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A bicycle tire has a diameter of
62cm.
What is the distance the bicycle tire travels in 10 revolutions?
Round your answer to the nearest cm.
cm

A bicycle tire has a diameter of $62 \mathrm{~cm}$ . $\newline$ What is the distance the bicycle tire travels in $10$ revolutions? $\newline$ Round your answer to the nearest $\mathrm{cm}$ . $\newline$ $\square$ cm

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Convert between customary and metric systems

Full solution

Q. A bicycle tire has a diameter of

62 \mathrm{~cm}

.

\newline

What is the distance the bicycle tire travels in

10

revolutions?

\newline

Round your answer to the nearest

\mathrm{cm}

.

\newline

\square

cm

Find Circumference: First, we need to find the circumference of the tire, which is the distance it travels in one revolution. The formula for circumference is $C = \pi d$ , where $d$ is the diameter. $C = \pi \times 62$ cm.
Calculate Circumference: Now, let's calculate the circumference. $\newline$ $C = 3.14 \times 62\,\text{cm} = 194.68\,\text{cm}$ . $\newline$ We round this to the nearest cm, so $C = 195\,\text{cm}$ .
Find Distance in $10$ Revolutions: Next, we need to find out how far the tire travels in $10$ revolutions. We do this by multiplying the circumference by the number of revolutions. $\text{Distance} = C \times \text{number of revolutions}.$ $\text{Distance} = 195\,\text{cm} \times 10.$
Calculate Total Distance: Let's do the multiplication to find the total distance. $\newline$ Distance = $1950\,\text{cm}$ .

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