1
answer
1
watching
345
views
24 Mar 2020
Suppose a point moves along a circle with radius r as shown in the figure below. The point travels a distance s along the circle in time
.
The angular speed of the point is ![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAKcAAAAJBAMAAAClLiFBAAAACXBIWXMAAABkAAAAZAAPlsXdAAAAG1BMVEUAAABHcEwAAAAAAAAAAAAAAAAAAAAAAAAAAACqZCrBAAAACXRSTlNEAIkiM2HSdxFGKL4bAAAAZklEQVQoz2MQEhQUYxSkKhBgYBAUFGUUFFYCAkWqGRoorCjaSG2XBgoEigsKSoBcWkg1QxXbCkOBDAYgcKSaoWoJaYqC1Pa+iKCwINUNFaQ+QDdUBBi0zGBC0AFIGiIx0fm4lRoAAD9kNSr3xkTNAAAAAElFTkSuQmCC)
![](data:image/png;base64,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)
Suppose a point moves along a circle with radius r as shown in the figure below. The point travels a distance s along the circle in time .
The angular speed of the point is
Sixta KovacekLv2
23 May 2020