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29 votes
29 votes
Which description of the transformation of z on the complex plane gives the product of and 2 = startroot 8 endroot (cosine (startfraction pi over 4 endfraction) + i sine (startfraction pi over 4 endfraction) )? scale z by a factor of 4, then rotate counterclockwise startfraction pi over 2 endfraction radians scale z by a factor of startroot 8 endroot, then rotate counterclockwise startfraction pi over 2 endfraction radians scale z by a factor of startroot 8 endroot, and then rotate counterclockwise startfraction pi over 4 endfraction radians scale z by a factor of 4, then rotate counterclockwise startfraction pi over 4 endfraction radians

User Ankit Vijay
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2 Answers

21 votes
21 votes

Answer:

C. scale z by a factor of StartRoot 8 EndRoot, and then rotate counterclockwise StartFraction pi Over 4 EndFraction radians

Step-by-step explanation:

User Subbdue
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3.0k points
19 votes
19 votes

Answer:

Scale z by a factor of
√(8), and then rotate counterclockwise
(\pi )/(4) radians.

Step-by-step explanation:

Got it right on Edge 2022 (I'm assuming it's this question)

Which description of the transformation of z on the complex plane gives the product-example-1
User Przemaas
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2.8k points