Show that the two matrices A, P^(-1) AP ...

Show that the two matrices A, `P^(-1) AP` have the same characteristic roots.

Text Solution

Verified by Experts

Let
`P^(-1) AP=B`
`:. B-lambdaI=P^(-1) AP-lambdaI`
`=P^(-1) AP-P^(-1) lambdaIP`
`=P^(-1) (A-lambdaI)P`
`implies |B-lambda I|=|P^(-1)||A-lambdaI||P|`
`=|A-lambdaI||P^(-1)||P|`
`=|A-lambdaI||P^(-1) P|`
`=|A-lambdaI||I|=|A-lambdaI|`
Thus, the two matrices A and B have the same characteristic determinants and hence the same characteristic equations and the same characteristic roots. the same thing may also be seen in another way. Now,
`AX=lambdaX`
`implies P^(-1) AX=lambdaP^(-1) X`
`implies (P^(-1) AP) (P^(-1)X)=lambda(P^(-1) X)`

Topper's Solved these Questions

MATRICES
CENGAGE|Exercise Exercise (Single)|65 Videos
MATRICES
CENGAGE|Exercise Exercise (Multiple)|33 Videos
MATRICES
CENGAGE|Exercise Exercise 13.4|12 Videos
MATHMETICAL REASONING
CENGAGE|Exercise JEE Previous Year|10 Videos
METHODS OF DIFFERENTIATION
CENGAGE|Exercise Multiple Correct Answer Type|7 Videos

Similar Questions

Explore conceptually related problems

P is a non-singular matrix and A, B are two matrices such that B=P^(-1) AP . The true statements among the following are

Show that the matrices A=[(1, 2), (3, 1)], B=[(1, -2), (-3, 1)] satisfy commutative property AB=BA.

Show that two matrices A=[(1,-1,0),(2,1,1)] and B=[(3,0,1),(0,3,1)] are row equivalent.

Write two different vectors having the same magnitude.

Write two different vectors having the same direction.

Two diameters cannot have the same end - point

Two A.P.'s have the same common difference. The first term of one A.P. is 2 and that of the other is 7. Show that the difference between their 10th terms is the same as the difference between their 21th terms, which is the same as the difference between any two corresponding terms.

Show that the characteristics roots of an idempotent matris are either 0 or 1

Let A andB be two skew symmetric matrices of the same order find the incorrect statement:

CENGAGE-MATRICES-Exercise 13.5

By the method of matrix inversion, solve the system. [(1,1,1),(2,5,7...
Text Solution
|
Let A=[[2,0,7] , [0,1,0], [1,-2,1]] and B=[[-x,14x,7x] , [0,1,0] , [x,...
Text Solution
|
If A=[{:(0,1,1),(1,0,1),(1,1,0):}] show that A^(-1)=(1)/(2)(A^(2)=3I)
Text Solution
|
For the matrix A=[3 1 7 5] , find x and y so that A^2+x I=y Adot
Text Solution
|
If A^(3)=O, then prove that (I-A)^(-1) =I+A+A^(2).
Text Solution
|
If A=[[cos alpha, -sin alpha] , [sin alpha, cos alpha]], B=[[cos2beta,...
Text Solution
|
If A=[(1,2,2),(2,2,3),(1,-1,3)], C=[(2,1,1),(2,2,1),(1,1,1)], D=[(10),...
Text Solution
|
If A is a 2xx2 matrix such that A^(2)-4A+3I=O, then prove that (A+3I)^...
Text Solution
|
For two unimobular complex numbers z(1) and z(2), find [(bar(z)(1),-z(...
Text Solution
|
Prove that inverse of a skew-symmetric matrix (if it exists) is skew-s...
Text Solution
|
If square matrix a is orthogonal, then prove that its inverse is also ...
Text Solution
|
If A is a skew symmetric matrix, then B=(I-A)(I+A)^(-1) is (where I is...
Text Solution
|
Prove that ("adj. "A)^(-1)=("adj. "A^(-1)).
Text Solution
|
Using elementary transformation, find the inverse of the matrix A=[(a,...
Text Solution
|
Show that the two matrices A, P^(-1) AP have the same characteristic r...
Text Solution
|
Show that the characteristics roots of an idempotent matris are either...
Text Solution
|
If alpha is a characteristic root of a nonsin-gular matrix, then prove...
Text Solution
|