Math Problems and solutions
Attention! If a subsection is selected, then the search will be performed in it!
11.5.4.17 With constant coefficients
2.55 $
11.5.4.18 With constant coefficients
3.31 $
11.5.4.19 With constant coefficients
11.5.4.20 With constant coefficients
3.82 $
11.5.4.21 With constant coefficients
6.37 $
11.5.4.22 With constant coefficients
11.5.4.23 With constant coefficients
2.04 $
11.5.4.24 With constant coefficients
11.5.4.3 With constant coefficients
5.1 $
![Problem: Find the general solution of the equation, bringing it to canonical form: \[ 48 u_{x x}+16 u_{x y}+u_{y y}=0 . \]](/storage/uploads/task_mls/1198/en/11.5.4.17.png){kind=link}
![Problem: Find the general solution of the equation, bringing it to canonical form: \[ 49 u_{x x}+28 u_{x y}+3 u_{y y}=0 . \]](/storage/uploads/task_mls/1199/en/11.5.4.18.png){kind=link}
![Problem: Find the general solution of the equation, bringing it to canonical form: \[ u_{x x}-4 u_{x y}+4 u_{y y}+3 u_{x}-6 u_{y}=0 . \]](/storage/uploads/task_mls/1200/en/11.5.4.19.png){kind=link}
![Problem: Find the particular solution of the second order partial differential equation satisfying the given conditions: \[ \begin{array}{l} z_{x x}+2 z_{x y}-3 z_{y y}+z_{\mathrm{x}}-z_{y}=0, \\ z(0, y)=y, \quad z_{\mathrm{x}}(0, y)=0 . \end{array} \]](/storage/uploads/task_mls/1201/en/11.5.4.20.png){kind=link}
![Problem: - Find the general formula for solving the problem with given data on the curve; - define and depict on the plane the area in which the classical solution exists and is unique for any initial data: - if the data is given on both branches of the hyperbola, - if the data is given on the branch of the hyperbola, indicated in the table, - if the data is specified on the fragment of this branch, specified in the table; - find the solution for the initial data, given in the table; - determine whether this solution continues beyond the found areas and is unique there. \[ \begin{array}{l} u_{x y}-u_{y y}=0 .\left\{\begin{array}{l} \left.u\right|_{\Gamma}=\varphi(x) \\ \left.u_{x}\right|_{\Gamma}=\psi(x) \end{array} \quad \Gamma: x(x+y)=-1,\right. \\ \left\{\begin{array}{ll} \varphi(x)=x-1 & \text { the lower branch } \\ \psi(x)=-1 & \text { the fragment } x \in[3,4] \end{array}\right. \\ \end{array} \]](/storage/uploads/task_mls/1202/en/11.5.4.21.png){kind=link}
![Problem: Bring the second order linear partial differential equation to canonical form. \[ \frac{\theta^{2} u}{\theta x^{2}}+2 \frac{\theta^{2} u}{\theta x \theta y}+4 \frac{\theta^{2} u}{\theta y^{2}}=-2 \frac{\theta u}{\theta x}-3 \frac{\theta u}{\theta y} . \]](/storage/uploads/task_mls/1203/en/11.5.4.22.png){kind=link}
![Problem: Bring the second order linear partial differential equation to canonical form. \[ \frac{\theta^{2} u}{\theta x^{2}}-2 \frac{\theta^{2} u}{\theta x \theta y}+\frac{\theta^{2} u}{\theta y^{2}}+\frac{\theta u}{\theta x}+\frac{\theta u}{\theta y}+u=0 . \]](/storage/uploads/task_mls/1204/en/11.5.4.23.png){kind=link}
![Problem: Determine the type of the first order partial differential equation and bring it to canonical form: \[ 2 u_{x x}+3 u_{x y}+u_{y y}+7 u_{x}+4 u_{y}-2 u=0 . \]](/storage/uploads/task_mls/1205/en/11.5.4.24.png){kind=link}
![Problem: Find the general solution of the equation, bringing it to canonical form. \[ u_{x x}+2 u_{x y}+u_{y y}-7 u_{x}-3 u_{y}=0 \]](/storage/uploads/task_mls/3979/en/11.5.4.3.png){kind=link}