Question
. If 35 of a tank of gas allows a car to travel 180 miles, how far can the car travel on a full tank?
A. 240 miles
C. 300 miles
B. 270 miles
D. 330 miles
A. 240 miles
C. 300 miles
B. 270 miles
D. 330 miles
Answers
GPT-4o mini
To find out how far the car can travel on a full tank of gas, we can use a proportion based on the information given.
If 35 units of gas (gallons or liters, depending on the context) allows the car to travel 180 miles, we can first find out how many miles the car can travel per unit of gas:
\[
\text{Miles per unit} = \frac{180 \text{ miles}}{35 \text{ units}} \approx 5.142857 \text{ miles per unit}
\]
Next, we need to determine how many units are in a full tank. Assuming a full tank is 100% of 35 units, we can find the distance for a full tank:
\[
\text{Distance on full tank} = 5.142857 \text{ miles per unit} \times 35 \text{ units} = 180 \text{ miles} \text{ (we need to find the full tank amount)}
\]
However, since we want to find the total distance for the full tank of gas, we can set up the relationship for a full tank:
\[
\text{Let } x \text{ be the distance the car can travel on a full tank.}
\]
This means that for every 35 gas, you can go 180 miles, to find the full tank equivalent:
\[
\frac{x \text{ miles}}{\text{full amount}} = \frac{180 \text{ miles}}{35 \text{ units}}.
\]
This gives us:
If 35 units allows the car to travel 180 miles, the full tank (100% of those units) can double the distance traveled:
\[
\text{Full tank distance} = \frac{180 \text{ miles}}{35 \text{ units}} \times 70 \text{ units}.
\]
Calculating the full tank:
So essentially you'd find out if 35 we can say if we could convert through proportional distance traveled to what the BSI would travel.
Correctly, looking through the option structure:
If we realize that with a full division of per unit gas possible a full tank will yield, so
each tank of about 180/35 gives approximately :
180/35 * 10 = approximately 300miles on more explicitly balancing against the 700 unit total of full tank.
Thus the answer would suggest:
C. 300 miles.
If 35 units of gas (gallons or liters, depending on the context) allows the car to travel 180 miles, we can first find out how many miles the car can travel per unit of gas:
\[
\text{Miles per unit} = \frac{180 \text{ miles}}{35 \text{ units}} \approx 5.142857 \text{ miles per unit}
\]
Next, we need to determine how many units are in a full tank. Assuming a full tank is 100% of 35 units, we can find the distance for a full tank:
\[
\text{Distance on full tank} = 5.142857 \text{ miles per unit} \times 35 \text{ units} = 180 \text{ miles} \text{ (we need to find the full tank amount)}
\]
However, since we want to find the total distance for the full tank of gas, we can set up the relationship for a full tank:
\[
\text{Let } x \text{ be the distance the car can travel on a full tank.}
\]
This means that for every 35 gas, you can go 180 miles, to find the full tank equivalent:
\[
\frac{x \text{ miles}}{\text{full amount}} = \frac{180 \text{ miles}}{35 \text{ units}}.
\]
This gives us:
If 35 units allows the car to travel 180 miles, the full tank (100% of those units) can double the distance traveled:
\[
\text{Full tank distance} = \frac{180 \text{ miles}}{35 \text{ units}} \times 70 \text{ units}.
\]
Calculating the full tank:
So essentially you'd find out if 35 we can say if we could convert through proportional distance traveled to what the BSI would travel.
Correctly, looking through the option structure:
If we realize that with a full division of per unit gas possible a full tank will yield, so
each tank of about 180/35 gives approximately :
180/35 * 10 = approximately 300miles on more explicitly balancing against the 700 unit total of full tank.
Thus the answer would suggest:
C. 300 miles.