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Chapter 6, Section 6.6, Go Tutorial Problem 10 Find the inverse Laplace transform of the function...
Find the inverse Laplace transform of the function F(s) s +1 $2 - 8s + 20 * uz(t)e(4t-12) (cos(2t – 6) + 2.5 sin(2t – 6)) OF U3(t)e4t (cos(2t – 3) + 0.5 sin(2t – 3)) OC e(4t-12) (cos(2t – 3) + sin(2t – 3)) OD uz(t) (cos(2t – 6) + sin(2t – 6)) ОЕ uz(t) (e4t – 5t)
Chapter 6, Section 6.2, Question 04 Find the inverse Laplace transform --1{F(s)} of the given function. 6s+36 FS) $2+12s+100 Your answer should be a function of t. Enclose arguments of functions in parentheses. For example, sin (22). -1{F (3)} = QC
is 45-5 The inverse Laplace transform of F(s) = $?+9 Select the correct answer a. 4cos3t - 5sin 31 b. 2cos(2t) - sin (36) c. 2cos4 - 3sin 5t 5 d. 4 cos 3-sin 31 e. 4cos(26) - 5sin (31)
Thank you! Chapter 13, Problem 13.35 (Circuit Solution) Find the inverse Laplace transform of the following functions. (a) F(s) -8 S+ 6 (b) F(s) - e (c) F(s)-1-e-6s S + 8 (a) Find ft) (inverse Laplace transform) at t = 9. (b) Find f(t) (inverse Laplace transform) at t = 3. (c) Find f(t) (inverse Laplace transform) at t7. ) (inverse Laplace transform) a
3 B 1. Find the third roots of 21+ Find the inverse of the Laplace transform 2. tan" G) 3. Check the existence of the Laplace transform for the given function and hence she that -02:49 in 133+ 4 S- where LF(t)) is represent the place transform of (1) [Hint: 2 cos Acos B = (A-2).sin(A+B) + sin(A - m = sin cos sin(A + B) - Sin(A) = 0 4. Find the Fourier Sine series of f(x) <rci 5....
do problem 2 and 4 Problem #2 Find the Laplace Transform 5t 2 3 Place Transform of X(t) = te-* cos(2t +30°) Problem #3 Find the Inverse Laplace Tran Tse Laplace Transform of: s+2 F(S) = (y2 +28+2)(s +1) Problem #4 Find the Inverse Laplace Transform 1-03 (s +2)(1 - e-*) F(s) = Problem #5 For F(s) given in Problem #3 find f(0) and f(co). Problem #6 Use Laplace Transform to find x(t) in the following integra differential equation: dx...
Find the following Inverse Laplace transformations. Use the Laplace Transform table attached in the next page. Show all your work, how to get partial fractions etc. and clearly state the Laplace rule(s) that you used in the related step from the attached Laplace Table. (?) ℒ −1 { ? 2−?+2 ?(?−3)(?+2) } (?) ℒ −1 { ? −? ? ? } (?) ℒ −1 { 1 ? 2−2?+1 }. Q1. (15 pts) Find the following Laplace transformations. Use the Laplace...
Laplace Transform: Problem 6 Previous Problem Problem List Next Problem (1 point) Find the inverse Laplace transform f(t) = --!{F(s)} of the function F(s) = 4e-25 52 + 16 f(t) = 2-1 | 4e-28 IS2 + 16 S help (formulas) Note: Use u(t) for the Heaviside function. Preview My Answers Submit Answers You have attempted this problem 0 times. You have unlimited attempts remaining.
Chapter 6, Section 6.2, Question 04 x Your answer is incorrect. Try again. Find the inverse Laplace transform L {F(s)} of the given function. 2s +12 F(S) = 2+12s+45 Your answer should be a function of t. Enclose arguments of functions in parentheses. For example, sin (2c). 2-'{F(s)} = 2e^(-3t)cos(6)
Find the inverse Laplace transform, f(t) of the 10 3 10 function F(s) + + s > 0 S 52 s + 10 f(t) = Preview t > 0 Submit License Question 2. Points possible: 2 Unlimited attempts. Message instructor about this question