Let T : R 3 </msub> &#x2192;<!-- \rightarrow --> R 3 </m

Gislervron2

Gislervron2

Answered question

2022-06-03

Let T : R 3 R 3 be the linear transformation corresponding to rotating by π / 4 clockwise around the z-axis, and then reflecting over the x-axis. Since T is a linear transformation, it corresponds to left multiplication by some matrix A.

Answer & Explanation

Baron Haynes

Baron Haynes

Beginner2022-06-04Added 2 answers

A linear transformation "corresponds to left multiplication by a matrix" in a given basis. That is why copper hat refers to the "standard basis". < 1 , 0 , 0 > rotated π / 4 radians around the z axis becomes < 2 / 2 , 2 / 2 , 0 >. Then reflecting over the x-axis it becomes < 2 / 2 , 2 / 2 , 0 >. < 0 , 1 , 0 > rotates to < 2 / 2 , 2 / 2 , 0 >. Then reflecting over the x axis, it becomes < 2 / 2 , 2 / 2 , 0 >.Finally, < 0 , 0 , 1 > which is on the z-axis "rotates" to itself, < 0 , 0 , 1 > , but then reflecting in the x-axis it becomes < 0 , 0 , 1 > .

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