A bicycle tire has a radius of 13 inches. To the nearest inch, how far does the tire travel when it makes 6 revolutions?
it's 490 i am telling the truth
i like mlus
I think its 6 x 3.14 = s
s x the mass of the earth = a
a x the momentum of mercury spinning of the earth
then use the trigonometric ratio and divide with the answer
then use Pythagorean theorem and multiply with 6
Divide S and A
Then weigh your mom and the number she weighs is the answer.
ur welcome
it's 150
To find the distance traveled by the bicycle tire, we need to calculate the circumference of the tire first. The circumference of a circle is given by the formula:
C = 2πr
Where C is the circumference, π (pi) is a mathematical constant approximately equal to 3.14159, and r is the radius of the circle.
In this case, the radius of the bicycle tire is given as 13 inches. So we can substitute this value into the formula:
C = 2π(13)
Next, we need to calculate the total distance traveled by the tire when it makes 6 revolutions. Since one revolution is equivalent to one circumference, we can multiply the calculated circumference by the number of revolutions:
Distance = C x Number of Revolutions
Plugging in the numbers:
Distance = 2π(13) x 6
To find the distance to the nearest inch, we need to round the final answer. Let's now calculate the value using a calculator:
Distance = 2 x 3.14159 x 13 x 6
Distance ≈ 492.1257 inches
Rounding it to the nearest inch:
Distance ≈ 492 inches
Therefore, the bicycle tire will travel approximately 492 inches when it makes 6 revolutions.
A bicycle tire has a radius of 8 inches. How many feet will the bicycle travel after 15 revolutions of the tire?
is it 156
I don’t understand this problem
C = pi * d
C = 3.14 * 26
C = 81.64 inches
81.64 * 6 = ?