Give the solution to the given boundary value problem y''+y=18x y(0)=0 y(1)+y'(1)=0 answer: 3x- (6sin(sqrt6) x)/(sin(sqrt...

Given: The following boundary value problem:    y"+ lamda*y = 0;                0 < x...

Given: The following boundary value problem:    y"+ lamda*y = 0;                0 < x < 2;         y(0) = 0;          y’(2) = 0 Find corresponding eigenvalues, (lamda)n and normalized eigenfunctions yn Expand the function f(x) = x, in terms of the eigen functions obtained in (i)

Without using a calculator, find y' for the function: y = sin-1 (3x)+ln(x)sinh(3x)+ (2x−1)/sqrt(5x+1)

Without using a calculator, find y' for the function: y = sin-1 (3x)+ln(x)sinh(3x)+ (2x−1)/sqrt(5x+1)

Find the solution of the initial-value problem. y'' + y = 4 + 3 sin(x), y(0)...

Find the solution of the initial-value problem. y'' + y = 4 + 3 sin(x), y(0) = 7, y'(0) = 1

A nontrivial solution of the boundary value problem y′′ + 9y = 0; y′(0) = 0,...

A nontrivial solution of the boundary value problem y′′ + 9y = 0; y′(0) = 0, y′(π) = 0 is:

obtain the green's function for the boundary value problem y''+y = f(x), y(0)=y(1)=0

obtain the green's function for the boundary value problem y''+y = f(x), y(0)=y(1)=0

Solve the initial value problem x′=−3x−y, y′= 13x+y, x(0) = 0, y(0) = 1.

Solve the initial value problem x′=−3x−y, y′= 13x+y, x(0) = 0, y(0) = 1.

Verify that the given function is the solution of the initial value problem. 1. A) x^3y'''-3x^2y''+6xy'-6y=...

Verify that the given function is the solution of the initial value problem. 1. A) x^3y'''-3x^2y''+6xy'-6y= -(24/x) y(-1)=0 y'(-1)=0 y''(-1)=0 y=-6x-8x^2-3x^3+(1/x) C) xy'''-y''-xy'+y^2= x^2 y(1)=2 y'(1)=5 y''(1)=-1 y=-x^2-2+2e^(x-1-e^-(x-1))+4x

Find the solution to the boundary value problem: d2y/dt2−4dy/dt+3y=0,   y(0)=7,y(1)=8 y=

Find the solution to the boundary value problem: d2y/dt2−4dy/dt+3y=0,   y(0)=7,y(1)=8 y=

Solve the following initial/boundary value problem: ∂u(t,x)/∂t = ∂^2u(t,x)/∂x^2 for t>0, 0<x<π, u(t,0)=u(t,π)=0 for t>0, u(0,x)=sin^2x...

Solve the following initial/boundary value problem: ∂u(t,x)/∂t = ∂^2u(t,x)/∂x^2 for t>0, 0<x<π, u(t,0)=u(t,π)=0 for t>0, u(0,x)=sin^2x for 0≤x≤ π. if you like, you can use/cite the solution of Fourier sine series of sin^2(x) on [0,pi] = 1/4-(1/4)cos(2x) please show all steps and work clearly so I can follow your logic and learn to solve similar ones myself.

3) (A theoretical problem) Find the exact solution of the two-point boundary-value problem x''=f(t), x(0)=x(1)=0

3) (A theoretical problem) Find the exact solution of the two-point boundary-value problem x''=f(t), x(0)=x(1)=0