User:MagnInd/ltx From Wikipedia, the free encyclopedia ρ i M i = ρ M ⋅ x i {\displaystyle {\frac {\rho _{i}}{M_{i}}}={\frac {\rho }{M}}\cdot x_{i}} V = V s o l v e n t n s o l v e n t + a V ~ i n i {\displaystyle V=V_{solvent}n_{solvent}+{}^{a}{\tilde {V}}_{i}n_{i}\,} M ¯ = ∑ i x i M i {\displaystyle {\bar {M}}=\sum _{i}x_{i}M_{i}\,} ∏ 1 2 ∏ 3 4 a b {\displaystyle \sideset {_{1}^{2}}{_{3}^{4}}\prod _{a}^{b}\,\!} ∑ 1 2 ∑ 3 4 a b {\displaystyle \sideset {_{1}^{2}}{_{3}^{4}}\sum _{a}^{b}\,\!} c i V a b {\displaystyle {_{c}^{i}}V{_{a}^{b}}\,\!} m = ∑ i n j M j + m s {\displaystyle m=\sum _{i}n_{j}M_{j}+m_{s}\,} m m s = ∑ i n j M j + m s m s {\displaystyle {\frac {m}{m_{s}}}={\frac {\sum _{i}n_{j}M_{j}+m_{s}}{m_{s}}}\,} m m s = ∑ i n j M j m s + 1 {\displaystyle {\frac {m}{m_{s}}}={\frac {\sum _{i}n_{j}M_{j}}{m_{s}}}+1\,} 1 w s − 1 = ∑ i M j m ~ j {\displaystyle {\frac {1}{w_{s}}}-1=\sum _{i}M_{j}{\tilde {m}}_{j}\,} Related Articles
