If A is an invertible matrix of order 2,...

If A is an invertible matrix of order 2, then det `(A^(-1))` is equal to …….

A

det(A)

B

`1/(det(A))`

C

1

D

0

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The correct Answer is:

B

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KUMAR PRAKASHAN-DETERMINANTS -Exercise 4.5

Find adjoint of each of the matrices in Exercises 1 and 2 [{:(1,2),(...
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Find adjoint of each of the matrices in Exercises 1 and 2 [{:(1,-1,2...
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Verify A(adjA)=(adjA) A=|A| I in following examples (3) and (4) [{:(...
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Verify A(adjA)=(adjA) A=|A| I in following examples (3) and (4) [{:...
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Find the inverse of each of the matrices (if it exists ) {:[( 2,-2),...
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Find the inverse of each of the matrices (if it exists ) {:[( 2,-2),...
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Find the inverse of each of the following matrices (if it exits) given...
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Find the inverse of each of the following matrices (if it exits) given...
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Find the inverse of each of the following matrices (if it exits) given...
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Find the inverse of each of the following matrices (if it exits) given...
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Find the inverse of each of the following matrices (if it exits) given...
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Let A=[{:(3,7),(2,5):}] and B=[{:(6,8),(7,9):}] Verify that (AB)^(-1)=...
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If A=[{:(3,1),(-1,2):}] show that A^2-5A+7I=O. Hence find A^(-1)
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For the matrix A=[{:(3,2),(1,1):}] , find the numbers a and b such tha...
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For the matrix A=[{:(1,1,1),(1,2,-3),(2,-1,3):}] Show that A^3-6A^2+5A...
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If A=[{:(2,-1,1),(-1,2,-1),(1,-1,2):}] Verify the result A^3-6A^2+9A-4...
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Let A be a nonsingular square matrix of order 3xx3.Then |adj A| is equ...
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If A is an invertible matrix of order 2, then det (A^(-1)) is equal to...
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