Final answer:
To create a mixture with 36% fruit juice, 6 L of Brand A fruit punch, which has 30% fruit juice, must be mixed with 9 L of Brand B fruit punch that contains 40% fruit juice.
Step-by-step explanation:
To determine how much of Brand A fruit punch needs to be mixed with 9 L of Brand B to get a 36% fruit juice mixture, we need to set up an equation that represents the total amount of fruit juice in the final mixture. Let x represent the volume in liters of Brand A fruit punch needed.
The amount of fruit juice in Brand A is 0.30x (since Brand A has 30% fruit juice) and the amount of fruit juice in Brand B is 0.40×9 (since Brand B has 40% fruit juice and we have 9 liters of it). The final mixture has 36% fruit juice, which is represented by the equation:
0.30x + 0.40×9 = 0.36(x + 9)
Solving for x, we have:
0.30x + 3.6 = 0.36x + 3.24
0.06x = 0.36
x = 0.36 / 0.06
x = 6
So, 6 L of Brand A fruit punch is needed.