Solve the following initial-value problem by using integrating factors: ?2y′ + ?? = 1 , x...

Solve the Initial Value Problem: a) dydx+2y=9, y(0)=0 y(x)=_______________ b) dydx+ycosx=5cosx,        y(0)=7d y(x)=______________ c) Find the...

Solve the Initial Value Problem: a) dydx+2y=9, y(0)=0 y(x)=_______________ b) dydx+ycosx=5cosx,        y(0)=7d y(x)=______________ c) Find the general solution, y(t), which solves the problem below, by the method of integrating factors. 8t dy/dt +y=t^3, t>0 Put the problem in standard form. Then find the integrating factor, μ(t)= ,__________ and finally find y(t)= __________ . (use C as the unkown constant.) d) Solve the following initial value problem: t dy/dt+6y=7t with y(1)=2 Put the problem in standard form. Then find the integrating...

solve by the integrating facote method the following initial value problem dy/dx=y+x, y(0)=0

solve by the integrating facote method the following initial value problem dy/dx=y+x, y(0)=0

Solve the Initial Value Problem: ?x′ = 2y−x y′ = 5x−y Initial Conditions: x(0)=2 y(0)=1

Solve the Initial Value Problem: ?x′ = 2y−x y′ = 5x−y Initial Conditions: x(0)=2 y(0)=1

Solve the 1st-order linear differential equation using an integrating fac- tor. For problem solve the initial...

Solve the 1st-order linear differential equation using an integrating fac- tor. For problem solve the initial value problem. For each problem, specify the solution interval. dy/dx−2xy=x, y(0) = 1

Use Laplace transform to solve the following initial value problem: y '' − 2y '+ 2y...

Use Laplace transform to solve the following initial value problem: y '' − 2y '+ 2y = e −t , y(0) = 0 and y ' (0) = 1 differential eq

For the initial value problem • Solve the initial value problem. y' = 1/2−t+2y withy(0)=1

For the initial value problem • Solve the initial value problem. y' = 1/2−t+2y withy(0)=1

Solve the Initial Value Problem: dydx+2y=9,         y(0)=0 dydx+ycosx=5cosx,        y(0)=7d Find the general solution, y(t)y(t), which solves...

Solve the Initial Value Problem: dydx+2y=9,         y(0)=0 dydx+ycosx=5cosx,        y(0)=7d Find the general solution, y(t)y(t), which solves the problem below, by the method of integrating factors. 8tdydt+y=t3,t>08tdydt+y=t3,t>0 Put the problem in standard form. Then find the integrating factor, μ(t)=μ(t)=  ,__________ and finally find y(t)=y(t)= __________ . (use C as the unkown constant.) Solve the following initial value problem: tdydt+6y=7ttdydt+6y=7t with y(1)=2.y(1)=2. Put the problem in standard form. Then find the integrating factor, ρ(t)=ρ(t)= _______ , and finally find y(t)=y(t)= _________ .

In Exercises 31-42, solve the initial value problem. 3(x^(2))y''-4xy'+2y=0, y(1)=2, y'(1)=1

In Exercises 31-42, solve the initial value problem. 3(x^(2))y''-4xy'+2y=0, y(1)=2, y'(1)=1

Solve the initial value problem. x'=x+2y y'=7x+y with inition contitions x(0)=2 and y(0)=4.

Solve the initial value problem. x'=x+2y y'=7x+y with inition contitions x(0)=2 and y(0)=4.

Solve the initial value problem x′=x+y y′= 6x+ 2y+et, x(0) = 0, y(0) = 0.

Solve the initial value problem x′=x+y y′= 6x+ 2y+et, x(0) = 0, y(0) = 0.