Calculus: Early Transcendentals 9th Edition

Published by Cengage Learning
ISBN 10: 1337613924
ISBN 13: 978-1-33761-392-7

Chapter 2 - Section 2.1 - The Tangent and Velocity Problems - 2.1 Exercises - Page 82: 6

Answer

(a) (i) $4.42~m/s$ (ii) $5.35~m/s$ (iii) $6.094~m/s$ (iv) $6.2614~m/s$ (v) $6.27814~m/s$ (b) We could estimate that the instantaneous velocity at $t = 1$ is $6.28~m/s$

Work Step by Step

(a) We can find the height at $t=1$: $y = 10(1)-1.86(1)^2 = 8.14~m$ (i) We can find the height at $t= 2$: $y = 10(2)-1.86(2)^2 = 12.56~m$ We can find the average velocity: $v_{ave} = \frac{12.56~m-8.14~m}{2~s-1~s} = 4.42~m/s$ (ii) We can find the height at $t= 1.5$: $y = 10(1.5)-1.86(1.5)^2 = 10.815~m$ We can find the average velocity: $v_{ave} = \frac{10.815~m-8.14~m}{1.5~s-1~s} = 5.35~m/s$ (iii) We can find the height at $t= 1.1$: $y = 10(1.1)-1.86(1.1)^2 = 8.7494~m$ We can find the average velocity: $v_{ave} = \frac{8.7494~m-8.14~m}{1.1~s-1~s} = 6.094~m/s$ (iv) We can find the height at $t= 1.01$: $y = 10(1.01)-1.86(1.01)^2 = 8.202614~m$ We can find the average velocity: $v_{ave} = \frac{8.202614~m-8.14~m}{1.01~s-1~s} = 6.2614~m/s$ (v) We can find the height at $t= 1.001$: $y = 10(1.001)-1.86(1.001)^2 = 8.14627814~m$ We can find the average velocity: $v_{ave} = \frac{8.14627814~m-8.14~m}{1.001~s-1~s} = 6.27814~m/s$ (b) As the time interval gets smaller, the average velocity gets closer to the instantaneous velocity at $t = 1$. We could estimate that the instantaneous velocity at $t = 1$ is $6.28~m/s$
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