Therefore the answer for the Laplace transform of g(t) is Option A
Find the laplace transform of g(t) | t', 0< t<2 7, 2< t 2 C(s): -25...
Find the laplace transform of [ [2,0< t<2 g(t) 7, 2< t -25 + c(s)= -25 0 2-܇ ܀ 21-e؛ ܪܼܲ$-(ocs ܙ-:; + -odo ) - $ w 21-e܊ ܝܼ ܊ -(odo 23-;܀ 21-e܊ ܛܼ :;- -(odo 2 c(s)= + -25 -25 +
Find the laplace transform of: [t2,0< t<2 [7, 2< t g(t) - -25 -25 + + 21-e܀ 21-eܙ ++{; -(odo 23-eܕܳ ܀ 23-e(܊ -(c ( s 21-eܪܨܽ ܊ -(occ 21-e܀ 21-e(܊ ܪܼܛܼܲ: ܕܶ)- -(occ -25 + 3 S] -25 -25 +
QUESTION 1 Find the laplace transform of. g(t) 72,0st<2 17, 2 st = 7 -25 e C(s)--+*+5)=254 C(s) = -le-25+e-25 o CG)- - e-23 oc(s)=-63 +4+)25+?p=28 -25
Find the laplace transform of: (p², Ost<2 g(t) = 17,2st -25 O e C(5)=-63 ++)+25+ G(s)-()e2+{e-25 G(s) = -43 + + 3) =25 G(s) =- + )e-2s+že-2 +
QUESTION 7 Find the Laplace transform of the function f(t) = t, 0 <t<1 1, t>1 S e S s2 - e-s S 1 e-(s-1) S 32 S e OD. 1- $2 - e $2
Find the Laplace transform of the function: 1<2 f(t) = = { 0,5 -44 +7, 122 -25 L(S) = =e ( - ) 29-06- 3 S 3 (s) = 22 + 20) -- G+ :) + 3 (s) = e-25 + S
t <2 2 < t < 3 t23 0, 2 sin(rt), 0, Find the Laplace transform F(s) of f(t) F(s) = hw9,47
4. Find the Laplace transform of the following function. 0 st<1 t + 1 1s1<2 g(t) = 2st<3 01
What is the Laplace Transform of the function g(t) 0 if t<T t- if <t < 2? 0 if t> 21 Select one: 2 e 2 2
(1 point) S 3, 0<t< 1 =10, 1st<2 Find the Laplace transform F(s) of the periodic function f(t) = with f(t + 2) = f(t) whose graph is given below. What is the minimal period T for the function f(t): T = e-st f(t) dt F(s) = (1 – e-Ts) 1.8 1.0