http://www.mapleprimes.com/posts/36931-2nd-Order-ODE-With-4-Boundary-Conditions en-us 2026 Maplesoft, A Division of Waterloo Maple Inc. Maplesoft Document System Fri, 12 Jun 2026 12:10:22 GMT Fri, 12 Jun 2026 12:10:22 GMT The latest comments added to the Post, 2nd order ODE with 4 boundary conditions http://www.mapleprimes.com/images/mapleprimeswhite.jpg http://www.mapleprimes.com/posts/36931-2nd-Order-ODE-With-4-Boundary-Conditions http://www.mapleprimes.com/posts/36931-2nd-Order-ODE-With-4-Boundary-Conditions?ref=Feed:MaplePrimes:2nd order ODE with 4 boundary conditions:Comments#comment64488 <p>The general solution of a 2nd order ode has 2 arbitrary constants of integration, and they are fixed by two conditions. No additional condition can be imposed.</p> The latest comments added to the Post, 2nd order ODE with 4 boundary conditions 64488 Wed, 05 Aug 2009 21:14:25 Z jakubi jakubi http://www.mapleprimes.com/posts/36931-2nd-Order-ODE-With-4-Boundary-Conditions?ref=Feed:MaplePrimes:2nd order ODE with 4 boundary conditions:Comments#comment64489 <p>The usual Euler-Bernoulli differential equation for deflection of a beam would involve the fourth derivative of the deflection, not the second.&nbsp; See e.g. <a href="http://en.wikipedia.org/wiki/Euler-Bernoulli_Beam_Equation">en.wikipedia.org/wiki/Euler-Bernoulli_Beam_Equation</a>This would allow your four boundary conditions.</p> The latest comments added to the Post, 2nd order ODE with 4 boundary conditions 64489 Thu, 06 Aug 2009 02:28:16 Z Robert Israel Robert Israel