Answer:
Around 2.0 L of ethylene glycol needs to be added to the car radiator
Explanation:
The depression in freezing point ΔTf of a solution is directly proportional to its molality (m), i.e.
[tex]\Delta T_{f}= T_{f}^{0}-T_{f}=i*K_{f}*m[/tex]
From the given information:
[tex]T_{f}[/tex] = freezing pt of solution = -10.0 C
[tex]T_{f}^{0}[/tex] = freezing pt of pure solvent = 0 C
Kf = freezing pt depression constant = 1.86 C/m
i = 1 for ethylene glycol antifreeze
[tex][0-(-10.0)] C= 1*(1.86 C/m) *( m)\\\\m = 5.38[/tex]
[tex]Molality = \frac{moles\ of\ solute}{kg\ solvent} \\\\Therefore,\ moles of antifreeze = molality* mass\ of\ water\\[/tex]
[tex]Molality = \frac{moles\ of\ solute}{kg\ solvent} \\\\Therefore,\ moles of ethylene glycol = molality* mass\ of\ water\\[/tex]
Volume of water = 6.50 L = 6500 ml
Density of water = 1.00 g/ml
Therefore mass of water = [tex]density * volume = 1.00g/ml*6500ml = 6500g = 6.50kg[/tex]
[tex]moles\ of\ ethylene glycol= 5.38moles/kg*6.50kg = 34.9 moles[/tex]
Molar mass of ethylene glycol = 62 g/mol
Mass of ethylene glycol needed = [tex]molar\ mass* moles = 62g/mol*34.9moles=2163.8g[/tex]
Density of ethylene = 1.11 g/ml
Therefore, volume needed = [tex]\frac{mass}{density} =\frac{2163.8g}{1.11g/ml} =1949ml[/tex]
