\(\dfrac{B'A}{B'C}=\dfrac{S_{AMB'}}{S_{CMB'}}=\dfrac{S_{ABB'}}{S_{CBB'}}=\dfrac{S_{ABB'}-S_{AMB'}}{S_{CBB'}-S_{CMB'}}=\dfrac{S_{ABM}}{S_{CBM}}\)
\(\dfrac{C'A}{C'B}=\dfrac{S_{AMC'}}{S_{BMC'}}=\dfrac{S_{ACC'}}{S_{BCC'}}=\dfrac{S_{ACC'}-S_{AMC'}}{S_{BCC'}-S_{BMC'}}=\dfrac{S_{ACM}}{S_{CBM}}\)
\(\dfrac{MA}{MA'}=\dfrac{S_{ABM}}{S_{A'BM}}=\dfrac{S_{ACM}}{S_{A'CM}}=\dfrac{S_{ABM}+S_{ACM}}{S_{A'BM}+S_{A'CM}}=\dfrac{S_{ABM}+S_{ACM}}{S_{MBC}}=\dfrac{S_{ABM}}{S_{MBC}}+\dfrac{S_{ACM}}{S_{MBC}}=\dfrac{B'A}{B'C}+\dfrac{C'A}{C'B}\)