7.12 problem 1602 (6.12)

Internal problem ID [9924]
Internal file name [OUTPUT/8871_Monday_June_06_2022_05_43_09_AM_50979825/index.tex]

Book: Differential Gleichungen, E. Kamke, 3rd ed. Chelsea Pub. NY, 1948
Section: Chapter 6, non-linear second order
Problem number: 1602 (6.12).
ODE order: 2.
ODE degree: 1.

The type(s) of ODE detected by this program : "second_order_ode_missing_x", "second_order_ode_can_be_made_integrable"

Maple gives the following as the ode type

[[_2nd_order, _missing_x], [_2nd_order, _reducible, _mu_x_y1]]

\[ \boxed {y^{\prime \prime }+6 a^{10} y^{11}-y=0} \]

7.12.1 Solving as second order ode can be made integrable ode

Multiplying the ode by \(y^{\prime }\) gives \[ y^{\prime } y^{\prime \prime }+\left (6 a^{10} y^{10}-1\right ) y^{\prime } y = 0 \] Integrating the above w.r.t \(x\) gives \begin {align*} \int \left (y^{\prime } y^{\prime \prime }+\left (6 a^{10} y^{10}-1\right ) y^{\prime } y\right )d x &= 0 \\ \frac {{y^{\prime }}^{2}}{2}+\frac {a^{10} y^{12}}{2}-\frac {y^{2}}{2} = c_2 \end {align*}

Which is now solved for \(y\). Solving the given ode for \(y^{\prime }\) results in \(2\) differential equations to solve. Each one of these will generate a solution. The equations generated are \begin {align*} y^{\prime }&=\sqrt {-a^{10} y^{12}+y^{2}+2 c_{1}} \tag {1} \\ y^{\prime }&=-\sqrt {-a^{10} y^{12}+y^{2}+2 c_{1}} \tag {2} \end {align*}

Now each one of the above ODE is solved.

Solving equation (1)

Integrating both sides gives \begin {align*} \int _{}^{y}\frac {1}{\sqrt {-\textit {\_a}^{12} a^{10}+\textit {\_a}^{2}+2 c_{1}}}d \textit {\_a} = x +c_{2} \end {align*}

Solving equation (2)

Integrating both sides gives \begin {align*} \int _{}^{y}-\frac {1}{\sqrt {-\textit {\_a}^{12} a^{10}+\textit {\_a}^{2}+2 c_{1}}}d \textit {\_a} = x +c_{3} \end {align*}

7.12.2 Solving as second order ode missing x ode

This is missing independent variable second order ode. Solved by reduction of order by using substitution which makes the dependent variable \(y\) an independent variable. Using \begin {align*} y' &= p(y) \end {align*}

Then \begin {align*} y'' &= \frac {dp}{dx}\\ &= \frac {dy}{dx} \frac {dp}{dy}\\ &= p \frac {dp}{dy} \end {align*}

Hence the ode becomes \begin {align*} p \left (y \right ) \left (\frac {d}{d y}p \left (y \right )\right )+y \left (6 a^{10} y^{10}-1\right ) = 0 \end {align*}

Which is now solved as first order ode for \(p(y)\). In canonical form the ODE is \begin {align*} p' &= F(y,p)\\ &= f( y) g(p)\\ &= -\frac {y \left (6 a^{10} y^{10}-1\right )}{p} \end {align*}

Where \(f(y)=-y \left (6 a^{10} y^{10}-1\right )\) and \(g(p)=\frac {1}{p}\). Integrating both sides gives \begin{align*} \frac {1}{\frac {1}{p}} \,dp &= -y \left (6 a^{10} y^{10}-1\right ) \,d y \\ \int { \frac {1}{\frac {1}{p}} \,dp} &= \int {-y \left (6 a^{10} y^{10}-1\right ) \,d y} \\ \frac {p^{2}}{2}&=-\frac {1}{2} a^{10} y^{12}+\frac {1}{2} y^{2}+c_{1} \\ \end{align*} The solution is \[ \frac {p \left (y \right )^{2}}{2}+\frac {a^{10} y^{12}}{2}-\frac {y^{2}}{2}-c_{1} = 0 \] For solution (1) found earlier, since \(p=y^{\prime }\) then we now have a new first order ode to solve which is \begin {align*} \frac {{y^{\prime }}^{2}}{2}+\frac {a^{10} y^{12}}{2}-\frac {y^{2}}{2}-c_{1} = 0 \end {align*}

Solving the given ode for \(y^{\prime }\) results in \(2\) differential equations to solve. Each one of these will generate a solution. The equations generated are \begin {align*} y^{\prime }&=\sqrt {-a^{10} y^{12}+y^{2}+2 c_{1}} \tag {1} \\ y^{\prime }&=-\sqrt {-a^{10} y^{12}+y^{2}+2 c_{1}} \tag {2} \end {align*}

Now each one of the above ODE is solved.

Solving equation (1)

Integrating both sides gives \begin {align*} \int _{}^{y}\frac {1}{\sqrt {-\textit {\_a}^{12} a^{10}+\textit {\_a}^{2}+2 c_{1}}}d \textit {\_a} = x +c_{2} \end {align*}

Solving equation (2)

Integrating both sides gives \begin {align*} \int _{}^{y}-\frac {1}{\sqrt {-\textit {\_a}^{12} a^{10}+\textit {\_a}^{2}+2 c_{1}}}d \textit {\_a} = x +c_{3} \end {align*}

`Methods for second order ODEs: 
--- Trying classification methods --- 
trying 2nd order Liouville 
trying 2nd order WeierstrassP 
trying 2nd order JacobiSN 
differential order: 2; trying a linearization to 3rd order 
trying 2nd order ODE linearizable_by_differentiation 
trying 2nd order, 2 integrating factors of the form mu(x,y) 
trying differential order: 2; missing variables 
`, `-> Computing symmetries using: way = 3 
`, `-> Computing symmetries using: way = exp_sym 
-> Calling odsolve with the ODE`, (diff(_b(_a), _a))*_b(_a)+6*a^10*_a^11-_a = 0, _b(_a)`   *** Sublevel 2 *** 
   Methods for first order ODEs: 
   --- Trying classification methods --- 
   trying a quadrature 
   trying 1st order linear 
   trying Bernoulli 
   <- Bernoulli successful 
<- differential order: 2; canonical coordinates successful 
<- differential order 2; missing variables successful`
 

✓ Solution by Maple

Time used: 0.469 (sec). Leaf size: 61

dsolve(diff(diff(y(x),x),x)+(5+1)*a^(2*5)*y(x)^(2*5+1)-y(x)=0,y(x), singsol=all)
 

\begin{align*} \int _{}^{y \left (x \right )}\frac {1}{\sqrt {-\textit {\_a}^{12} a^{10}+\textit {\_a}^{2}+c_{1}}}d \textit {\_a} -x -c_{2} &= 0 \\ -\left (\int _{}^{y \left (x \right )}\frac {1}{\sqrt {-\textit {\_a}^{12} a^{10}+\textit {\_a}^{2}+c_{1}}}d \textit {\_a} \right )-x -c_{2} &= 0 \\ \end{align*}

✓ Solution by Mathematica

Time used: 10.264 (sec). Leaf size: 49

DSolve[-y[x] + a^(2*5)*(1 + 5)*y[x]^(1 + 2*5) + y''[x] == 0,y[x],x,IncludeSingularSolutions -> True]
 

\[ \text {Solve}\left [\int _1^{y(x)}\frac {1}{\sqrt {c_1+2 \left (\frac {K[1]^2}{2}-\frac {1}{2} a^{10} K[1]^{12}\right )}}dK[1]{}^2=(x+c_2){}^2,y(x)\right ] \]