First solve numerically using eulers method Accounting for viscous drag and fuel-burning, the one-dimensional equation of motion for a rocket-propelled vehicle travelling along a horizontal surface isdv1dmmdt= -PACDU -kdtwhere (in SI units) p = 1.2 is the density of air, A = 1 is the effective frontal area of the vehicle,= 3000 is the rocket's thrust coefficient. Furthermore, if theCD = 0. 25 is the drag coefficient and kmass of the vehicle after fuelling is 3000 kg and the fuel burn rate is a linear 6 kg s, then one may%3DSwritem =3000 – 6tSubstitute this expression for m and the values of p, A, Cp and k into the differential equationabove to show thatdv18, 000 – 0. 15v%3Ddt3000 – 6t plot a fully labelled graph of your results for 0 < t < 200 s,state the recursion relations (linking tn to tr-1 and Un to Un-1) you used to perform yournumerical solution; and,state the maximum speed that the vehicle is able to reach in the interval 0 < t < 200 s.(B)

Answered: Image /qna-images/answer/42a3eb66-f3fb-4291-ac9b-1e67bd666572.jpg

Answered: Substitute this expression for m and…

Substitute this expression for m and the values of e, A, Cp and k into the differential equation above to show that dv 18, 000 – 0. 15v² dt 3000 – 6t

Trigonometry (MindTap Course List)

10th Edition

ISBN:9781337278461

Author:Ron Larson

Publisher:Ron Larson

Chapter5: Exponential And Logarithmic Functions

Section: Chapter Questions

Problem 22PS

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Question

First solve numerically using eulers method

Accounting for viscous drag and fuel-burning, the one-dimensional equation of motion for a rocket-
propelled vehicle travelling along a horizontal surface is
dv
1
dm
m
dt
= -PACDU -k
dt
where (in SI units) p = 1.2 is the density of air, A = 1 is the effective frontal area of the vehicle,
= 3000 is the rocket's thrust coefficient. Furthermore, if the
CD = 0. 25 is the drag coefficient and k
mass of the vehicle after fuelling is 3000 kg and the fuel burn rate is a linear 6 kg s, then one may
%3D
S
write
m =
3000 – 6t
Substitute this expression for m and the values of p, A, Cp and k into the differential equation
above to show that
dv
18, 000 – 0. 15v
%3D
dt
3000 – 6t

plot a fully labelled graph of your results for 0 < t < 200 s,
state the recursion relations (linking tn to tr-1 and Un to Un-1) you used to perform your
numerical solution; and,
state the maximum speed that the vehicle is able to reach in the interval 0 < t < 200 s.
(B)

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