- #1
HF08
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B = [cos[tex]\theta[/tex] -sin[tex]\theta[/tex]]
...[sin[tex]\theta[/tex] cos[tex]\theta[/tex]]
for some [tex]\theta[/tex] in R[tex]^{2}[/tex].
(a) Prove that || B(x,y) || = || (x,y) || for all (x,y)[tex]\in[/tex]R[tex]^{2}[/tex]
Question: What does B(x,y) and (x,y) notation mean?
I have a result that says
Let B=[b[tex]_{ij}[/tex]] be an mxn matrix whose entries
are real numbers and let e[tex]_{1}[/tex],...,e[tex]_{n}[/tex] represent the usual basis of R^n. If T(x) = Bx, x[tex]\in[/tex]R^n , then T is a linear function from R^n to R^m and T(e[tex]_{j}[/tex])=(b[tex]_{1j}[/tex],b[tex]_{2j}[/tex],...,b[tex]_{mj}[/tex], j = 1,2,...n
Warning: Superscripts are not superscipts. They are supposed to be SUBSCRIPTS. Sigh.
Can I use this?
1. I am very new to this material
2. I am stuck with the notation.
3. Please answer my first question carefully. I can't answer the question unless I know what they are asking. :)
Please help me. Thank You,
HF08
...[sin[tex]\theta[/tex] cos[tex]\theta[/tex]]
for some [tex]\theta[/tex] in R[tex]^{2}[/tex].
(a) Prove that || B(x,y) || = || (x,y) || for all (x,y)[tex]\in[/tex]R[tex]^{2}[/tex]
Question: What does B(x,y) and (x,y) notation mean?
I have a result that says
Let B=[b[tex]_{ij}[/tex]] be an mxn matrix whose entries
are real numbers and let e[tex]_{1}[/tex],...,e[tex]_{n}[/tex] represent the usual basis of R^n. If T(x) = Bx, x[tex]\in[/tex]R^n , then T is a linear function from R^n to R^m and T(e[tex]_{j}[/tex])=(b[tex]_{1j}[/tex],b[tex]_{2j}[/tex],...,b[tex]_{mj}[/tex], j = 1,2,...n
Warning: Superscripts are not superscipts. They are supposed to be SUBSCRIPTS. Sigh.
Can I use this?
1. I am very new to this material
2. I am stuck with the notation.
3. Please answer my first question carefully. I can't answer the question unless I know what they are asking. :)
Please help me. Thank You,
HF08