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If in a square matrix A=[aij], we find that
aij = aji ∀ i,j, then A is a
aij = aji ∀ i,j, then A is a
- a)symmetric matrix
- b)diagonal matrix
- c)skew symmetric matrix
- d)transpose matrix
Correct answer is option 'A'. Can you explain this answer?
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Most Upvoted Answer
If in a square matrix A=[aij], we find thataij = aji ∀ i,j, the...
Explanation:
- Symmetric Matrix:
- In a symmetric matrix, the elements are symmetric with respect to the main diagonal.
- If a matrix A satisfies the condition aij = aji for all i,j, then it is a symmetric matrix.
- This means that the elements are symmetric across the main diagonal, ensuring aij = aji.
- Symmetric Matrix:
- In a symmetric matrix, the elements are symmetric with respect to the main diagonal.
- If a matrix A satisfies the condition aij = aji for all i,j, then it is a symmetric matrix.
- This means that the elements are symmetric across the main diagonal, ensuring aij = aji.
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Community Answer
If in a square matrix A=[aij], we find thataij = aji ∀ i,j, the...
As this type of que make simple diagram like
aij=aji means a12=a21 means 1row 2 colomn a13=a31
1 row 3 colomn....
A=| 1 3 |
| 3 1 |
sol it's transpose then it will be A
so it's symmetric matrix
aij=aji means a12=a21 means 1row 2 colomn a13=a31
1 row 3 colomn....
A=| 1 3 |
| 3 1 |
sol it's transpose then it will be A
so it's symmetric matrix
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If in a square matrix A=[aij], we find thataij = aji ∀ i,j, then A is aa)symmetric matrixb)diagonal matrixc)skew symmetric matrixd)transpose matrixCorrect answer is option 'A'. Can you explain this answer?
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