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Show that the characteristics roots of a...

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

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Since A is an idempotent matrix, we have
`A^(2)=A`
Let X be a latent vector of the matrix A corresponding to the latent root `lambda` so that
`AX=lambdaX` (1)
or `(A-lambda I)X=O`
such that
`X ne O`
On pre-multiplying Eq. (1) by A, we get
`A(AX)=A(lambdaX)=lambda(AX)`
i.e., `(A A)X=lambda(AX)`
or `AX=lambda^(2) X`
or `lambdaX=lambda^(2)X" "( :' A^(2)=A)`
or `(lambda^(2)-lambda)X=O" "( :' AX=lambdaX)`
or `lambda^(2)-lambda=0`
or `lambda(lambda-1)=0" "( :' X ne 0)`
`implies lambda=0, lambda=1`
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CENGAGE-MATRICES-Exercise 13.5
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  3. If A=[{:(0,1,1),(1,0,1),(1,1,0):}] show that A^(-1)=(1)/(2)(A^(2)=3I)

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  5. If A^(3)=O, then prove that (I-A)^(-1) =I+A+A^(2).

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  7. If A=[(1,2,2),(2,2,3),(1,-1,3)], C=[(2,1,1),(2,2,1),(1,1,1)], D=[(10),...

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  10. Prove that inverse of a skew-symmetric matrix (if it exists) is skew-s...

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  12. If A is a skew symmetric matrix, then B=(I-A)(I+A)^(-1) is (where I is...

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  13. Prove that ("adj. "A)^(-1)=("adj. "A^(-1)).

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  14. Using elementary transformation, find the inverse of the matrix A=[(a,...

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

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  16. Show that the characteristics roots of an idempotent matris are either...

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  17. If alpha is a characteristic root of a nonsin-gular matrix, then prove...

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