Solve the given initial-value problem. y'' + 4y = −3,    y(π/8) = 1 4 , y'(π/8) =...

Solve the following initial value problem, dy/dx = 8cos(x) / (y2 + 4y + 4) y(π/4)...

Solve the following initial value problem, dy/dx = 8cos(x) / (y2 + 4y + 4) y(π/4) = 4

Solve the given initial-value problem. (d2y) /dθ2 + y = 0,    y(π/3) = 0,    y'(π/3) = 8

Solve the given initial-value problem. (d2y) /dθ2 + y = 0,    y(π/3) = 0,    y'(π/3) = 8

Solve the initial value problem: 4y′′+3y=0, y(π/2)=2 , y'(π/2)=−1. Give your answer as y=... Use x...

Solve the initial value problem: 4y′′+3y=0, y(π/2)=2 , y'(π/2)=−1. Give your answer as y=... Use x as the independent variable.

Initial value problem: y′′+4y= {1 if 0⩽x<π or 0 if x⩾π , y(0)=1, y′(0)=0

Initial value problem: y′′+4y= {1 if 0⩽x<π or 0 if x⩾π , y(0)=1, y′(0)=0

Solve the given initial-value problem in which the input function g(x) is discontinuous. [Hint: Solve the...

Solve the given initial-value problem in which the input function g(x) is discontinuous. [Hint: Solve the problem on two intervals, and then find a solution so that y and y' are continuous at x = π/2.] y'' + 4y = g(x),   y(0) = 1, y'(0) = 3,   where g(x) = sin(x),    0 ≤ x ≤ π/2 0,    x > π/2 Find y(x) for each of the intervals.   ,    0 ≤ x ≤ π/2   ,    x > π/2

Solve the given initial value problem by undetermined coefficients (annihilator approach). y'' − 4y' + 4y...

Solve the given initial value problem by undetermined coefficients (annihilator approach). y'' − 4y' + 4y = e^4x + xe^−2x y(0) = 1 y'(0) = −1

Use Laplace Transforms to solve the given initial value problem y''-4y'+4y=t^3e6(2t) y(0)=1 and y'(0)=-2

Use Laplace Transforms to solve the given initial value problem y''-4y'+4y=t^3e6(2t) y(0)=1 and y'(0)=-2

Solve the initial value problem y''+4y'+4y=0, y(-1)=5, y'(-1)=5

Solve the initial value problem y''+4y'+4y=0, y(-1)=5, y'(-1)=5

Solve the initial value problem using the method of the laplace transform. y"+4y'+4y=8t,y(0)=-4,y'(0)=4

Solve the initial value problem using the method of the laplace transform. y"+4y'+4y=8t,y(0)=-4,y'(0)=4

Solve the initial value problem: 9y′′−18y′+15y=09y″−18y′+15y=0, y(π/3)=2y(π/3)=2, y′(π/3)=1.y′(π/3)=1.Give your answer as y=... y=... . Use xx...

Solve the initial value problem: 9y′′−18y′+15y=09y″−18y′+15y=0, y(π/3)=2y(π/3)=2, y′(π/3)=1.y′(π/3)=1.Give your answer as y=... y=... . Use xx as the independent variable.