Giải:
a) Xét \(\Delta MOA,\Delta MOB\) có:
\(\widehat{AOM}=\widehat{OMB}\) ( cặp góc so le trong và AM // Oy )
OM: cạnh chung
\(\widehat{AMO}=\widehat{BOM}\) ( cặp góc so le trong và AM // Oy )
\(\Rightarrow\Delta MOA=\Delta MOB\left(g-c-g\right)\)
\(\Rightarrow OA=OB\) ( cạnh t/ứng )
\(\Rightarrow MA=MB\) ( cạnh t/ứng )
b) Xét \(\Delta HOM\) có: \(\widehat{HOM}+\widehat{HMO}=90^o\) ( do \(\widehat{H}=90^o\) )
Xét \(\Delta KOM\) có: \(\widehat{MOK}+\widehat{OMK}=90^o\) ( do \(\widehat{K}=90^o\) )
Mà \(\widehat{HOM}=\widehat{MOK}\left(=\frac{1}{2}\widehat{O}\right)\)
\(\Rightarrow\widehat{HMO}=\widehat{OMK}\)
Xét \(\Delta HOM,\Delta KOM\) có:
\(\widehat{HOM}=\widehat{KOM}\left(=\frac{1}{2}\widehat{O}\right)\)
OM: cạnh chung
\(\widehat{HMO}=\widehat{OMK}\) ( cmt )
\(\Rightarrow\Delta HOM=\Delta KOM\left(g-c-g\right)\)
\(\Rightarrow MH=MK\) ( cạnh t/ứng )
Vậy...
