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Danny's truck has a fuel tank with a capacity of 20 gallons of gas. The truck averages 17 miles per gallon of gas. The function [tex]M(g)=17g[/tex] represents the number of miles that Danny's truck travels on [tex]g[/tex] gallons of gas. What domain and range are reasonable for the function?

A. [tex]D: 0 \leq g \leq 340[/tex]
[tex]R: 0 \leq M(g) \leq 20[/tex]

B. [tex]D: 0 \leq g \leq 20[/tex]
[tex]R: 0 \leq M(g) \leq 340[/tex]

C. [tex]D: 0 \leq g \leq 20[/tex]
[tex]R: 17 \leq M(g) \leq 340[/tex]

D. [tex]D: 17 \leq g \leq 20[/tex]
[tex]R: 20 \leq M(g) \leq 340[/tex]

Sagot :

GinnyAnswer
Let's analyze the details given in the problem first.

1. Truck Capacity: Danny's truck can hold up to 20 gallons of gas.
2. Mileage: The truck averages 17 miles per gallon.
3. Function: [tex]\( M(g) = 17g \)[/tex] where [tex]\( M(g) \)[/tex] is the number of miles traveled on [tex]\( g \)[/tex] gallons of gas.

We'll define the domain and range for the function [tex]\( M(g) \)[/tex].

### Domain:
The domain represents the possible values for [tex]\( g \)[/tex], which is the number of gallons of gas. Since the truck's fuel tank can hold up to 20 gallons:
- The minimum value of [tex]\( g \)[/tex] is 0 (an empty tank).
- The maximum value of [tex]\( g \)[/tex] is 20 (a full tank).

Thus, the domain ([tex]\( D \)[/tex]) is [tex]\( 0 \leq g \leq 20 \)[/tex].

### Range:
The range represents the possible values for [tex]\( M(g) \)[/tex], which is the number of miles traveled. Using the given function [tex]\( M(g) = 17g \)[/tex]:
- When [tex]\( g \)[/tex] is 0 gallons, [tex]\( M(0) = 17 \times 0 = 0 \)[/tex] miles.
- When [tex]\( g \)[/tex] is 20 gallons, [tex]\( M(20) = 17 \times 20 = 340 \)[/tex] miles.

Thus, the range ([tex]\( R \)[/tex]) is [tex]\( 0 \leq M(g) \leq 340 \)[/tex].

### Conclusion:
Given the above analysis, the reasonable domain and range for the function [tex]\( M(g) = 17g \)[/tex] are:
- [tex]\( D: 0 \leq g \leq 20 \)[/tex]
- [tex]\( R: 0 \leq M(g) \leq 340 \)[/tex]

So the correct answer is:

B.
- [tex]\( D: 0 \leq g \leq 20 \)[/tex]
- [tex]\( R: 0 \leq M(g) \leq 340 \)[/tex]
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