2y''-2y'-4y=2e^(3x) -Find W -Find u1' and u2' -Find General Solution

Non homogeneous eq w constant; undetermined coefficients Find the general solution: 1) y" + 4y' +...

Non homogeneous eq w constant; undetermined coefficients Find the general solution: 1) y" + 4y' + 4y = xe^−x. 2) y" + 2y' + 5y = e^2x cos x. Determine a suitable form for a particular solution z = z(x) of the given equations 1) y" + 2y' = 2x + x^2e^−3x + sin 2x. 2) y" − 5y' + 6y = 2e^2x cos x − 3xe^3x + 5. 3) y" + 5y' + 6y = 2e^2x cos x −...

Solve for the general solution x^4y''''+4x^3y'''+3x^2y''-xy'+y=0

Solve for the general solution x^4y''''+4x^3y'''+3x^2y''-xy'+y=0

A): compute projw j if u1=[-7,1,4] u2=[-1,1,-2],w=span{u1,u2}. (u1 and u2 are orthogonal) B): let u1=[1,1,1], u2=1/3...

A): compute projw j if u1=[-7,1,4] u2=[-1,1,-2],w=span{u1,u2}. (u1 and u2 are orthogonal) B): let u1=[1,1,1], u2=1/3 *[1,1,-2] and w=span{u1,u2}. Construct an orthonormal basis for w.

1/4y''+4y=tan4t-1/2e^(2t) Find a general solution to the differential equation.

1/4y''+4y=tan4t-1/2e^(2t) Find a general solution to the differential equation.

find the general solution of the differential equation: y''+2y'+4y=xcos3x

find the general solution of the differential equation: y''+2y'+4y=xcos3x

Find the general solution to the differential equation 2y'+y=3x

Find the general solution to the differential equation 2y'+y=3x

Find the general solution to the following equation t^2y''-3ty'+4y=2

Find the general solution to the following equation t^2y''-3ty'+4y=2

Find the general solution using Variation of Parameters. y''-y'-2y=2e^(2t)

Find the general solution using Variation of Parameters. y''-y'-2y=2e^(2t)

If W is a subspace of Rn with an orthonormal basis u1, u2, . . ....

If W is a subspace of Rn with an orthonormal basis u1, u2, . . . , uk, if x ∈ Rn, and if projW (x) = (x • u1)u1 + (x • u2)u2 + · · · + (x • uk)uk, then x − projW (x) is orthogonal to every element of W. (Please show that x − projW (x) is orthogonal to each uj for 1 ≤ j ≤ k) u,x are vectors.

Given f(x,y) = 2y/sqrt(x) , find a unit vector u = (u1,u2) such that Duf(1,3) =...

Given f(x,y) = 2y/sqrt(x) , find a unit vector u = (u1,u2) such that Duf(1,3) = 0 and u1 > 0