Respuesta :
Answer:
[tex] X = \frac{1.6 - 0.05Y}{0.25}= 6.4 -0.2 Y[/tex] (3)
Replcaing equation (3) into equation (2) we got:
[tex] 0.75(6.4 -0.2 Y) +0.95 Y = 18.4[/tex]
And solving for Y we got:
[tex] 4.8 -0.15 Y +0.95 Y = 18.4[/tex]
[tex]0.8 Y = 13.6[/tex]
[tex] Y = 17[/tex]
And solving for X from equation (3) we got:
[tex] X= 6.4 -0.2*17 = 3[/tex]
So we need 3L of orange juice with 25% of concentration and 17 L of orange juice with 5% of concentration
Step-by-step explanation:
For this problem we can work with the concentration of water and orange juice.
Let X the amount for the orange juice with 25% content and Y the amount for the orange juice with 5% of content
Using the concentration of orange juice we have:
[tex] 0.25 X + 0.05 Y = 20*0.08[/tex] (1)
And for the water we have:
[tex] 0.75 X + 0.95Y = 20*0.92[/tex] (2)
If we solve for X from equation (1) we got:
[tex] X = \frac{1.6 - 0.05Y}{0.25}= 6.4 -0.2 Y[/tex] (3)
Replcaing equation (3) into equation (2) we got:
[tex] 0.75(6.4 -0.2 Y) +0.95 Y = 18.4[/tex]
And solving for Y we got:
[tex] 4.8 -0.15 Y +0.95 Y = 18.4[/tex]
[tex]0.8 Y = 13.6[/tex]
[tex] Y = 17[/tex]
And solving for X from equation (3) we got:
[tex] X= 6.4 -0.2*17 = 3[/tex]
So we need 3L of orange juice with 25% of concentration and 17 L of orange juice with 5% of concentration
