Brand A = 25% nuts & dried fruit
Brand B = 20% nuts and dried fruit
we want to mix then so as to get a 20 lb batch of 23% nuts an dried fruit.
So we create 2 equations, naming A the amount of Brand A granola, and B the amount (in pounds) of Brand B granola.
then the first equation (the easiest one):
A + B = 20 (since the addition of both should give 20 pounds)
second equation should be based on the amount of nuts and dried fruit that each brand provides to the mix:
recall that 25% in math form is written as: 0.25, 23 % is written as 0.23,
and 20% as 0.20
0.25 A + 0.20 B = 0.23 (20)
because the amount of nuts and dried fruit in the oart from Brand A plust the same for the part from brand B, should give the amount of numts and dried fruit in the 20 pounds of the final mix.
Now, we solve for B for example in the first equation we wrote:
B = 20 - A
and use "substitution" of this variable in the second equation:
0.25 A + 0.20 (20 - A) = 0.23 (20)
0.25 A - 0.20 A + 4 = 4.6
0.05 A = 4.6 - 4
0.05 A = 0.6
A = 0.6 / 0.05
A = 12 pounds
Then if A is 12 pounds, then brand B granola should be:
B = 20 - 12 = 8 pounds
Finals andswer:
We need 12 pounds of brand A, and 8 pounds of brand B.