solve the following differential equations a)? ′′ + ? = sec(?) tan(?) b) ? ′′ −...

solve differential equation by variation of parameters y''+y=sec(theta) tan(theta)

solve differential equation by variation of parameters y''+y=sec(theta) tan(theta)

Solve the following differential equations by using variation of parameters. y''-y'-2y=e3x

Solve the following differential equations by using variation of parameters. y''-y'-2y=e3x

Use variation of parameters to solve the following differential equations y''+4y'+4y=e^(t)tan^-1(t)

Use variation of parameters to solve the following differential equations y''+4y'+4y=e^(t)tan^-1(t)

solve differential equation by variation of parameters y''+y=sec(theta) tan(theta) simple and clear answer no need for...

solve differential equation by variation of parameters y''+y=sec(theta) tan(theta) simple and clear answer no need for writing words just do the math

1- Solve the following differential equations: a) y ' = y / (x (lnx)) b) (eˆ...

1- Solve the following differential equations: a) y ' = y / (x (lnx)) b) (eˆ (-y)) * (y '+ 1) = x (eˆx) c) x '- (tan (t)) * x = sen (t) d) y '= 1-y + (eˆ (2x)) * (yˆ2)

solve differential equation by variation of parameters y''+y=sec(theta) tan(theta) simple and clear answer no need for...

solve differential equation by variation of parameters y''+y=sec(theta) tan(theta) simple and clear answer no need for writing words just do the math one page is enough if you could

Solve the following systems of differential equations:

Solve the following systems of differential equations:

This question is for my differential equations class so please use differential equations to solve the...

This question is for my differential equations class so please use differential equations to solve the problem. A mass of 4 kg is attached to a spring hanging from a ceiling, thereby stretching the spring 9.8 cm on coming to rest at equilibrium. The mass is then lifted up 10 cm above the equilibrium point and given a downward velocity of 1 m/sec. Determine the equation of motion of the mass.

Solve the following exercise by applying differential equations: A person weighing 67 kg falls from a...

Solve the following exercise by applying differential equations: A person weighing 67 kg falls from a building measuring 40m with an initial speed of 3m / sec. Let's suppose: The air resistance is proportional to the speed of the body. The limit speed at which it can fall is 40 m / sec. Find: a) the expression of the velocity of the object in a time t, b) the expression for the position of the body at a time t...

Ordinary differential equations please show work for both parts A and B! A) Solve the following...

Ordinary differential equations please show work for both parts A and B! A) Solve the following equation. (Section 4.7) x3y‴-6y=0 B) Write the expression for the particular solution in integral form and solve it where possible. (section 4.8) y″-2y'+2y=cos2x