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a) i. Express in terms of the unit step function, the piecewise continuous causal functions (2t2,...
Rewrite the following piecewise continuous function f (t) in terms of the unit-step function. Then find its Laplace transform f(t) =
Rewrite the following piecewise continuous function f (t) in terms of the unit-step function. Then find its Laplace transform f(t) =
Express the following functions in terms of unit step functions and find the Laplace transforms. 2 f(t)= 0 0<ts 1<t<21 t> 21 sint (12 marks)
5. Express f(t) using the unit step function an then use the Laplace Transform to solve the given IVP: y' + y = f(t), y(0) = 0, where f(t) = So, ost<1 15, t21
3. [24 pts] For the following piecewise functions f(t), (i) sketch a plot of f(t), (ii) write f(t) in terms of the Heaviside step function: H(t). (Chapter 6.3) 1, t1 -1,1St<2 (a) f(t)-〈1,2 t<3 0, 4 St t-1, 1st<2 t-3, 3st <4
Write the function in terms of unit step functions. Find the Laplace transform of the given function. f(t) = {3, Ost<5 1-4, t> 5 F(s) = Need Help? Read It Watch It Talk to a Tutor
Write the function in terms of unit step functions. Find the Laplace transform of the given function. -(2 5, (-4, 0 st 7 f(t) = t 2 7 F(s)
Write the function in terms of unit step functions. Find the Laplace transform of the given function. Įt, f(t) t, ost<3 10, t23
Question 9 3 pts The Laplace transform of the piecewise continuous function 4, 0<t <3 f(t) is given by t> 3 (2, L{f} = { (1 – 3e-*), s>0. O 2 L{f} (2 - e-st), 8 >0. 2 L{f} = (3 - e-st), s >0. O None of them 1 L{f} (1 – 2e -st), s >0.
The Laplace transform of the piecewise continuous function $4, 0<t<3 f(t) is given by 2, t> 3 1 L{f} (1 – 2e-st), 8 >0. S None of them L{f} = (1 – 3e®), s>0. 2 L{f} (3 - e-), 8 >0. S 2 L{f} (2-est), s >0. S
The Laplace transform of the piecewise continuous function $4, 0<t<3 f(t) is given by 2, t> 3 1 L{f} (1 – 2e-st), 8 >0. S None of them L{f} = (1 – 3e®), s>0. 2 L{f} (3 - e-), 8 >0. S 2 L{f} (2-est), s >0. S