differential equation
finds the simplest nontrivial annihilator with real coefficients (but you can leave it factored) for:
a- 2x^2+3x+9+sin4x+x^2e^3x.
b-e^2xsin3x.
differential equation finds the simplest nontrivial annihilator with real coefficients (but you can leave it factored) for: a- 2x^2+3x+9+sin4x+x^2e^3x. b-e^2xsin3x.
Solve the given differential equation by undetermined coefficients. y'' − 2y' + 2y = e^2x(cos(x) − 8 sin(x))
Write an equation for the polynomial graphed below. You can leave the function in factored form. Write an equation for the polynomial graphed below. You can leave the function in factored form. nw tua -5 - 13 -2 -1 1 2 3 4 5 á ú á ó ñ y(x) = Preview Get help: Video
can someone solve this differential equation. I'll definitely leave good remarks My courses / MAT2022_S / July 16 2020 / TEST 2 JULY 31, 2020 The particular integral of the differential equation 4 +4 dy + 3y = 3e2x is dx2 dx Select one: et a. 9 e 2x b. 3 3e2x c. e 2x d. 9 Moyt nade
6. [0/2 points) DETAILS PREVIOUS ANSWERS Find the general (real) solution of the differential equation: y"- 2y'- 15y=-51 sin(3 x) -3x | Ae 5x + Be 34 y(x) = 8.5 + -cos(3x) * 17 51 14 sin(3x) - - Find the unique solution that satisfies the initial conditions: Y(0) = 2.5 and y'(o)=37 y(x) = 7. [-12 Points) DETAILS Find the general (real) solution of the differential equation: y" + 4y' + 4y=64 cos(2x) y(x) = Find the unique solution...
1. Consider the differential equation: 49) – 48 – 24+246) – 15x4+36” – 36" = 1-3a2+e+e^+2sin(2x)+cos - *cos(a). (a) Suppose that we know the characteristic polynomial of its corresponding homogeneous differential equation is P(x) = x²(12 - 3)(1? + 4) (1 - 1). Find the general solution yn of its corresponding homogeneous differential equation. (b) Give the form (don't solve it) of p, the particular solution of the nonhomogeneous differential equation 2. Find the general solution of the equation. (a)...
5. Given the differential equation: e(dy/dx) 2x (a) Find the general solution (b) Graph particular solutions for integration constants C-0, 5, 10 and 15. You can put all plots on one graph or prepare separate plots. Show all calculations 5. Given the differential equation: e(dy/dx) 2x (a) Find the general solution (b) Graph particular solutions for integration constants C-0, 5, 10 and 15. You can put all plots on one graph or prepare separate plots. Show all calculations
Find a particular solution, yp(x), of the non-homogeneous differential equation d2 +y(x) = 6 ((x)) +9 y(x) = 6 x+2, d x2 given that yh(x) = A e3x +B x @3x is the general solution of the corresponding homogeneous ODE. The form of yp(x) that you would try is Oyp = ax + b Oyp = a 2x Oyp = ax2 3x Enter your answer in Maple syntax only the function defining yp(x) in the box below. For example, if...
Given: y''+2y'=2x+5-e^-2x General solution is: y=c1e^-2x+c2 +1/2(x^2)+2x+1/2(xe^-2x) Solve using the method of undetermined coefficients and show all steps please! I have the form of yp is Ax^2+Bx+Cxe^-2x, and the issue that plagues me is in solving for A B C. I get A=1/2 and I get B=2, but the terms involving C fall off the face of the earth when I substitute y' and y'' of the solution form into the equation, so how can I solve for C? Help...
2. You can use Dand write an operator instead of an equation in this question. (a) Find a constant coefficient linear homogeneous differential equation of lowest order that has n(x)-x , y2(z) = x2 , and y3(z) = eェamong its solutions. (b) Now find a different linear homogeneous differential equation of an order lower than the one in (a) that has the same y1,U2,U3 among its solutions. (c) Find a constant coefficient linear homogeneous differential equation of lowest order that...
can someone solve this differential equation. I'll definitely leave good remarks Question 4 Not yet answered Marked out of 1.00 The complementary function of the differential equation dºy dạy + 2 + dx3 dx2 dx dy = e2x is P Flag question Select one: Axe -X + (B + Cx)e- a. Ae2x + (B + Cx)e * O b. A + (B + Cx)e - -X C. Ae* + (B + Cx)e2x O d.