ASAP: Hose A fills a water truck at the constant rate of 60 gallons every 15 minutes. Hose B fills a water truck at a constant rate that is represented by the function y = 3x, where y is the total number of gallons filled in x minutes. Which BEST compares the rates of the two hoses?

A) The rate of Hose A is 3 gallons per minute more than the rate of Hose B.

B) The rate of Hose B is 3 gallons per minute more than the rate of Hose A.

C) The rate of Hose A is 1 gallon per minute more than the rate of Hose B.

D) The rate per minute is the same for Hose A and Hose B.

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TaeKwonDoIsDead TaeKwonDoIsDead · Answer 1 · 2019-10-09T21:22:05+02:00

Answer:

C

Step-by-step explanation:

Hose A:

60 gallons every 15 minutes mean:

60 / 15 = 4 gallons per minute

For Hose B:

If we put x = 1, we can find gallons (y) per minute (x)

y = 3 x

y = 3(1)

y = 3

That means 3 gallons per minute

Thus, the rate of Hose A is 1 gallon per minute more than the rate of Hose B. Option C is correct.

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Tringa0 Tringa0 · Answer 2 · 2019-10-24T07:50:58+02:00

Answer:

The correct answer is option C,

Step-by-step explanation:

Hose-A fills 60 gallons of water in 15 minutes .

Rate of Hose-A at which it fills water truck = [tex]R_a=\frac{60 gal}{15 min}=4 gal/min[/tex]

Hose-B fills water truck , its function is given as:

y = 3x

Where y is the total number of gallons filled in x minutes.

Rate of Hose-B at which it fills water truck = [tex]R_b=\frac{y gal}{xmin}=\frac{3x}{x} gal/min=3 gal/min[/tex]

Difference in rates of both hoses:

[tex]R_a-R_b=4 gal/min - 4gal/min = 1 gal/min[/tex]

[tex]R_a-R_b=1 gal/min[/tex]

[tex]R_a=R_b+1 gal/min[/tex]

The rate of Hose A is 1 gallon per minute more than the rate of Hose B.