Respuesta :
Answer:
502 cm
Step-by-step explanation:
The tip of the second hand travels along the circumference of a circle with radius equal to the length of the second hand.
We can use the formula C=2πr to find the circumference of the circle traced by the tip of the second hand.
C=2π8
C=2π(8)
C=16π
The circumference is 16π cm.
We can think about the relationship between distance and circumference like this:
distance = circumference x number of revolutions
The second hand of a clock makes a full revolution every minute, so we know that the second hand revolves 10 times in 10 minutes.
16π × 10 = 160π
≈160×3.14
≈502.4
≈502
The tip of the second hand travels 502 cm in 10 minutes.
