Find the general sol (including equilibrium and singular sol if there are) of the ODE (all...
First-Order ODE
(a) .Find the general solution of the following ODE:
(b). Find the general solution (for x > 0) of the ODE :
Hint: try the change of variables u ≜ x, v ≜ y/x.
(c). Find the solution to the ODE
that satisfies y(2) = 15.
Hint: Try separation of variables. For integration,
try partial fraction decomposition.
2Ꮖy 2 Ꭸ , . + <+5 12 , fi - z - ,fix = zu y' = y2...
8. Consider the real matrix As -1 0 (a) (3 pts) Find the singular values of A. (b) (4 pts) Find a singular value decomposition of A. (c) (3 pts) Find
8. Consider the real matrix As -1 0 (a) (3 pts) Find the singular values of A. (b) (4 pts) Find a singular value decomposition of A. (c) (3 pts) Find
7. Find the general solution of the ODE below as a power series solution about the point x = 0. (15 pts. total) y"+y = 0.
A) Find the solution of the given 2nd order Homogenous ODE using undetermined coefficient 1) y"-10y, + 25y-30x + 3 4 3) y"- 16y - 2e4x 4) y" + 2y'ysin x + 3 cos 2x B) Find the solution of the given 2nd order Homogenous ODE using variation parameter 1) y" + y sec θ tan θ 1+e 3) 3y''-6y' + 6y = ex secx x+1
A) Find the solution of the given 2nd order Homogenous ODE using undetermined coefficient...
Find the general solution of the following ODE: y (4) + 8 y" + 16 y = 0 Please show ALL work to get credits.
Find the general solution of the second order constant coefficient
linear ODEs
7. Find the general solution of the second order constant coefficient linear ODE. (a) y" +2y = 0 (b) 2y" – 3y +y=0 (c) y" – 2y – 2y = 0 (d) y" – 2y + 2y = 0 (e) y" + 2y - 8y = 0 (f) y" +9y=0 (g) y" – 4y + 4y = 0 (h) 25y" – 10y' +y=0
Consider the ODE:3xy"+y' - 2xy = 0. Find the general solution in power series form about the regular singular point x = 0, following parts (a) – (c), below. (a) Obtain the recurrence relation. (b) Find the exponents of the singularity. (e) Obtain only one of the two linearly independent solutions, call it y(x), that corresponds to the smaller exponent of the singularity; but, only explicitly include the first four non-zero terms of the power series solution. Write down the...
Need help with all of it
Problem 2: Consider the 1st order ODE ry + (2.+ 3y2 – 20y = 0. (2) As we discussed in class, this ODE isn't linear, exact, or separable. We will now develop a method to solve an ODE like this. Consider the more general case given by the ODE M(2,4) + N(2,4)} = 0 as in our situation, assume this ODE isn't linear, separable, or exact. Our goal will be to find a function...
any help on these two questions please??
4.4: Let 1 0 1 and b(t)- -1 1 0 (a) Find the general real solution of the linear ODE (t) A(t). (b) Find the general real solution of the linear ODE x(t)-Ax(t) + b(t). (c) Solve the initial value problem x(t) = A2(t) + b(t), x(0) = (-2,0,2)T 4.5: Determine the general solution of the ODE x"(t)-x"(t)-r(t) + x(t) = t cost.
4.4: Let 1 0 1 and b(t)- -1 1 0...
Find the general solution of this ODE:d²y/dt²+11 dy/dt+28y=-2The solution will be of the form:y(t)=Cy₁(t)+Dy₂(t)+yp(t)so use C and D as the arbitrary constants.y(t)=_______