For the multiplication of matrices as...

For the multiplication of matrices as a binary operation on the set of all matrices of the form `[a b-b a],\ a ,\ b in R` the inverse of `[2 3-3 2]` is `[-2 3-3-2]` (b) `[2 3-3 2]` (c) `[2//13-3//13 3//13 2//13]` (d) `[1 0 0 1]`

Topper's Solved these Questions

APPLICATION OF INTEGRALS
RD SHARMA ENGLISH|Exercise All Questions|163 Videos
BINOMIAL DISTRIBUTION
RD SHARMA ENGLISH|Exercise All Questions|149 Videos

Similar Questions

Explore conceptually related problems

Let * be a binary operation defined on Q^+ by the rule a * b=(a b)/3 for all a ,\ b in Q^+ . The inverse of 4 * 6 is (a) 9/8 (b) 2/3 (c) 3/2 (d) none of these

Q^+ denote the set of all positive rational numbers. If the binary operation . on Q^+ is defined as a.b=(a b)/2, then the inverse of 3 is (a) 4/3 (b) 2 (c) 1/3 (d) 2/3

Using elementary transformtions (operations), find the inverse of the following matrices, if it exists: [[3,9],[1,3]]

Using elementary transformations (operations), find the inverse of the following matrices, if it exists [(2,-1,3),(-5,3,1),(-3,2,3)]

Find the value of a if [a-b2a+c2a-b3c+d]=[-1 5 0 13]

Find the inverse of the following matrices, if it exists, using elementary operation: [[2,5],[1,3]]

If R is a reation on the set A={1,2,3} given by R={(1,1),(2,2)(1,3)} then R is

If the point (2a,a) lies inside the parabola x^(2) -2x - 4y +3 = 0 , then a lies in the interval (a) [1/2,3/2] (b) (1/2,3/2) (c) (1,3) (d) (-3/2,-1/2)

Value of lambda for which (lambda,lambda^2) lies between the lines |x+2y|=3 is (a) ( -1/2,2) (b) (-3/2,2) (c) (-3/2,1) (d) (-1,3/2)

[{:(1,3),(2,7):}] find the inverse of matrix

RD SHARMA ENGLISH-BINARY OPERATIONS-All Questions

Q^+ is the set of all positive rational numbers with the binary oper...
Text Solution
|
If the binary operation o. is defined on the set Q^+ of all positive r...
Text Solution
|
Let * be a binary operation defined on set Q-{1} by the rule a*b=a+b...
Text Solution
|
Which of the following is true? * defined by (a)a*b=(a+b)/2 is a bin...
Text Solution
|
The binary operation * defined on N by a*b=a+b+a b for all a ,\ b in...
Text Solution
|
If a binary operation * is defined by a*b=a^2+b^2+a b+1 ,then (2*3)*...
Text Solution
|
Let * be a binary operation on R defined by a*b= a b+1 . Then, * is ...
Text Solution
|
Subtraction of integers is (a)commutative but not associative (b)c...
Text Solution
|
The law a+b=b+a is called
Text Solution
|
An operation * is defined on the set Z of non-zero integers by a*b...
Text Solution
|
On Z an operation * is defined by a*b=a^2+b^2 for all a ,\ b in Z ....
Text Solution
|
A binary operation * on Z defined by a*b= 3a+b for all a ,\ b in Z ...
Text Solution
|
Let * be a binary operation on N defined by a*b=a+b+10 for all a ,\ ...
Text Solution
|
Consider the binary operation * defined on Q-{1} by the rule a*b= a+...
Text Solution
|
For the binary operation * defined on R-{1} by the rule a*b=a+b+a b ...
Text Solution
|
For the multiplication of matrices as a binary operation on the set...
Text Solution
|
On the set Q^+ of all positive rational numbers a binary operation *...
Text Solution
|
Let * be a binary operation defined on Q^+ by the rule a*b=(a b)/3 f...
Text Solution
|
The number of binary operations that can be defined on a set of 2 e...
Text Solution
|
The number of commutative binary operations that can be defined on a...
Text Solution
|