A pure acid measuring x liters is added to 300 liters of a 20% acidic solution. The concentration of acid, f(x), in the new substance is equal to the liters of pure acid divided by the liters of the new substance, or . Which statement describes the meaning of the horizontal asymptote? The greater the amount of acid added to the new substance, the more rapid the increase in acid concentration. The greater the amount of acid added to the new substance, the closer the acid concentration is to one-fifth. As more pure acid is added, the concentration of acid approaches 0. As more pure acid is added, the concentration of acid approaches 1.

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khalilps43 khalilps43 · Answer 1 · 2020-04-30T00:26:10+02:00

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the answer is d

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RajarshiG RajarshiG · Answer 2 · 2022-06-25T21:32:01+02:00

As for the given function, as more pure acid is added, the concentration of acid approaches 0.

A function is a relation between input and output. For a certain input value of a function, there must be a output value.

In 300 liters 20% acid solution, acid is

[tex]= 300(\frac{20}{100}) liters\\= 60 liters[/tex]

Therefore, the given function is

[tex]f(x) \\= \frac{(x + 60)}{(x + 300)}[/tex]

It is clear from the graph that, for the given function, the horizontal asymptote is closer to the x-axis.

Therefore, the higher the amount of acid, the concentration of the solution will be more .

Learn more about a function here: https://brainly.com/question/14048229

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