{2\widehat{DAH}}{2}=\widehat{DAH}=>\text{Đ}pcm\)