14x104 The velocity of a rocket is given by v(t) = 2000 In -9.8t, 0≤t≤30 where 14x10 -2100t v is given in m/s and t is given in seconds. At t=16 s and using At= 2 s, a. Use forward difference, backward difference and central difference approximations of the first derivative of v(t) to determine the acceleration of the rocket. b. If the true value of the acceleration at t=16 s is 29.674 m/s², calculate the absolute relative true error for each approximation obtained. What can you conclude from these values of the relative errors?

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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14x10¹
The velocity of a rocket is given by v(t) = 2000 In
-9.8t, 0≤t≤30 where
14×10¹ - 2100t
v is given in m/s and t is given in seconds. At t=16 s and using At= 2 s,
a. Use forward difference, backward difference and central difference
approximations of the first derivative of v(t) to determine the acceleration of the
rocket.
b. If the true value of the acceleration at t=16 s is 29.674 m/s², calculate the absolute
relative true error for each approximation obtained. What can you conclude from
these values of the relative errors?
Transcribed Image Text:14x10¹ The velocity of a rocket is given by v(t) = 2000 In -9.8t, 0≤t≤30 where 14×10¹ - 2100t v is given in m/s and t is given in seconds. At t=16 s and using At= 2 s, a. Use forward difference, backward difference and central difference approximations of the first derivative of v(t) to determine the acceleration of the rocket. b. If the true value of the acceleration at t=16 s is 29.674 m/s², calculate the absolute relative true error for each approximation obtained. What can you conclude from these values of the relative errors?
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