Respuesta :
Solution B (17% alcohol) = x ml
Solution A (13% alcohol) = (x-100) ml
0.17x ml alcohol in Solution B
0.13(x-100) ml alcohol in Solution A
0.17x + 0.13(x-100) = 347
0.17x+0.13x-13=347
0.3x = 360
x=360/0.3=3600/3=1200 ml solution B
Solution A (13% alcohol) = (x-100) ml
0.17x ml alcohol in Solution B
0.13(x-100) ml alcohol in Solution A
0.17x + 0.13(x-100) = 347
0.17x+0.13x-13=347
0.3x = 360
x=360/0.3=3600/3=1200 ml solution B
Answer:
1200 ml
Explanation:
Let x be the quantity ( in ml ) of b solution,
∵ solution a is 100 milliliters less of than solution b.
So, the quantity of solution a = 100 - x,
Now, solution a has 13% alcohol,
∴ Alcohol in solution a = 13% of (100-x) = [tex]\frac{13(x-100)}{100}[/tex] = 0.13(x-100),
While solution b has 17% alcohol,
∴ Alcohol in solution b = 17% of x = 0.17x,
So, the quantity of alcohol in the mixture of a and b = 0.13(x-100) + 0.17x
= 0.13x - 13 + 0.17x
= 0.30x - 13
According to the question,
Total quantity of alcohol in the mixture = 347 ml,
⇒ 0.30x - 13 = 347
⇒ 0.30x = 347 + 13
⇒ 0.30x = 360
⇒ x = [tex]\frac{360}{0.30}[/tex] = 1200
Hence, the quantity of solution b is 1200 ml.
