part B and C a) Using the first shift theorem, when necessary (see below for a statement)write down the Laplace transforms of:-i. f₁(t) = -5e-³t, t≥ 0,ii. f₂(t) = e-³tt, t≥0,and hence find the Laplace transform of:g(t) = (2t - 5)e-3t, t≥ 0.b) Find constants a and b for which the inverse Laplace transform ofS1s²+2s+5F(s)=is f(t) = e-t (a cos 2t + b sin 2t), t ≥ 0.c) Using the result in b) solve the differential equation:-d²y dy+2 + 5y = 0,dt² dtwhen y(0) = 1 and (0)dydt=-3.

Answered: Image /qna-images/answer/1fc07a5d-4197-4328-a5d2-c066794c285d.jpg

b) Find constants a and b for which the inverse Laplace transform of s-1 F(s) = ²+2s+5 is f(t) = e¯¹ (a cos 2t + b sin 2t), t ≥ 0. c) Using the result in b) solve the differential equation:- d²y dt² dy when y(0) = 1 and (0) = -3. dt dy dt + 5y = 0,

b) Find constants a and b for which the inverse Laplace transform of s-1 F(s) = ²+2s+5 is f(t) = e¯¹ (a cos 2t + b sin 2t), t ≥ 0. c) Using the result in b) solve the differential equation:- d²y dt² dy when y(0) = 1 and (0) = -3. dt dy dt + 5y = 0,

Elementary Linear Algebra (MindTap Course List)

8th Edition

ISBN:9781305658004

Author:Ron Larson

Publisher:Ron Larson

Chapter6: Linear Transformations

Section6.1: Introduction To Linear Transformations

Problem 45E: Let T be a linear transformation from R2 into R2 such that T(x,y)=(xcosysin,xsin+ycos). Find a...

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Question

part B and C

a) Using the first shift theorem, when necessary (see below for a statement)
write down the Laplace transforms of:-
i. f₁(t) = -5e-³t, t≥ 0,
ii. f₂(t) = e-³tt, t≥0,
and hence find the Laplace transform of:
g(t) = (2t - 5)e-3t, t≥ 0.
b) Find constants a and b for which the inverse Laplace transform of
S
1
s²+2s+5
F(s)
=
is f(t) = e-t (a cos 2t + b sin 2t), t ≥ 0.
c) Using the result in b) solve the differential equation:-
d²y dy
+2 + 5y = 0,
dt² dt
when y(0) = 1 and (0)
dy
dt
=
-3.

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