Question

A chemist wants to mix a 65% alcohol solution with 10 liters of a 45% alcohol solution to produce a solution that is 55% alcohol. How many liters of the 65% alcohol solution should be used?

A chemist wants to mix a 65% alcohol solution with 10 liters of a 45% alcohol solution to produce a solution that is 55% alcohol. How many liters of the 65% alcohol solution should be used?

Answer 1

`10` liters of `65%` alcohol solution to be added.

Explanation:

Let `x` liters of `65%` alcohol solution is added to `10` liters of

`45%` alcohol solution to get resulting solution of `55%` alcohol.

Balancing alcohol content we get,

`x * 65/100+ 10 * 45/100 =( x+10)* 55/100` or

`65 x +450 = 55(x+10) or 65 x- 55 x= 550 -450` or

`10 x =100 or x=10` liters

Hence, `10` liters of `65%` alcohol solution to be added [Ans]

Answer 2

`10` liters

Explanation:

Let `x` liters of `65%` (by volume) alcohol solution be mixed with `10` liters of `45%` (by volume) alcohol solution then

The amount of alcohol in the mixture

`=\text{65 % of x}+\text{45% of 10 litres}`

`=65/100\times x+45/100\times 10`

`=0.65 x+4.5\ \text{litres}`

The amount of water in the mixture

`=\text{(100 - 65) % of x}+\text{((100 - 45) % of 10 litres}`

`=35/100\times x+55/100\times 10`

`=0.35 x+5.5\ \text{litres}`

Now, the percentage `(%)` amount of alcohol in the mixture

`=\frac{\text{volume of alcohol in the mixute}}{\text{total volume of mixure}}`

`=\frac{0.65x+4.5}{x+10}\times 100`

But it is given that mixture has `55%` alcohol hence we have

`\frac{0.65x+4.5}{x+10}\times 100=55`

`0.65x+4.5=0.55x+5.5`

`0.1x=1`

`x=1/0.1`

`x=10`

hence `x=10` liters of `65%` alcohol solution is required