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Do there exist non diagonal symmetric 3 3 matrix that are orthogonal?

Do there exist non diagonal symmetric 3 3 matrix that are orthogonal?

Give an example of two matrices whose product is a 3×2 matrix. A matrix A is called symmetric if AT=A. Verify, for all 3×3… Suppose A is a 3×3 matrix and y is a vector in R3…

What is non symmetric matrix with example?

A symmetric matrix is a matrix which does not change when transposed. So a non symmetric matrix is one which when transposed gives a different matrix than the one you started with. The identity matrix is symmetric whereas if you add just one more 1 to any one of its non diagonal elements then it becomes non symmetric.

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Is every orthogonal matrix symmetric?

All the orthogonal matrices are symmetric in nature. (A symmetric matrix is a square matrix whose transpose is the same as that of the matrix).

Can a non square matrix be orthogonal?

In linear algebra, a semi-orthogonal matrix is a non-square matrix with real entries where: if the number of rows exceeds the number of columns, then the columns are orthonormal vectors; but if the number of columns exceeds the number of rows, then the rows are orthonormal vectors.

What is orthogonal matrix give example?

A square matrix with real numbers or values is termed as an orthogonal matrix if its transpose is equal to the inverse matrix of it. In other words, the product of a square orthogonal matrix and its transpose will always give an identity matrix. Suppose A is the square matrix with real values, of order n × n.

Is the zero matrix symmetric?

The zero matrix has that property, so it is a symmetric matrix. Since the sum of symmetric matrices is also a symmetric matrix, and a scalar multiple of a symmetric matrice is also a symmetric matrix, therefore the symmetric matrices form a vector space. In that vector space, the zero matrix is the zero vector.

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What are the properties of orthogonal matrices?

We know that a square matrix has an equal number of rows and columns. A square matrix with real numbers or elements is said to be an orthogonal matrix, if its transpose is equal to its inverse matrix.

Is the determinant of an orthogonal matrix invertible?

All the orthogonal matrices are invertible. Since the transpose holds back determinant, therefore we can say, determinant of an orthogonal matrix is always equal to the -1 or +1. All orthogonal matrices are square matrices but not all square matrices are orthogonal.

What is the difference between orthogonal matrix and unitary matrix?

A square matrix is called a unitary matrix if its conjugate transpose is also its inverse. So, basically, the unitary matrix is also an orthogonal matrix in linear algebra. We can get the orthogonal matrix if the given matrix should be a square matrix.

What are the different types of matrices?

There are a lot of concepts related to matrices. The different types of matrices are row matrix, column matrix, rectangular matrix, diagonal matrix, scalar matrix, zero or null matrix, unit or identity matrix, upper triangular matrix & lower triangular matrix. In linear algebra, the matrix and its properties play a vital role.