To explain the theory behind matrices.

To demonstrate the use of a TI calculator for matrix conversion.

To compare different types of calculators.

To teach how to solve matrices by hand.

Edit

Calc

Stat

Graph

2x2

3x4

2x3

3x3

All elements are integers

A diagonal of ones with zeros below

All zeros in the matrix

No zeros in the matrix

The inverse of the matrix

The determinant of the matrix

The eigenvalues of the matrix

The solution to the system of equations

2x3

4x4

3x3

3x4

Z term

X term

Y term

Constant term

It requires less computation.

It uses fewer matrix operations.

It is easier to enter into the calculator.

It provides a direct solution without back substitution.

X = 1, Y = 2, Z = 3

X = -2, Y = -1, Z = 3

X = 0, Y = 1, Z = -1

X = 3, Y = -4, Z = 2

It eliminates the need for understanding matrices.

It is faster than manual calculations but less accurate.

It automates the process but requires interpretation of results.

It simplifies the understanding of matrix theory.