Infinite Geometric Series Bouncing Ball Youtube In this video we use a geometric sequence to determine how high a ball is bouncing and an infinite geometric series to determine the total vertical distance. This video shows the solution to a classic problem involving an infinite geometric series.
How To Solve Bouncing Ball Problem Using Infinite Geometric Series This lesson explains the good old bouncing ball problem. it explains how to use geometric series to find the total distance of the bouncing ball. Khanmigo is now free for all us educators! plan lessons, develop exit tickets, and so much more with our ai teaching assistant. The corresponding series can be written as the sum of the two infinite geometric series: one series that represents the distance the ball travels when falling and one series that represents the distance the ball travels when bouncing back up. series 1 5 3.25 2.1125 ⋯ series 2 3.25 2.1125 1.373125 ⋯ find the sum of each series. The ball has to go up before it goes down again. $100\mathrm{m}$ would be the total distance the ball drops, $180\mathrm{m}$ the total distance the ball travels. $\endgroup$ – eric duminil commented oct 24, 2018 at 7:35.
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