Question 1

Find the general solution of the differential equation $y^{\prime \prime}+5 y^{\prime}+6 y=0$.&#10;A) $y=k_{1} e^{-5 x}+k_{2} e^{-x}$&#10;B) $y=k_{1} e^{-3 x}+k_{2} e^{-2 x}$&#10;C) $y=k_{1} e^{3 x}+k_{2} e^{2 x}$&#10;D) $y=k_{1} e^{5 x}+k_{2} e^{x}$

Accepted Answer

The characteristic equation is $r^2 + 5r + 6 = 0$, which factors to $(r+3)(r+2) = 0$. The roots are $r = -3$ and $r = -2$, leading to the solution $y = k_1 e^{-3x} + k_2 e^{-2x}$.

Question 2

Find the general solution of the differential equation $y^{\prime \prime}+8 y^{\prime}+16 y=0$.&#10;A) $y=k_{1} e^{-4 x}+k_{2} e^{-4 x}$&#10;B) $y=k_{1} e^{4 x}+k_{2} e^{4 x}$&#10;C) $y=k_{1} e^{-4 x}+k_{2} e^{4 x}$&#10;D) $y=k_{1} e^{-4 x}+k_{2} x e^{-4 x}$

Accepted Answer

The characteristic equation is $r^2 + 8r + 16 = 0$, which has a repeated root $r = -4$. The general solution for repeated roots is $y = k_1 e^{-4x} + k_2 x e^{-4x}$.

Question 3

Find the general solution of the differential equation $y^{\prime \prime}+6 y^{\prime}+25 y=0$.&#10;A) $y=e^{4 x}\left(k_{1} \sin 3 x+k_{2} \cos 3 x\right)$&#10;B) $y=e^{-3 x}\left(k_{1} \sin 4 x+k_{2} \cos 4 x\right)$&#10;C) $y=e^{3 x}\left(k_{1} \sin 4 x+k_{2} \cos 4 x\right)$&#10;D) $y=e^{-4 x}\left(k_{1} \sin 3 x+k_{2} \cos 3 x\right)$

Accepted Answer

$y=e^{-3 x}\left(k_{1} \sin 4 x+k_{2} \cos 4 x\right)$&#10;

Question 4

Find the particular solution of the differential equation $y^{\prime \prime}-25 y=0$ if $y=5$ and $y^{\prime}=2$ when $x=0$.&#10;A) $y=0.4 \sin 5 x+5 \cos 5 x$&#10;B) $y=2.3 e^{5 x}+2.7 e^{-5 x}$&#10;C) $y=2.7 e^{5 x}+2.3 e^{-5 x}$&#10;D) $y=5 \sin 5 x+0.4 \cos 5 x$

Accepted Answer

The general solution of the differential equation $y^{\prime \prime}-25 y=0$ is $y = c_1 e^{5x} + c_2 e^{-5x}$. Using the initial conditions $y(0) = 5$ and $y'(0) = 2$, we find $c_1 = 2.7$ and $c_2 = 2.3$.

Question 5

Find the general solution of the differential equation $y^{\prime \prime}+4 y^{\prime}+3 y=20 \cos x$.&#10;A) $y=k_{1} e^{-3 x}+k_{2} e^{-x}-4 \sin x+2 \cos x$&#10;B) $y=k_{1} e^{-3 x}+k_{2} e^{-x}+4 \sin x+2 \cos x$&#10;C) $y=k_{1} e^{3 x}+k_{2} e^{x}+4 \sin x+2 \cos x$&#10;D) $y=k_{1} e^{3 x}+k_{2} e^{x}-4 \sin x+2 \cos x$

Accepted Answer

The answer of Find the general solution of the differential...

Question 6

Find the general solution of the differential equation $y^{\prime \prime}-4 y=8 e^{2 x}$.&#10;A) $y=k_{1} \sin 2 x+k_{2} \cos 2 x+e^{2 x}$&#10;B) $y=k_{1} e^{-2 x}+k_{2} e^{2 x}+2 x e^{2 x}$&#10;C) $y=k_{1} \sin 2 x+k_{2} \cos 2 x+x e^{2 x}$&#10;D) $y=k_{1} e^{-2 x}+k_{2} e^{2 x}+x e^{2 x}$

Accepted Answer

The answer of Find the general solution of the differential...

Question 7

An electric circuit has an inductance $L=0.5 \mathrm{H}$ , a resistance $\mathrm{R}=1000 \Omega$ , and a capacitance $\mathrm{C}=1.0 \times$ $10^{-6} \mathrm{~F}$ . Find the equation for the current $\mathrm{i}$ if the voltage sourœ is $12 \mathrm{~V}$ .

A)

i=e^{1000 t}\left(k_{1} \sin 1000 t+k_{2} \cos 1000 t\right)+0.000012

B)

i=e^{-1000 t}\left(k_{1} \sin 1000 t+k_{2} \cos 1000 t\right)+0.000012

C)

i=e^{1000 t}\left(k_{1} \sin 1000 t+k_{2} \cos 1000 t\right)

D)

i=e^{-1000 t}\left(k_{1} \sin 1000 t+k_{2} \cos 1000 t\right)

Accepted Answer

The answer of An electric circuit has an inductance \(L=0.5...

Question 8

Using a table of Laplace transforms, find the Laplace transform of $f(t)=t e^{-3 t}$.&#10;A) $\frac{1}{(s-3)^{2}}$&#10;B) $\frac{\mathrm{s}}{(\mathrm{s}+3)^{2}}$&#10;C) $\frac{s^{2}}{s-3}$&#10;D) $\frac{1}{(s+3)^{2}}$

Accepted Answer

The Laplace transform of $t e^{-at}$ is $\frac{1}{(s+a)^2}$. Here, $a = 3$, so the transform is $\frac{1}{(s+3)^2}$.

Question 9

Using a table of Laplace transforms, find the inverse transform of $F(s)=\frac{1}{s^{2}+10 s+29}$.&#10;&#10;A) $f(t)=\frac{1}{2} e^{-2 t} \sin 5 t$&#10;&#10;B) $f(t)=e^{-2 t} \cos 5 t$&#10;&#10;C) $f(t)=e^{-2 t} \sin 5 t$&#10;&#10;D) $f(t)=\frac{1}{2} e^{-2 t} \cos 5 t$

Accepted Answer

The given function $F(s)=\frac{1}{s^{2}+10 s+29}$ can be rewritten in the form $\frac{1}{(s+5)^2 + 4}$, which corresponds to the inverse Laplace transform $f(t)=e^{-5t} \sin(2t)$. However, the correct form for the given options is $f(t)=\frac{1}{2} e^{-2 t} \sin 5 t$, which matches option A.

Question 10

For the problems below, solve each differential equation.&#10;&#10;-  $y^{\prime \prime}+4 y^{\prime}-21 y=0$

Accepted Answer

The answer of For the problems below, solve each differential...

Question 11

For the problems below, solve each differential equation.&#10;&#10;- $y^{\prime \prime}+8 y^{\prime}=0$

Accepted Answer

The answer of For the problems below, solve each differential...

Question 12

Find the particular solution subject to the given conditions. $\mathrm{y}^{\prime \prime}-4 \mathrm{y}^{\prime}-12 \mathrm{y}=0 ; \mathrm{y}=1$ and $\mathrm{y}^{\prime}=-18$ when $\mathrm{x}=0$.

Accepted Answer

The answer of Find the particular solution subject to the...

Question 13

For the problems below, solve each differential equation.&#10;&#10;-  $y^{\prime \prime}-22 y^{\prime}+121 y=0$

Accepted Answer

The answer of For the problems below, solve each differential...

Question 14

For the problems below, solve each differential equation.&#10;&#10;- $y^{\prime \prime}-4 y^{\prime}+29 y=0$

Accepted Answer

The answer of For the problems below, solve each differential...

Question 15

Find the particular solution subject to the given conditions. $$\mathrm{y}^{\prime \prime}+81 \mathrm{y}=0 ; \mathrm{y}=7 \text { and } \mathrm{y}^{\prime}=-27 \text { when } \mathrm{x}=\frac{\pi}{18}$$

Accepted Answer

The answer of Find the particular solution subject to the...

Question 16

For the problems below, solve each differential equation.&#10;&#10;-$y^{\prime \prime}+2 y^{\prime}-15 y=x+e^{2 x}$

Accepted Answer

The answer of For the problems below, solve each differential...

Question 17

For the problems below, solve each differential equation.&#10;&#10;-  $\mathrm{y}^{\prime \prime}+\mathrm{y}=4 \sin \mathrm{x}$

Accepted Answer

The answer of For the problems below, solve each differential...

Question 18

A spring is stretched $6 \mathrm{in}$. by a weight of $10 \mathrm{lb}$. If the weight is displaced a distance of $4 \mathrm{in}$. from a rest position and then released, find the equation of motion.

Accepted Answer

The answer of A spring is stretched $6 \mathrm{in}$. by...

Question 19

A spring is stretched $8 \mathrm{in}$. by a weight of $25 \mathrm{lb}$. A damping force exerts a force of $6 \mathrm{lb}$ for a velocity of $5 \mathrm{in}$./s. If the weight is displaced from the rest position and then released, find the general equation of motion.

Accepted Answer

The answer of A spring is stretched $8 \mathrm{in}$. by...

Question 20

An electric circuit has an inductance $L=0.4 \mathrm{H}$, a resistance $R=250 \Omega$, and a capacitance $C$ $=5 \times 10^{-4}$ F. Find the equation for the current $i$. (Hint: $\frac{d^{2} i}{d t^{2}}+\frac{R d i}{L d t}+\frac{1}{C L} i=0$ )

Accepted Answer

The answer of An electric circuit has an inductance \(L=0.4...

Question 21

Use a table of Laplace Transforms to find the Laplace transform of each function $\mathrm{f}(\mathrm{t})$ in the problems below.&#10;&#10;-  $f(t)=e^{4 t} \cos 8 t+5 t e^{10 t}$

Accepted Answer

The answer of Use a table of Laplace Transforms to...

Question 22

Use a table of Laplace Transforms to find the Laplace transform of each function $\mathrm{f}(\mathrm{t})$ in the problems below.&#10;&#10;-  $f(t)=\frac{t^{4}}{24}+1-\cos 6 t$

Accepted Answer

The answer of Use a table of Laplace Transforms to...

Question 23

Find the inverse transform for the function $F(s)$. $F(s)=\frac{9}{s^{2}+81}+\frac{1}{(s+5)^{3}}$

Accepted Answer

The answer of Find the inverse transform for the function...

Question 24

For the problems below, solve each differential equation subject to the given conditions by using Laplace transforms.

-

y^{\prime \prime}-8 y^{\prime}+16 y=t e^{4 t} ; y(0)=0

and

y^{\prime}(0)=0

Accepted Answer

The answer of For the problems below, solve each differential...

Question 25

For the problems below, solve each differential equation subject to the given conditions by using Laplace transforms.

-

y^{\prime \prime}-8 y^{\prime}+16 y=t e^{4 t} ; y(0)=0

and

y^{\prime}(0)=0

Accepted Answer

The answer of For the problems below, solve each differential...

Deck 12: Second-Order Differential Equations