1. The figure shows two bases, consisting of unit vectors, for ll?2: S —— (i,j) and 0 = (ut,ut).
(a) Find the transition matrix s B
(b) Find the transition matrix PB S
We can see that the question is not clear as there are some typing errors.
so we can manipulate it and provide a idea how to solve these types of questions>
Adjusting the conditions of the questions, and rewriting it as;
The figure show two basis for "\\reals^2:S=(i,j)" and "B=(u_1',u_2')"
1) Find the transition matrix "P_S\\to\\>_B"
2) Find the transition matrix "P_B\\to\\>_S"
Now we can see our Solution:
In reference to the figure, first basis "S=(i,j)"
Where "i=\\begin{bmatrix}\n 1 \\\\\n 0 \n\\end{bmatrix}" ,"\\quad\\>j=\\begin{bmatrix}\n 0 \\\\\n 1\n\\end{bmatrix}"
Second basis "B(u'_1,u'_2)"
Where "u'_1=\\begin{pmatrix}\n \\frac{1}{2} \\\\\n 0\n\\end{pmatrix}" , "u'_2= \\begin{pmatrix}\n -1 \\\\\n 2 \n\\end{pmatrix}"
a) Expressing elements of "B" in terms of elements of "S"
"\\begin{pmatrix}\n \\frac{1}{2} \\\\\n 0\n\\end{pmatrix}" "=a\\begin{pmatrix}\n 1 \\\\\n 0 \n\\end{pmatrix}" "+b\\begin{pmatrix}\n 0 \\\\\n 1 \n\\end{pmatrix}"
"\\implies a=\\frac{1}{2},b=0"
"\\begin{pmatrix}\n -1 \\\\\n 2\n\\end{pmatrix}" "=a'\\begin{pmatrix}\n 1 \\\\\n 0\n\\end{pmatrix}" "+b'\\begin{pmatrix}\n 0\\\\\n 1 \n\\end{pmatrix}"
"\\implies\\>a'=-1,b'=2"
"\\therefore" Transition matrix is "\\begin{pmatrix}\n a & a' \\\\\n b& b'\n\\end{pmatrix}"
"\\therefore" Transition matrix "P_S\\>\\to_B=\\begin{pmatrix}\n \\frac{1}{2} & -1\\\\\n 0& 2\n\\end{pmatrix}"
Thus we found PS matrix.
b) Transition matrix "P_B\\>\\to\\>S" "=(P_S\\to\\>_B)^{-1}"
"\\begin{pmatrix}\n \\frac{1}{2} & -1 \\\\\n 0& 2\n\\end{pmatrix}" "^{-1}" "= \\frac{1}{1}\\begin{pmatrix}\n 2 & 1 \\\\\n 0 & \\frac{1}{2}\n\\end{pmatrix}"
"\\therefore P_B\\to\\>_S" "= \\begin{pmatrix}\n 2 & 1 \\\\\n 0 & \\frac{1}{2}\n\\end{pmatrix}"
thus we found PB Matrix.
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