Given that 6e22 and 5e 3T are solutions of a second order linear homogeneous differential equation...
2. a) (7 pnts) Solve the second order homogeneous linear differential equation y" - y = 0. b) (6 pnts) Without any solving, explain how would you change the above differential equation so that the general solution to the homogeneous equation will become c cos x + C sinx. c) (7 pnts) Solve the second order linear differential equation y" - y = 3e2x by using Variation of Parameters. 5. a) (7 pnts) Determine the general solution to the system...
Find a second order homogeneous linear differential equation whose general equation is Atanx + Bsinx (A, B constant) [Hint use the fact that tanx and sinx are, individually, solutions and solve for the coefficients in standard form}
please show work The function y-3e4* + 2xe4* is a solution of second order linear homogeneous differential equation with constant coefficients. The differential equation is: f None of the above.
Find a second order homogeneous linear differential equation whose general solution is A tan x + B sin x (A, B constant). [Hint: Use the fact that tan x and sin x are, individually, solutions and solve for the coefficients in standard form.]
2. (Undetermined Coefficients... In Reverse) Find a second order linear equation L(y) = f(0) with constant coefficients whose general solution is: y=C et + Cell + tet (a) The solution contains three parts, so it must come from a nonhomogeneous equation. Using the two terms with undefined constant coefficients, find the characteristic equation for the homogeneous equation (h) Using the characteristic equation find the homogeneous differential equation. This should be the L(y) we're looking for. (c) Since we have used...
Find a second order linear equation L(y) = f(t) with constant coefficients whose general solution is: @ y=Cje24 + C261 + te3t @ (a) The solution contains three parts, so it must come from a nonhomogeneous equation. Using the two terms with undefined constant coefficients, find the characteristic equation for the homogeneous equation. (b) Using the characteristic equation find the homogeneous differential equation. This should be the L(y) we're looking for. (c) Since we have used two terms from the...
Suppose 01(t) and 02 (t) are both solutions to the (linear, homogeneous) second order differential equation: Y" + 3ty' + 2ty = 0. Which of the following are also solutions to the same differential equation? 0302(t) 0 g = $it) + 2^2(t) Oy=4(01(t))2 0 (01(t) + 02 (t))2
Two of the solutions of a linear homogeneous differential equation with constant coefficients are yi = -21%e-32 and Y2 = 4sin(31). What is the minimum possible order of the differential equation? 02 3 4 5 O 6 O 7
IGNORE (i) (ii) The procedure of finding series solutions to a homogeneous linear second-order ODEs could be accurately described as the “method of undetermined series coefficients”. (iii) The underlying idea behind the method of undetermined coefficients is a conjecture about the form of a particular solution that is motivated by the right-hand side of the equation. The method of undetermined coefficients is limited to second-order linear ODEs with constant coefficients and the right-hand side of the ODE cannot be an...
3 multiple choice questions Two solutions to a second order differential equation are linearly independent if (a) their Wronskian determinant is zero. (b) their Wronskian determinant is nonzero. (c) they are not scalar multiples of one another. (d) they each have a corresponding initial condition. (e) Both (b) and (c) are correct. Given the differential equation y"+9y' = e-91, the correct guess for a particular solution would be (a) yp = Ae-94 (b) yp = (Ax + B)e-9r. (c) yp...