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Download Matrix Calculator Pro v5 1 Dave3737

Download Matrix Calculator Pro v5 1 Dave3737
Title: Matrix Calculator Pro v5 1
Category: PC Software
Language: English
Size: 624.5 KB
Rating: 4.3


  • info.txt (8.0 KB)
  • h33t - Dave 3737 Torrent list.URL (0.1 KB)
  • tracked_by_h33t_com.txt (0.0 KB)

Matrix addition, multiplication, inversion, determinant and rank calculation, transposing, bringing to diagonal . With help of this calculator you can: find the matrix determinant, the rank, raise the matrix to a power, find the sum and the multiplication of matrices, calculate the inverse matrix.

Matrix addition, multiplication, inversion, determinant and rank calculation, transposing, bringing to diagonal, triangular form, exponentiation, solving of systems of linear equations with solution steps. Leave extra cells empty to enter non-square matrices. You can use decimal (finite and periodic) fractions: 1/3, . 4, -. (56), or . e-4; or arithmetic expressions: 2/3+3 (10-4), (1+x)/y^2, 2^., 2^(1/3), 2^n, or sin(phi).

Matrix Calculator PRO What's new in . . 3D touch support to enable in day/night mode - it's generally faster. PRO. Matrix Calculator.

com is the most convenient free online Matrix Calculator. All the basic matrix operations as well as methods for solving systems of simultaneous linear equations are implemented on this site. For methods and operations that require complicated calculations a 'very detailed solution' feature has been made. With the help of this option our calculator solves your task efficiently as the person would do showing every step. The key feature of our matrix calculator is the ability to use complex numbers in any method.

o-5 4 Torrent Download TorrentUs Matrix Calculator Free is an easy, fast and powerful tool for various matrix operations. Matrix Calculator Pro Crack, Serial & Keygen Free Matrix calculator is a practical math tool to calculator real matrix and complex matrix. As you see, it's easy, various, and effectual.

It's PRO-version of matrix calculator. Its main task – calculate mathematical matrices. The application can work with: - Integers (-2, -1, 0, 1, 2 et. Decimal fractions (., . 4 et. Supported matrix operations: - Matrix Inverse. Common fractions (1/2, 3/4, 7/3 et. Complex numbers (i, 1+i, 1/2-2i, . +2/3i et. Tags: matrix calculator, matrix calc, matrix operation, matrixcalc.

Matrix calculator Pro is a practical math tool to calculate matrix. Matrix Calculator Pro. Free to try HAN Software Windows a/Server 2008/7 Version . Full Specs. Its functions include: matrix inverse, matrix. Download Now Secure Download.

Matrix calculator " is a practical math tool to calculate real matrice or complex matrice. txt (. KB). h33t - Dave 3737 Torrent list. URL (. tracked by h33t com.

Download Matrix math calculator Pro and enjoy it on your iPhone, iPad and iPod touch. Matrix math calculator Pro 4+. camilo arcila. A spectacular application in which you can do operations with matrices, such as Addition, Subtraction and Multiplication. In addition you can also find the Transposed matrix, Adjoint matrix, Inverse matrix, Determinant and Rank of a matrix.


Matrix Calculator Pro v5.1
Protection .. : Serial
Language... : English
OS .......... : WinALL
Date ...... : 03/02/10
Type ...... : Key.reg
Url ......... : http://www.luckhan.com
Advanced Features:
Variety of matrix calculation.
Support real matrix and complex matrix.
Support ploar format.
Add the function of Auto.
Manage (save or open) the file with the project file *.mtx.
To get the result only need to click one button.
Support for ALL Windows OS.
" Matrix calculator " is a practical math tool to calculate real matrice or complex matrice. As you see, it's easy, various, and effectual. Download and try it.
* Matrix inverse.
* Matrix transpose.
* Largest component.
* Smallest component.
* Matrix or vector norm.
* Dimension.
* Sum of diagonal elements.
* Determinant.
* Matrix rank.
* Eigenvalues.
* QR factorization. Orthogonal-triangular decomposition.
* LU factorization.
* Cholesky factorization.
* Singular value decomposition.
* <+> Plus.
* <-> Minus.
* <*> Matrix multiply.
* <.*> Array multiply.
* Slash or right matrix divide.
* <./> Right array divide.
* <&> Element-wise logical AND.
* <|> Element-wise logical OR.
* <#> Logical EXCLUSIVE OR
* <^> Matrix power
How to use it?
Step1: Input Matrix A or B in the left panel,? according to the format showed in the interface;
Step2: Input coefficient x and select precision when necessary, otherwise they equal to the default values.
Step3:Put one of the expression buttons in the middle panel to calculate. The results will be shown in the right panel.
Support Polar format?
How to input complex matrix?
How to calculate complex matrix?
You can input complex number such as 3+i, 3+3i,-3.4i, etc. But not 3+3*i, 3i+3, etc.
For example: Matrix A=
1 -2i 3+i
2 1+i 1-i
i 3.2 14i
Then inv(A)=
0.433-0.182i 0.352+0.077i 0.028+0.136i
-0.215+0.475i 0.062-0.204i -0.067-0.09i
-0.139-0.036i 0.021+0.009i 0.019-0.097i
Polar format is also supported!
Matrix A=
1 2(-90) 3.162(18.435)
2 1.414 1.414(-45)
1 3.2 14
Click 'Complex Format' to choose the format of complex or polar.
Invertible matrix
In linear algebra, an n-by-n (square) matrix A is called invertible or nonsingular or nondegenerate if there exists an n-by-n matrix B such that
where In denotes the n-by-n identity matrix and the multiplication used is ordinary matrix multiplication. If this is the case, then the matrix B is uniquely determined by A and is called the inverse of A, denoted by A-1. It follows from the theory of matrices that if
for square matrices A and B, then also
Non-square matrices (m-by-n matrices for which m ? n) do not have an inverse. However, in some cases such a matrix may have a left inverse or right inverse. If A is m-by-n and the rank of A is equal to n, then A has a left inverse: an n-by-m matrix B such that BA = I. If A has rank m, then it has a right inverse: an n-by-m matrix B such that AB = I.
A square matrix that is not invertible is called singular or degenerate. A square matrix is singular if and only if its determinant is 0. Singular matrices are rare in the sense that if you pick a random square matrix, it will almost surely not be singular.
While the most common case is that of matrices over the real or complex numbers, all these definitions can be given for matrices over any commutative ring. However, in this case the condition for a square matrix to be invertible is that its determinant is invertible in the ring, which in general is a much stricter requirement than being nonzero.
Matrix inversion is the process of finding the matrix B that satisfies the prior equation for a given invertible matrix A.
LU decomposition
In linear algebra, the LU decomposition is a matrix decomposition which writes a matrix as the product of a lower triangular matrix and an upper triangular matrix. The product sometimes includes a permutation matrix as well. This decomposition is used in numerical analysis to solve systems of linear equations or calculate the determinant.
Let A be a square matrix. An LU decomposition is a decomposition of the form
where L and U are lower and upper triangular matrices (of the same size), respectively. This means that L has only zeros above the diagonal and U has only zeros below the diagonal.
An LDU decomposition is a decomposition of the form
where D is a diagonal matrix and L and U are unit triangular matrices, meaning that all the entries on the diagonals of L and U are one.
An LUP decomposition (also called a LU decomposition with partial pivoting) is a decomposition of the form
where L and U are again lower and upper triangular matrices and P is a permutation matrix, i.e., a matrix of zeros and ones that has exactly one entry 1 in each row and column.
An LU decomposition with full pivoting (Trefethen and Bau) takes the form
Above we required that A be a square matrix, but these decompositions can all be generalized to rectangular matrices as well. In that case, L and P are square matrices which each have the same number of rows as A, while U is exactly the same shape as A. Upper triangular should be interpreted as having only zero entries below the main diagonal, which starts at the upper left corner.
Matrix multiplication
In mathematics, matrix multiplication is the operation of multiplying a matrix with either a scalar or another matrix. This article gives an overview of the various ways to perform matrix multiplication.
The ordinary matrix product is the most often used and the most important way to multiply matrices. It is defined between two matrices only if the width of the first matrix equals the height of the second matrix. Multiplying an m×n matrix with an n×p matrix results in an m×p matrix. If many matrices are multiplied together, and their dimensions are written in a list in order, e.g. m×n, n×p, p×q, q×r, the size of the result is given by the first and the last numbers (m×r), and the values surrounding each comma must match for the result to be defined. The ordinary matrix product is not commutative.
The first coordinate in matrix notation denotes the row and the second the column; this order is used both in indexing and in giving the dimensions. The element Xij at the intersection of row i and column j of the product matrix is the dot product (inner product) of row i of the first matrix and column j of the second matrix. This explains why the width and the height of the matrices being multiplied must match: otherwise the dot product is not defined.
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Dave3737 h33t user details torrent link php.
tracked_by_h33t_com txt.
Matrix Calculator Pro v5.1 Rar
Matrix Calculator Pro v5.1 Info.txt

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