What is General solution: Definition and 311 Discussions

In mathematics, a linear differential equation is a differential equation that is defined by a linear polynomial in the unknown function and its derivatives, that is an equation of the form





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{\displaystyle a_{0}(x)y+a_{1}(x)y'+a_{2}(x)y''+\cdots +a_{n}(x)y^{(n)}+b(x)=0,}
where a0(x), …, an(x) and b(x) are arbitrary differentiable functions that do not need to be linear, and y′, …, y(n) are the successive derivatives of an unknown function y of the variable x.
Such an equation is an ordinary differential equation (ODE). A linear differential equation may also be a linear partial differential equation (PDE), if the unknown function depends on several variables, and the derivatives that appear in the equation are partial derivatives.
A linear differential equation or a system of linear equations such that the associated homogeneous equations have constant coefficients may be solved by quadrature, which means that the solutions may be expressed in terms of integrals. This is also true for a linear equation of order one, with non-constant coefficients. An equation of order two or higher with non-constant coefficients cannot, in general, be solved by quadrature. For order two, Kovacic's algorithm allows deciding whether there are solutions in terms of integrals, and computing them if any.
The solutions of linear differential equations with polynomial coefficients are called holonomic functions. This class of functions is stable under sums, products, differentiation, integration, and contains many usual functions and special functions such as exponential function, logarithm, sine, cosine, inverse trigonometric functions, error function, Bessel functions and hypergeometric functions. Their representation by the defining differential equation and initial conditions allows making algorithmic (on these functions) most operations of calculus, such as computation of antiderivatives, limits, asymptotic expansion, and numerical evaluation to any precision, with a certified error bound.

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  1. Lotto

    Can I find a general solution to this circuit?

    TL;DR Summary: I have to find an equivalent resistance of the circuit below, dependent on the amount of ##R_3## - resistors. Here is the circuit: I think there is no general solution. When I want to calculate it, I have to do...
  2. chwala

    Find the general solution of the given PDE

    My take; ##ξ=-4x+6y## and ##η=6x+4y## it follows that, ##52u_ξ +10u=e^{x+2y}## for the homogenous part; we shall have the general solution; $$u_h=e^{\frac{-5}{26} ξ} f{η }$$ now we note that $$e^{x+2y}=e^{\frac{8ξ+η}{26}}$$ that is from solving the simultaneous equation; ##ξ=-4x+6y##...
  3. yucheng

    I General solution of 1D vs 3D wave equations

    For the 1 dimensional wave equation, $$\frac{\partial^2 u}{\partial x ^2} - \frac{1}{c^2}\frac{\partial ^2 u }{\partial t^2} = 0$$ ##u## is of the form ##u(x \pm ct)## For the 3 dimensional wave equation however, $$\nabla ^2 u - \frac{1}{c^2}\frac{\partial ^2 u }{\partial t^2} = 0$$It appears...
  4. U

    MHB Help with a question (Bernoulli General solution)

    Hello guys I hope you all are doing well. :) I found below question in a book by Martin Braun "Differential Equations and Their Applications An Introduction to Applied Mathematics (Fourth Edition)" The question : The Bernoulli differential equation is (dy/dt)+a(t)y=b(t)y^n. Multiplying through...
  5. F

    A Jackson Sec 2.6 on "general solution" of charge near sphere

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  6. H

    MHB Integrating Factor Method for Solving y' + y = e^{-2t}

    \[ y'=-y+e^{(-2)t} \]
  7. L

    I General solution of heat equation?

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  8. karush

    MHB -2.1.1 DE Find the general solution

    [a] Find the general solution of $y^\prime + 3y=t+e^{-2x}\quad \dfrac{dy}{dx}+f(x)y=g(x)$ \$\begin{array}{lll} \textsf{Similarly} & \dfrac{dy}{dx}+Py=Q\\ \textsf{hence} & \mu(x)=\exp\left(\int f(x)\,dx\right)\\ \textsf{then} & \mu^\prime(x)=\exp\left(\int...
  9. karush

    MHB 2.1.2 Find the general solution of y'−2y=t^{2}e^{2t}

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  10. O

    I General solution of the hydrogen atom Schrödinger equation

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  11. brotherbobby

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  12. karush

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  13. PainterGuy

    Finding the general solution of this nonhomogeneous linear system

    Hi, I was trying to do the following problem. My attempt. Finding the reduced row echelon form for the system above. I do not see any way to proceed any further. The following is the solution presented in solution manual. How do I proceed to get the following answer?
  14. karush

    MHB General Solution of Differential Equation System

    $\tiny{27.1}$ 623 Find a general solution to the system of differential equations $\begin{array}{llrr}\displaystyle \textit{given} &y'_1=\ \ y_1+2y_2\\ &y'_2=3y_1+2y_2\\ \textit{solving } &A=\begin{pmatrix}1 &2\\3 &2\end{pmatrix}\\...
  15. Kaguro

    Find the general solution of this nonlinear ODE: xy' + sin(2y) = x^3*sin^2(y)

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  16. karush

    MHB -b.2.1.12 Find the general solution 2y'+y=3t^2

    576 Find the general solution $2y'+y=3t^2$ Rewrite $y'+\frac{1}{2}y=\frac{3}{2}t^2$ So $u(t) = exp\left(\int \frac{1}{2} dt \right)=e^{t/2} $
  17. karush

    MHB -b.2.1.11 Find the general solution y'+y=5sin{2t}

    Find the general solution of the given differential equation, and use it to determine how solutions behave as $ t\to\infty$ $y'+y=5\sin{2t}$ ok I did this first $u(t)y'+u(t)y=u(i)5\sin{2t}$ then $\frac{1}{5}u(t)y'+\frac{1}{5}u(t)y=u(i)\sin{2t}$ so far ... couldn't find an esample to follow...
  18. ContagiousKnowledge

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  19. S

    I General solution of harmonic oscillations

    For a harmonic oscillator with a restoring force with F= -mω2x, I get that the solution for the x-component happens at x=exp(±iωt). But why is it that you can generalise the solution to x= Ccosωt+Dsin(ωt)? Where does the sine term come from because when I use Euler's formula, the only real part...
  20. karush

    MHB -29.1 Find a general solution to the system of DE

    Find a general solution to the system of differential equations \begin{align*}\displaystyle y'_1&=2y_1+3y_2+5x\\ y'_2&=y_1+4y_2+10 \end{align*} rewrite as $$Y'=\left[\begin{array}{c}2 & 3 \\ 1 & 4 \end{array}\right]Y +\left[\begin{array}{c}5x\\...
  21. G

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  22. karush

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    $\tiny{28.1}$ 2000 Find the general solution to the system of differential equations \begin{align*}\displaystyle y'_1&=y_1+5y_2\\ y'_2&=-2y_1+-y_2 \end{align*} why is there a $+-y_2$ in the given ok going to take this a step at a time...
  23. R

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  24. karush

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  25. G

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    Has anyone formulated a general solution to the time-independent Schrödinger equation in terms of the potential function V(r), and if so, what is it? For any type of V(r). So, instead of a differential equation, a direct relationship between the wavefunction and the potential.
  26. karush

    MHB -2.1.9 Find general solution of 2y'+y=3t

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  27. karush

    MHB -find general solution y'+2y=2-e^(-4t), y(0)=1

    2000 find the general solution for $y' + 2y = 2 - {{\bf{e}}^{ - 4t}} \hspace{0.25in}y\left( 0 \right) = 1$ find $\displaystyle u(x)=\exp \left(\int 2 \, dt\right) =e^{2t}$ $e^{2t}y' + 2\frac{e^{2t}}{2}y =2 e^{2t} - {{\bf{e}}^{ - 4t}}e^{2t}$ $(e^{2t}y)'=2e^{2t}-e^{-2t}$ i continued but didn't...
  28. A

    MHB Partial differential equations problem - finding the general solution

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  29. S

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  30. karush

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  31. M

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    Could someone please provide guidance on how to begin this problem? I've attached the preface to the assignment question.Show that the general solution of the differential equation y″(x)=−y(x) is y(x)=Acos(x)+Bsin(x) where A and B are arbitrary constants. Hint: You'll need the Taylor series...
  32. navneet9431

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  33. P

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    Dear all I've been trying to work out the general solution to a 2nd order ODE of the form f''(x)+p(x)*f(x)=0 p(x) is a polynomial for my case. I believe series method should work, but for some reason I would prefer a general solution using other methods. I'll be much appreciative for any help...
  34. karush

    MHB -b.2.1.5 Find the general solution of y' - 2y =3te^t,

    \nmh{895} Find the general solution of the given differential equation $\displaystyle y^\prime - 2y =3te^t, \\$ Obtain $u(t)$ $\displaystyle u(t)=\exp\int -2 \, dx =e^{-2t} \\$ Multiply thru with $e^{-2t}$ $e^{-2t}y^\prime + 2e^{-2t}y= 3te^{-t} \\$ Simplify: $(e^{-2t}y)'= 3te^{-t} \\$...
  35. karush

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  36. karush

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  37. B

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    Homework Statement The question I am working on is number 3 in the attached file. There are two initial conditions given: at time = 0, x(t) = D and x'(t) = v 'in the direction towards the equilibrium position'. Does that last statement mean that when I substitute the second IC in, I should...
  38. T

    MHB General solution y''+2y'+y=x(e^-x)+1

    Hi! I'm having a hard time with general solutions of a certain type, maybe it has to do with the constant in the particular solution? The equation is y''+2y'+y=xe-x+1 Is it right to assume that yh=(C1x+C2)e-x ? For the particular solution, I've tried all kinds of guesses for the form: yp=...
  39. R

    Find the general solution of the given differential equation....

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  40. binbagsss

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  41. G

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  42. SciencyBoi

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  43. karush

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  44. Wrichik Basu

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  45. Wrichik Basu

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  46. Wrichik Basu

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  47. Brage Eidsvik

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  48. Eclair_de_XII

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  49. Vitani11

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  50. M

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