Q54E Find the basis of the space V聽o... [FREE SOLUTION]

91影视

Linear Algebra With Applications

Otto Bretscher

$Math Studyset 91影视 Explanations$ Math

5th Edition 路 442 pages

ISBN: 9780321796974

Chapter 1: Q54E (page 1)

Find the basis of the space Vof all skew-symmetric 3x3 matrices, and thus determine the dimension of V.

Short Answer

Expert verified

The dimension of a $n x n$ skew-symmetric matrices is $\frac{n^{2} - n}{2}$ which is spanned by .

$S p a n \{[\begin{matrix} 0 & 1 & 鈥� & 0 \\ - 1 & 0 & 鈥� & 0 \\ 鈰� & 鈰� & 鈰� & 鈰� \\ 0 & 0 & 鈥� & 0 \end{matrix}], . . ., [\begin{matrix} 0 & 鈥� & 0 \\ 鈰� & 鈰� & 1 \\ 0 & - 1 & 0 \end{matrix}]\}$ .

Step by step solution

Determine the basis.

Consider the matrix $A = [\begin{matrix} 0 & a_{12} & 鈥� & a_{1 n} \\ - a_{12} & 0 & 鈥� & a_{2 n} \\ 鈰� & 鈰� & 鈰� & 鈰� \\ - a_{1 n} & a_{2 n} & 鈥� & 0 \end{matrix}]$ where all $a_{i j}$ are real.

The matrix A is skew-symmetric if $A^{T} = - A$ and the general form of any skew-symmetric matrix is $[\begin{matrix} 0 & a_{12} & 鈥� & a_{1 n} \\ - a_{12} & 0 & 鈥� & a_{2 n} \\ 鈰� & 鈰� & 鈰� & 鈰� \\ - a_{1 n} & a_{2 n} & 鈥� & 0 \end{matrix}]$ .

The total number of elements in the strictly upper triangular matrix is $\frac{n^{2} - n}{2}$ .

Simplify the equation localid="1660129735066" $A = [\begin{matrix} 0 & a_{12} & 鈥� & a_{1 n} \\ - a_{12} & 0 & 鈥� & a_{2 n} \\ 鈰� & 鈰� & 鈰� & 鈰� \\ - a_{1 n} & - a_{2 n} & 鈥� & 0 \end{matrix}]$ as follows:

$A = [\begin{matrix} 0 & a_{12} & 鈥� & a_{1 n} \\ - a_{12} & 0 & 鈥� & a_{2 n} \\ 鈰� & 鈰� & 鈰� & 鈰� \\ - a_{1 n} & - a_{2 n} & 鈥� & 0 \end{matrix}] A = [\begin{matrix} 0 & a_{12} & 鈥� & a_{1 n} \\ - a_{12} & 0 & 鈥� & a_{2 n} \\ 鈰� & 鈰� & 鈰� & 鈰� \\ - a_{1 n} & - a_{2 n} & 鈥� & 0 \end{matrix}] + . . . + [\begin{matrix} 0 & 鈥� & 0 \\ 鈰� & 鈰� & a_{(n - 1) n} \\ 0 & a_{(n - 1) n} & 0 \end{matrix}] A = a_{12} [\begin{matrix} 0 & 1 & 鈥� & 0 \\ - 1 & 0 & 鈥� & 0 \\ 鈰� & 鈰� & 鈰� & 鈰� \\ 0 & 0 & 鈥� & 0 \end{matrix}] + . . . + a_{(n - 1) n} [\begin{matrix} 0 & 鈥� & 0 \\ 鈰� & 鈰� & 1 \\ 0 & - 1 & 0 \end{matrix}] where [\begin{matrix} 0 & 1 & 鈥� & 0 \\ - 1 & 0 & 鈥� & 0 \\ 鈰� & 鈰� & 鈰� & 鈰� \\ 0 & 0 & 鈥� & 0 \end{matrix}], . . ., [\begin{matrix} 0 & 鈥� & 0 \\ 鈰� & 鈰� & 1 \\ 0 & - 1 & 0 \end{matrix}] are linear independent$

Therefore, the matrix A is spanned by localid="1660130418420" $S p a n \{[\begin{matrix} 0 & 1 & 鈥� & 0 \\ - 1 & 0 & 鈥� & 0 \\ 鈰� & 鈰� & 鈰� & 鈰� \\ 0 & 0 & 鈥� & 0 \end{matrix}], . . ., [\begin{matrix} 0 & 鈥� & 0 \\ 鈰� & 鈰� & 1 \\ 0 & - 1 & 0 \end{matrix}]\}$ .

By the definition, the total number of elements in the set is .

$\{[\begin{matrix} 0 & 1 & 鈥� & 0 \\ - 1 & 0 & 鈥� & 0 \\ 鈰� & 鈰� & 鈰� & 鈰� \\ 0 & 0 & 鈥� & 0 \end{matrix}], . . ., [\begin{matrix} 0 & 鈥� & 0 \\ 鈰� & 鈰� & 1 \\ 0 & - 1 & 0 \end{matrix}]\} is \frac{n^{2} - n}{2}$

Hence, the dimension of A is which is $\frac{n^{2} - n}{2}$ spanned by $S p a n \{[\begin{matrix} 0 & 1 & 鈥� & 0 \\ - 1 & 0 & 鈥� & 0 \\ 鈰� & 鈰� & 鈰� & 鈰� \\ 0 & 0 & 鈥� & 0 \end{matrix}], . . ., [\begin{matrix} 0 & 鈥� & 0 \\ 鈰� & 鈰� & 1 \\ 0 & - 1 & 0 \end{matrix}]\}$ width="263">Span01鈥�0-10鈥�0鈰�鈰�鈰�鈰�00鈥�0,...,0鈥�0鈰�鈰�10-10