Let A be a 2x2 real matrix with entries from {0,1} and |A| ≠ 0. Consider the following two statements; (P) If A ≠ I₂, then |A| = -1 (Q) If |A| = 1, then tr(A) = 2 where I₂ denotes 2x2 identity matrix and tr(A) denotes the sum of the diagonal entries of A. Then:

(P) is false and (Q) is true

Both (P) and (Q) are true

Both (P) and (Q) are false

(P) is true and (Q) are false

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Maths Matrices Maths Class 12th Matrices

Let A be a 2x2 real matrix with entries from {0,1} and |A| ≠ 0. Consider the following two statements;
(P) If A ≠ I₂, then |A| = -1
(Q) If |A| = 1, then tr(A) = 2
where I₂ denotes 2x2 identity matrix and tr(A) denotes the sum of the diagonal entries of A. Then:

Option 1 -

Both (P) and (Q) are true

Option 2 -

Both (P) and (Q) are false

Option 3 -

(P) is true and (Q) are false

Option 4 -

(P) is false and (Q) is true

3 Views | Posted a month ago

Asked by Shiksha User

1 Answer

Answered by

Vishal Baghel | Contributor-Level 10

a month ago

Correct Option - 4

Detailed Solution:

|A|≠0
For (P): A≠I?
So, A = [1 0; 0 1] or [1; 0 1] or [1 0; 1]
or [1; 1 0]
So (P) is false.
A = [1 0; 1 0] or [1; 0 1] or [1 0; 1]
⇒ tr (A)=2
⇒ Q is true

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Let A be a 2x2 real matrix with entries from {0,1} and |A| ≠ 0. Consider the following two statements;
(P) If A ≠ I₂, then |A| = -1
(Q) If |A| = 1, then tr(A) = 2
where I₂ denotes 2x2 identity matrix and tr(A) denotes the sum of the diagonal entries of A. Then:

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Let A be a 2x2 real matrix with entries from {0,1} and |A| ≠ 0. Consider the following two statements;(P) If A ≠ I₂, then |A| = -1(Q) If |A| = 1, then tr(A) = 2where I₂ denotes 2x2 identity matrix and tr(A) denotes the sum of the diagonal entries of A. Then:

1 Answer

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Learn more about...

Most viewed information

Share Your College Life Experience

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Your Question

Let A be a 2x2 real matrix with entries from {0,1} and |A| ≠ 0. Consider the following two statements;
(P) If A ≠ I₂, then |A| = -1
(Q) If |A| = 1, then tr(A) = 2
where I₂ denotes 2x2 identity matrix and tr(A) denotes the sum of the diagonal entries of A. Then: