Answer:
The chemist needs to add 400mL of 40% solution.
Step-by-step explanation:
The equation
[tex]y=\frac{0.1(200)+0.4x}{200+x} *100[/tex]
gives the percent concentration [tex]y[/tex] of the final mixture, when [tex]x[/tex] mL of the 40% solution are added.
Now we are asked, how many milliliters [tex]x[/tex] of the 40% solution should the chemist add to get final percent concentration [tex]y=30[/tex]; this is just a matter of solving the equation
[tex]30=\frac{0.1(200)+0.4x}{200+x} *100[/tex]
and we solve it the following way:
[tex]30=\frac{0.1(200)+0.4x}{200+x} *100\\\\0.3 =\frac{0.1(200)+0.4x}{200+x}\\\\0.3(200+x)=0.1(200)+0.4x\\\\60+0.3x=20+0.4x\\\\40=0.1x\\\\x=\frac{40}{0.1} \\\\\boxed{x=400\:mL}[/tex]
Thus, the chemist needs 400mL of 40% solution to get 30% concentration of the final mixture.
