5. (1 point) Find constants ci, c2, and c3, such that the function y ci +...
2. Fit the data to the periodic models F3)C1 +c2cos2t +c3 sin 2Tt and Fa(1)-ci + c2 cos 2πι + c3 sin 2πι + c4cos4πι. Find the 2-norm errors llell2 and compare the fits of Fs and F 0 4 1/6 2 (b) 1/30 1/25 2/3-1 5/6 3 2. Fit the data to the periodic models F3)C1 +c2cos2t +c3 sin 2Tt and Fa(1)-ci + c2 cos 2πι + c3 sin 2πι + c4cos4πι. Find the 2-norm errors llell2 and compare...
The answer above is NOT correct. (1 point) Find the general solution to y(4) – 8y"" + 15y" = 0. In your answer, use C1,C2,C3 and C4 to denote arbitrary constants and x the independent variable. Enter ci as c1, c2 as c2, etc. y=c1+xc1+c3e^(3x)+c4e^(5x) help (equations)
(1 point) In this exercise you will solve the initial value problem 1 +x2' (1) Let Ci and C2 be arbitrary constants. The general solution to the related homogeneous differential equation " - 4y+4y 0 is the function C2 NOTE: The order in which you enter the answers is important, that is, CJU) + Gg(x)ヂGg(x) + CN 2) The particular solution yo(x) to the differential equation y" +4ys of the form yo) -yi) u)x) and (x) = 2x (3) The...
Problem #8 : Find the values of ci, c2, and c3 so that ci (3, .15, 1) + c2 (-6, 5. O) + c3 (-3, 0, 0,-(-3, î0, 2). Г - Problem #8: enter the values of c1, c2, and c3, separated by commas Just Save | Submit Problem #8 for Gradin Problem #81 Attempt #1 | Attempt #2 | Attempt #3 Screenshot saved The screenshotw OneDrive OneDrive Your Answer Your Mark:
HW 07 - Homogeneous Equations with Constant Coefficients: Problenm Previous Problem Problem List Next Problem (1 point) Find the general solution to y ",-у', + 3y,-3y 0. In your answer, use cı, c2 and c3 to denote arbitrary constants and X the independent variable. Enter ci as c1, c2 as c2, and c3 as c3. help (equations)
Use the method of variation of parameters to determine the general solution of the given differential equation. y(4)+2y′′+y=3sin(t) Use C1, C2, C3, ... for the constants of integration. Enclose arguments of functions in parentheses. For example, sin(2x). y(t)=
= 1 -2t e ܘܟ ܙܢ eht + + C2 5 et + C3 Consider the system of differential equations regarding x = x(t), y = y(t), and z = z(t): x' 211 X + 212 y + 13 Z y' 021 X + 222 y + A23 Z z 031 X + 232 y + 833 Z where a 11, Q12, . , 033 are all real constants. Which of the following options could be a general solution of...
= 1 -2t e ܘܟ ܙܢ eht + + C2 5 et + C3 Consider the system of differential equations regarding x = x(t), y = y(t), and z = z(t): x' 211 X + 212 y + 13 Z y' 021 X + 222 y + A23 Z z 031 X + 232 y + 833 Z where a 11, Q12, . , 033 are all real constants. Which of the following options could be a general solution of...
The general solution of y(1) – 5y" – 36y = 0) is: (a) y = Cicos 3x + C2 sin 3x + C3e2x + C4e-20 (b) y=Ci cos 3x + C2 sin 3x + C3 cos 2x + C4 sin 2.0 (e) y=Cicos 2x + C2 sin 2x + C3e3x + Cae-31 (d) y=Cicos 2x + C2 sin 2x + C3e3x + Caxe3r (e) None of the above.
5. Try again < Previous You have answered 1 out of 3 parts correctly. Consider the differential equation: y" +625y = sec (25x). a. Find the general solution to the corresponding homogeneous equation. In your answer, use ci and cy to denote arbitrary constants. Enter cı as c1 and ca as c2. Ye = cl cos(25x) + c2 sin (25x) b. Apply variation of parameters to find a particular solution. Yp = 625 In ( cos(25x)) cos(25x) + mars -x...