What is the domain of C{3te3 -- 2e2+ + sin(2t)}(s)? Os> -3 Os> -2 Os >...
What is the domain of the laplace transform What is the domain of the Laplace transform L{t+ e-t sin(-3t) + 2e-2t} ? (A) (B) 8>0 -~<s<co (C) S>-1 (D) 8>-2
Question 11 1p Determine the length of the curve r(t) = (2, 3 sin(2t), 3 cos(2t)) on the interval ( <t<27 47107 Озубл 47 0 250 √107 None of the above or below Previous Ne
2 + 3s +2 (2s + 9)e-38 20. If F(s) = ? (S-2)(2+4)52+45 + 13 then L-'[F(s) = 2e2+ i sin 2x, OSI<3 (a) f(x) = { 2e2(-3) cos 3.- 3) + 2(1-3) sin 3(2x - 3), 1 3 2e22 + 3 cos 21, 0<x<3 2e2+ + 3 cos 2x + 2e-22 cos 3.0 + e -2- sin 3r, r>3 2e2+ + 2 sin 21, 05x<3 2e2+ sin 2r +2e-2(-3) cos 3(x - 3) + e -2(2-3) sin 3(-3), 1...
12. (8 points) Solve (sin 0)2 = 5.0 5 0 < 2t.
please show calculations Solve the equation on the interval 0 s < 2t. 1) 2 cos 0+32 2) tan2 = 3 3) 2 sin2 = sino show calculation please 4) 2 cos2 - 3 cos 0+1=0 5) sin2 - Cos2 0 = 0 Simplify the expression 6) + tan e 1+ sin e cose 7) (1 + cot e)(1-cote) -sce Establish the identity. 8) (sin x)(tan x cos x - cotx cos x) = 1 - 2 cos2x 9) (1...
10 sin 2t if 0 <t< 4. (a) Let r(t) if t > T Show that the Laplace transform of r(t) is L(r) 20(1 - e - e-78) 32 + 4 (b) Find the inverse Laplace transform of each of the following functions: s – 3 S2 + 2s + 2 20 ii. (52 + 4)(52 + 25 + 2) 20e-S ini. (s2 + 4)(52 + 25 + 2) (c) Solve the following initial value problem for a damped mass-spring...
PLEASE ANSWER THIS QUESTION CORRECTLY AND ASAP!!! What is the domain of the vector function r(t) = <2t+2, V3 –t, In (t) >. O a) {t]–3<t<0} b) {t|0<t<3} c) {t\t<3) d) {t|0<t <3} e) {t-3 <t<0}
B. i) Convert ft) -10est+ 8est sin(12t) to the s-domain, for fit)>o. ii) Convert F(s) :24-to the time domain. s2+5s+6
What is the Fourier transform of the following: f(0) = 3 sin wot for \t] < 57/W. elsewhere
you can skip question 1 Sketch the graph of x(t) sin(2t), y(t) = (t + sin(2t)) and find the coordinates of the points on the graph where the tangent is horizontal or vertical (please specify), then compute the second derivative and discuss the concavity of the graph. 1. Show that the surface area generated by rotating, about the polar axis, the graph of the curve 2. f(0),0 s asesbsnis S = 2nf(0)sin(0) J(50)) + (r°(®)*)de Find an equation, in both...