Solve system of equations matrix Calculator

4) Several matrix operations as calculate inverse, determinants, eigenvalues, diagonalize, LU decomposition in matrix with real or complex values

5) Sum, multiply, divide Matrix.

Inputs

1) Enter the coefficient matrix in the table labeled "Matrix A", note that in the right menu you can add rows and columns using the "Add Column" or delete the option "Delete column"
2) Enter the coefficients vector in the table labeled "Vector B", note that in the right menu you can add dimensions to this vector "Add Column" or delete the option "Delete column"

Outputs

To calculate the determinant of the matrix A, click the menu option "Determinant"

To calculate the inverse of the matrix, click the menu option "Invert"

To calculate the the matrix A eigenvalues, basis of eigenvectors and the diagonal form click the menu option "Eigenvalues".
To calculate the Jordan canonical form click in "Jordan Form".
To calculate the LU factorization of A form click in "LU Decomposition".
To the matrix sum, click on button "Other Matrix", a new window will open to input other matrix to multiply, sum or divide by A.

Final comments

Instructions: Use this calculator to find the matrix representation of a given system of equations that you provide. Please specify a system of linear equation, by first adjusting the dimension, if needed.

Then, fill out the coefficients associated to all the variables and the right hand size, for each of the equations. If a variable is not present in one specific equation, type "0" or leave it empty.

x   +  y   +  z   +  u   +  v   =  
x   +  y   +  z   +  u   +  v   =  
x   +  y   +  z   +  u   +  v   =  
x   +  y   +  z   +  u   +  v   =  
x   +  y   +  z   +  u   +  v   =  

More about this System of Equations to Matrix form Calculator System of Equations to Matrix form convert system to matrix (adsbygoogle = window.adsbygoogle || []).push({}); Home > Matrix & Vector calculators > Solving systems of linear equations using Inverse Matrix method calculatorMethod and examplesMethod`[[2,3,1],[0,5,6],[1,1,2]]``[[2,1,-1],[1,0,-1],[1,1,2]]``[[3,1,1],[-1,2,1],[1,1,1]]``[[2,3],[4,10]]``[[5,1],[4,2]]``[[6,3],[4,5]]`MethodSolving systems of linear equations usingInverse Matrix methodEnter Equations line by line like2x+5y=163x+y=11Or2, 5, 163, 1, 11Or(8-18.1906i), (-2+13.2626i), 100(2-13.2626i), (1+14.7706i), 0Initial / Start value = ( )w =`2x+y+z=5,3x+5y+2z=15,2x+y+4z=8``2x+5y=16,3x+y=11``2x+5y=21,x+2y=8``2x+y=8,x+2y=1``2x+3y-z=5,3x+2y+z=10,x-5y+3z=0``x+y+z=3,2x-y-z=3,x-y+z=9``x+y+z=7,x+2y+2z=13,x+3y+z=13``2x-y+3z=1,-3x+4y-5z=0,x+3y-6z=0`Click here to Find the value of h,k for which the system of equations has a Unique or Infinite or no solution calculator SolutionSolution provided by AtoZmath.comShare this solution or page with your friends. Does Photomath solve systems of equations?