Question

Find the general solution of the differential equation: y' + 2y = 2sin (4t) Use lower case c for the constant in your answer.

Answer #1

find the general solution of the differential equation: y' + 2y
= te^−4t. Use lower case c for the constant in your answer.
y(t) = _________________

Find the general solution of the differential equation: y ' − 5y
= te^3t
Use lower case c for the constant in your answer.

a) Find the general solution of the differential equation
y''-2y'+y=0
b) Use the method of variation of parameters to find the general
solution of the differential equation y''-2y'+y=2e^t/t^3

Find the general solution of the differential equation
y′′ − 2y′ − 3y = ae3t, where a is a constant

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

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

Find the general solution of the given differential
equation.
y'' − y' − 2y = −8t + 6t2
y(t) =

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

Use the method of undetermined coefficients to find a general
solution to the given differential equation:
y''-y'-2y=4te3t+4sin2t

Find the general solution to the differential equation y′′+ 2y′=
3 + 4 sin 2t.(Hint: Variation of parameters requires integration by
parts, so undetermined coefficientsis recommended—however, be
careful.)

ADVERTISEMENT

Get Answers For Free

Most questions answered within 1 hours.

ADVERTISEMENT

asked 1 minute ago

asked 13 minutes ago

asked 18 minutes ago

asked 27 minutes ago

asked 27 minutes ago

asked 29 minutes ago

asked 30 minutes ago

asked 39 minutes ago

asked 56 minutes ago

asked 1 hour ago

asked 1 hour ago

asked 1 hour ago