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A car owner upgrades from tires with a diameter of 24.8 inches to tires with a diameter of 26.8 inches. If the onboard computer is not updated, how fast will the car actually be traveling when the speedometer reads 70 mph?

Round your answer to two decimal places.

She is actually traveling at a speed of approximately _____ mph.



Answer :

GinnyAnswer
Alright, let's go through the problem step-by-step to understand how fast the car owner is actually traveling when the speedometer reads 70 mph after changing the tires.

1. Understand the Original and New Tire Diameters:
- The original tires have a diameter of 24.8 inches.
- The new tires have a diameter of 26.8 inches.

2. Speedometer Speed:
- The speedometer reads 70 miles per hour (mph).

3. Calculating the Ratio of Diameters:
- To figure out how the new tire size affects the actual speed, we first calculate the ratio of the new tire diameter to the original tire diameter.
- The ratio is given by [tex]\( \text{diameter ratio} = \frac{\text{new diameter}}{\text{original diameter}} \)[/tex].

4. Performing the Calculation for the Diameter Ratio:
- Plugging in the values:
[tex]\[ \text{diameter ratio} = \frac{26.8 \text{ inches}}{24.8 \text{ inches}} = 1.0806451612903225 \][/tex]

5. Calculating the Actual Speed:
- To find the actual speed, we multiply the speedometer reading by the diameter ratio:
[tex]\[ \text{actual speed} = 70 \text{ mph} \times 1.0806451612903225 = 75.64516129032258 \text{ mph} \][/tex]

6. Rounding the Actual Speed:
- Finally, we round the actual speed to two decimal places:
[tex]\[ \text{actual speed (rounded)} = 75.65 \text{ mph} \][/tex]

So, when the speedometer reads 70 mph, the car owner is actually traveling at approximately 75.65 mph.

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