what is a set of fundamental solutions of a linear differential
equation?

what is a set of fundamental solutions of a linear differential equation?
Problem 1a. Verify that the given functions form a fundamental set of solutions of the differential equation. 4y'' + 36y = 0; y1 = cos(3x); y2 = sin(3x)
4) A 3rd order linear homogeneous differential equation has solutions including e* e* + 2x, and e* + 2e2x Do these form a fundamental solution set? Why or why not? Carefully explain your answer. [8 pts]
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
Given the solutions of a third order differential equation f₁(x)=2 x²-x, f₂(x)=2 x²+1 and f₃(x)=-x+2 use the Wronskian determinant to show the functions are linearly independent. Will this set be a fundamental solution set this ODE?
(17 points) A 9th order, linear, homogeneous, constant coefficient differential equation has a characteristic equation which factors as follows. (r? - 4r +13)*r(r + 3) = 0 Write the nine fundamental solutions to the differential equation. 99 (You can enter your answers in any order.)
(17 points) A 9th order, linear, homogeneous, constant coefficient differential equation has a characteristic equation which factors as follows. (p2 + 6r + 18)ºr(r + 1)2 = 0 Write the nine fundamental solutions to the differential equation. Y1 = = Y2 = Y3 Y4 = Y5 = Y6 = = Y7 = Y8 = Y9 =
(17 points) A 9th order, linear, homogeneous, constant coefficient differential equation has a characteristic equation which factors as follows. (P2 - 2r+2) rtr + 3) = 0 Write the nine fundamental solutions to the differential equation. y y2 > Y4= Ys = Y y = 19 = (You can enter your answers in any order.)
(17 points) A 9th order, linear, homogeneous, constant coefficient differential equation has a characteristic equation which factors as follows. (p2 + 4r + 8) ºr(r – 2)2 = 0 Write the nine fundamental solutions to the differential equation. Y1 = Y2 = Y3 = Y4 = Y5 = Y6 = 47 = Ys = Y9 = (You can enter your answers in any order.)
a) Assume that y1(c) t and y2)te are solutions of the differential equation t2y_ t(t + 2))" + t(t + 2)y-0, t > 0 Do y1(t) and y2() form a fundamental set of solutions of the O.D.E.? C) State the general solution for this O.D.E.
a) Assume that y1(c) t and y2)te are solutions of the differential equation t2y_ t(t + 2))" + t(t + 2)y-0, t > 0 Do y1(t) and y2() form a fundamental set of solutions of...
(6) In R3, let W be the set of solutions of the homogeneous linear equation r + 2y +3z 0. Let L be the set of solutions of the inhomogeneous linear equation (a) Define affine subspace of a vector space. (b) Prove that L is an affine subspace of R3 (c) Compute a vector v such that L = v + W
(6) In R3, let W be the set of solutions of the homogeneous linear equation r + 2y...