Answer:
Concentration of solution A is 33% and B is 7%.
Step-by-step explanation:
Let the concentration of solution A be C1 and concentration solution B is C2.
Now we start the question.
If these two solutions are mixed in the ratio of V1 and V2.
Now the molecules present in the solution by mixing these two solutions will be= Total molecules of solution A + solution B
So the first equation will be C'V' =C1V1+C2V2
Here C'=20% and V1:V2=1:1 and V'=V1+V2
.20×(V+V) = C1×V+C2V
⇒0.20×2V= V(C1+C2)
⇒0.40=C1+C2----------(1)
Now other solution is prepared in which
C"V"=C1V3+C2V4
Here C"=14.8% V"=(V3+V4) & V3:V4=3:7
⇒.148×10V = C1×3V+C2×7V
⇒1.48V= V(3C1+7C2)
⇒1.48 = 3C1+7C2 --------(2)
Now we multiply equation (1) by 3 then
3C1+3C2= 0.40×3=1.20--------(3)
Now we subtract equation (3) from (2)
7C2-3C2=1.48-1.20
4C2 =0.28
C2 = .07 or we can say concentration of solution B is 7%
Now we put the value of C2 in equation (1)
C1+.07 = 0.40
C1 = 0.40-0.07 = 0.33 or concentration of solution A is 33%.
