!! used as default html header if there is none in the selected theme. OEF matrices

OEF matrices --- Introduction ---

This module actually contains 49 exercises of various styles on matrices.

Example matrix 2x2

Find a matrix $A={pmatrix}a&b c&d{pmatrix} $ such that trace$(A)=$ et $(A)=$, and none of the elements $a,b,c,d$ is zero.

Column and row 2x3

We have a multiplication of matrices What are the values of $x$ and $y$ ?

Column and row 3x3 I

We have a multiplication of matrices What are the values of and ?

Column and row 3x3 II

Determinant and rank

Let and be two matrices ×, such that and . Then

(You should put the most relevant reply.)

Det & trace 2x2

Compute the determinant and the trace of the matrix

Det & trace 3x3

Compute the determinant and the trace of the matrix

Diagonal multiplication 2x2

Does there exist a diagonal matrix $D$ such that

Left division 2x2

Determine the matrix $A={pmatrix}a&b c&d{pmatrix} $ such that

Right division 2x2

Determine the matrix such that

Equation 2x2

Suppose that a matrix satisfies the equation . Determine the inverse matrix in function of a,b,c,d.

More exactly, each coefficient of must be a polynomial of degree 1 in a,b,c,d.

Formula of entries 2x2

Let C=(c_ij) the matrix 2×2 whose entries are defined by

c_ij = .

Formula of entries 3x3

Let the matrix 3×3 whose entries are defined by

Formula of entries 3x3 II

Let

= (				)

be a 3×3 matrix whose entries are defined by a linear formula c_i,j=f(i,j)=ai+bj+c.

Determine the function .

Given images 2x2

We have a 2×2 matrix , such that

,
. , .

Determine .

Given images 2x3

We have a matrix , such that

,
,
. , , .

Determine .

Given images 3x2

We have a matrix , such that

,
. , .

Determine .

Given images 3x3

We have a 3×3 matrix , such that

,
,
. , , .

Determine .

Given powers 3x3

We have a matrix , with

, .

What is ?

Given products 3x3

We have two matrices and , with

, .

What are and ?

Matrix operations

Consider two matrices

Does make sense?
Does make sense?
Does make sense?
Does make sense?
Does make sense?

Min rank A^2

Let A be a matrix ×, of rank . What is the minimum of the rank of the matrix ?

Multiplication of 3

We have 3 matrices, , , , whose dimensions are as follows.

Matrix	A	B	C
Dimension	×	×	×
Rows
Columns

Give an order of multiplication of these 3 matrices that makes sense.

In this case, what is the dimension of the matrix product? × rows and columns.

Multiplication 2x2

Compute the product of matrices:

Partial multiplication 3x3

We have an equation of multiplication of matrices × as follows, where the question marks represent unknown coefficients.

Step 1. There is only one determinable coefficient in the product matrix. It is .
(Type c11 for for example.) Step 2. The determinable coefficient is = .

Partial multiplication 4x4

We have an equation of multiplication of matrices × as follows, where the question marks represent unknown coefficients.

Step 1. There is only one determinable coefficient in the product matrix. It is .
(Type c11 for for example.) Step 2. The determinable coefficient is = .

Partial multiplication 5x5

We have an equation of multiplication of matrices × as follows, where the question marks represent unknown coefficients.

Step 1. There is only one determinable coefficient in the product matrix. It is .
(Type c11 for for example.) Step 2. The determinable coefficient is = .

Sizes and multiplication

Consider two matrices and , with

, and .

What is the size of ?

Reply: has rows and columns.

Parametric matrix 2x2

Find the values of the parameters $s$ and $t$ such that the matrix verifies .