Answer:
400 mL of 4% salt solution and 600 mL of 16% salt solution need to be mixed
Explanation:
Let's assume concentration of brine salt solutions are in %(w/v) unit.
Final mixture has a concentration of 11.2% salt and volume of 1 L or 1000 mL
Hence, amount of salt in final mixture = [tex]\frac{11.2\times 1000}{100}g=112g[/tex]
Suppose x mL of 4% salt solution and (1000-x) mL of 16% salt solution need to be mixed to get final mixture
So, amount of salt in x mL of 4% salt solution = [tex]\frac{4x}{100}g[/tex]
amount of salt in x mL of 16% salt solution =[tex]\frac{16\times (1000-x)}{100}g[/tex]
Hence, [tex]\frac{4x}{100}+\frac{16\times (1000-x)}{100}=112[/tex]
or, [tex]x=400[/tex]
So, 400 mL of 4% salt solution and 600 mL of 16% salt solution need to be mixed
