Theo công thức Hê – rông ta có:
\({S_{AMC}} = \sqrt {\dfrac{{27}}{2}\left( {\dfrac{{27}}{2} - 13} \right)\left( {\dfrac{{27}}{2} - 6} \right)\left( {\dfrac{{27}}{2} - 8} \right)} \)\( = \dfrac{{9\sqrt {55} }}{4}\)
\({S_{ABC}} = 2{S_{AMC}} = \dfrac{{9\sqrt {55} }}{2}\).
Mặt khác ta có \(A{M^2} = \dfrac{{{b^2} + {c^2}}}{2} - \dfrac{{{a^2}}}{4}\) hay \(2A{M^2} = {b^2} + {c^2} - \dfrac{{{a^2}}}{2}\).
Do đó \(A{B^2} = {c^2} = 2A{M^2} - {b^2} + \dfrac{{{a^2}}}{2}\)\( = 2.64 - 169 + 72 = 31\) \( \Rightarrow c = \sqrt {31} \)
\(\cos B = \dfrac{{{a^2} + {c^2} - {b^2}}}{{2ac}}\)\( = \dfrac{{144 + 31 - 169}}{{24\sqrt {31} }} \approx 0,045\) \( \Rightarrow \widehat B \approx {87^0}25'\)
