BvU, i could multiply the sum with Planck's constant, and still no one would stop me, wouldn't it? But it would make the result false. :smile:
As a matter of fact, third liquid serves as a cosolvent for two, otherwise non miscible liquids, changing two phase system into a single phase...
Can I derive heat capacity of one phase mixture of three liquids as a sum of their mass shares multiplied by heat capacities of solitary components at given temperature? All components are miscible, of course ... thank you in advance
Bachelor in biology and chemistry, science elementary and secondary teacher, master of science in biotechnology and bioengineering, PhD student of physical chemistry at University of Belgrade