Let A = 0 - 2 2 0 . If M and N are two matrices given by M = ∑ k = 1 10 A 2 k and N = ∑ k = 1 10 A 2 k - 1 then M N 2 is

a non-identity symmetric matrix

neither symmetric nor skew-symmetric matrix

Let A = a 11 a 12 a 13 a 21 a 22 a 23 a 31 a 32 a 33 whose entries are real numbers. Which of the following statements is ALWAYS TRUE?

If A is skew-symmetric, then a 12 + a 11 + a 21 = 0

If A is symmetric, then a 21 + a 21 = 0

If A is symmetric, then a i i = 0 for all possible values of i

If A is symmetric, then a i i is positive for all possible value of i

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A skew symmetric matrix $S$ satisfies the relation $S^{2} + I = 0$ , where $I$ is a unit matrix, then $S S^{'}$ is (where $S^{'}$ is transpose of $S$ )

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Important Questions on Matrices

EASY

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

A, B

are symmetric matrices of the same order, then

A B - B A

is a

HARD

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

Let

A = [\begin{array}{l} 2 & 3 \\ a & 0 \end{array}], a \in R

be written as

P + Q

where

P

is a symmetric matrix and

Q

is skew symmetric matrix. If

det (Q) = 9

, then the modulus of the sum of all possible values of determinant of

P

is equal to:

MEDIUM

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

Let

A

and

B

3 \times 3

matrices. Consider the following statements:
(I) If

A

and

B

are diagonal, then so is

A B

(II) If

A

and

B

are symmetric, then so is

A B

MEDIUM

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

Let

A

and

B

be any two

3 \times 3

symmetric and skew symmetric matrices respectively. Then which of the following is NOT true?

MEDIUM

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

P

and

Q

are symmetric matrices of the same order, then

P Q - Q P

HARD

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

Let

A = [\begin{array}{r} 0 & - 2 \\ 2 & 0 \end{array}]

. If

M

and

N

are two matrices given by

M = \sum_{k = 1}^{10} A^{2 k}

and

N = \sum_{k = 1}^{10} A^{2 k - 1}

then

M N^{2}

HARD

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

Let

A, B

be invertible

2 \times 2

matrices such that

A

is symmetric and

B

is skew-symmetric. Let

C = A^{- 1} B^{- 1} + B^{- 1} A^{- 1}

and

D = B^{- 1} A B .

Then

HARD

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

Let

X a n d Y

be two arbitrary,

3 \times 3

, non - zero, skew - symmetric matrices and Z be an arbitrary

3 \times 3

, non - zero, symmetric matrix. Then which of the following matrices is (are) skew symmetric ?

EASY

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

A

and

B

are square matrices of same order and

B

is a skew symmetric matrix, then

A^{'} B A

MEDIUM

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

Let

A

be a symmetric matrix of order

2

with integer entries. If the sum of the diagonal elements of

A^{2}

1,

then the possible number of such matrices is:

EASY

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

Let $A = [a_{i j}]$ is a square matrix of order $2$ where $a_{i j} = i^{2} - j^{2}$ . Then $A$ is

EASY

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

If the matrix

[\begin{matrix} 2 & 3 \\ 5 & - 1 \end{matrix}] = A + B,

where

A

is symmetric and

B

is skew-symmetric then

B

is equal to

EASY

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

If $A$ , $B$ are symmetric matrices of the same order then $A B - B A$ is

EASY

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

Let

A = [\begin{matrix} a_{11} & a_{12} & a_{13} \\ a_{21} & a_{22} & a_{23} \\ a_{31} & a_{32} & a_{33} \end{matrix}]

whose entries are real numbers. Which of the following statements is ALWAYS TRUE?

EASY

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

If a matrix A is both symmetric and skew - symmetric matrix, then

EASY

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

In a third order matrix $A, a_{i j}$ denotes the element in the $i^{th}$ row and $j^{th}$ column.

If $a_{i j} = 0$ for $i = j$
$= 1$ for $i > j$
$= - 1$ for $i < j$

Then the matrix is

HARD

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

Let

M

be a

2 \times 2

symmetric matrix with integer entries. Then

M

is invertible if

MEDIUM

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

A

and

B

are symmetric matrices of same order and

X = A B + B A

and

Y = A B - B A

, then

{(X Y)}^{T}

is equal to

EASY

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

Let

A

and

B

be any two

3 \times 3

matrices. If

A

is symmetric and

B

is skew symmetric, then the matrix

A B - B A

EASY

Mathematics>Algebra>Matrices>Symmetric and Skew - symmetric Matrices

f (x) = |\begin{matrix} x^{3} - x & a + x & b + x \\ x - a & x^{2} - x & c + x \\ x - b & x - c & 0 \end{matrix}|

then

A skew symmetric matrix S satisfies the relation S2+I=0, where I is a unit matrix, then SS' is (where S' is transpose of S)

Important Questions on Matrices

Learn and Prepare for any exam you want !

A skew symmetric matrix $S$ satisfies the relation $S^{2} + I = 0$ , where $I$ is a unit matrix, then $S S^{'}$ is (where $S^{'}$ is transpose of $S$ )