Exam 17: Second-Order Differential Equations

The solution of the initial-value problem $x ^ { 2 } y ^ { \prime \prime } + x y ^ { \prime } + x ^ { 2 } y = 0 , y ( 0 ) = 1 , y ^ { \prime } ( 0 ) = 0$ is called a Bessel function of order 0. Solve the initial - value problem to find a power series expansion for the Bessel function.

Use power series to solve the differential equation. $y ^ { \prime \prime } + x ^ { 2 } y = 0 , y ( 0 ) = 6 , y ^ { \prime } ( 0 ) = 0$

Solve the differential equation. $3 y ^ { \prime \prime } + y ^ { \prime } = 0$

Solve the initial-value problem. $y ^ { \prime \prime } + 8 y ^ { \prime } + 41 y = 0 , y ( 0 ) = 1 , y ^ { \prime } ( 0 ) = 7$

Use power series to solve the differential equation. $y ^ { \prime } = 7 x ^ { 3 } y$

Solve the differential equation using the method of variation of parameters. $y ^ { \prime \prime } - y ^ { \prime \prime } = e ^ { 2 x }$

Solve the differential equation using the method of variation of parameters. $y ^ { \prime \prime } + 25 y = x$

Graph the particular solution and several other solutions. $2 y ^ { \prime \prime } + 3 y ^ { \prime } + y = 2 + \cos 2 x$

Solve the differential equation. $4 y ^ { \prime \prime } + y = 0$

A spring with a mass of 2 kg has damping constant 14, and a force of $4.8$ N is required to keep the spring stretched $0.4$ m beyond its natural length. Find the mass that would produce critical damping.

Use power series to solve the differential equation.. $\left( x ^ { 2 } + 1 \right) y ^ { \prime \prime } + x y ^ { \prime } - y = 0$

Solve the differential equation using the method of variation of parameters. $y ^ { \prime \prime } + y = \sec x , \frac { \pi } { 4 } < x < \frac { \pi } { 2 }$

Solve the boundary-value problem, if possible. $y ^ { \prime \prime } - y ^ { \prime } - 2 y = 0 , y ( - 1 ) = 1 , y ( 1 ) = 0$

Solve the differential equation using the method of undetermined coefficients. $y ^ { \prime \prime } - 3 y ^ { \prime } = \sin 9 x$

Solve the differential equation using the method of undetermined coefficients. $y ^ { \prime \prime } - 4 y ^ { \prime } + 5 y = 7 e ^ { - x }$

Solve the boundary-value problem, if possible. $y ^ { \prime \prime } + 5 y ^ { \prime } - 36 y = 0 , y ( 0 ) = 0 , y ( 2 ) = 1$

Solve the differential equation. $y ^ { \prime \prime } - 8 y ^ { \prime } + 25 y = 0$

Solve the differential equation using the method of variation of parameters. $y ^ { \prime \prime } - 3 y ^ { \prime } = e ^ { 3 x }$

Solve the differential equation using the method of undetermined coefficients. $y ^ { \prime \prime } + 5 y ^ { \prime } + 6 y = x ^ { 2 }$

A spring has a mass of $1$ kg and its damping constant is $c = 10$ . The spring starts from its equilibrium position with a velocity of $1$ m/s. Graph the position function for the spring constant $k = 20$ .