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The product of two Unitary matrices is a ________ matrix
- a)Unit
- b)Orthogonal
- c)Unitary
- d)None of the above
Correct answer is option 'C'. Can you explain this answer?
Verified Answer
The product of two Unitary matrices is a ________ matrixa)Unitb)Orthog...
the product of two unitary matrices is always unitary.
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The product of two Unitary matrices is a ________ matrixa)Unitb)Orthog...
Unitary Matrices Product
Unitary matrices are matrices that satisfy the property: U*U^H = I, where U^H is the conjugate transpose of U and I is the identity matrix.
Product of Two Unitary Matrices
When you multiply two unitary matrices together, the result is also a unitary matrix. This can be proven as follows:
Let A and B be two unitary matrices. The product of A and B is AB.
Taking the conjugate transpose of AB, we get (AB)^H = B^H * A^H.
Now, to show that AB is unitary, we need to check if (AB)(AB)^H = I.
(AB)(AB)^H = AB * (B^H * A^H) = A(BB^H)A^H.
Since A and B are unitary matrices, A*A^H = I and B*B^H = I.
Therefore, A(BB^H)A^H = AIA^H = AA^H = I.
Hence, the product of two unitary matrices is also a unitary matrix.
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The product of two Unitary matrices is a ________ matrixa)Unitb)Orthog...
the product of two unitary matrices is always unitary.
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