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RohitShubesh21

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|z^2 - zconjugate^2| >= 16

sorry I dont know how to make it look good, could i get sketch of locus please... my answer is -4i/x but not sure how to graph...
 

ExtremelyBoredUser

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|z^2 - zconjugate^2| >= 16

sorry I dont know how to make it look good, could i get sketch of locus please... my answer is -4i/x but not sure how to graph...
Let z = x+iy

Lets just consider the modulus right now






Substituting back into the inequality





Edit: Mistake below, forgot case of modulus.
 
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5uckerberg

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I would suggest you write the Q in latex, as it makes the question clear and that it resembles exactly the textbook. So instead of writing |z^2 - zconjugate^2| >= 16 you can write it as z^{2}-\bar{z}^{2} \geq{16} after you complete the left expression and note that the i gets removed in the process and is treated as one so that is why you have because the length of 4 is divided by both sides from
 

icycledough

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|z^2 - zconjugate^2| >= 16

sorry I dont know how to make it look good, could i get sketch of locus please... my answer is -4i/x but not sure how to graph...
So as mentioned so far, the graph would be a hyperbole graph but on all 4 quadrants, because as Trebla said, there should be an absolute value. You then know that the shaded area will lie on the lines and outside, as with a hyperbole, anything above means greater.
 

RohitShubesh21

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So as mentioned so far, the graph would be a hyperbole graph but on all 4 quadrants, because as Trebla said, there should be an absolute value. You then know that the shaded area will lie on the lines and outside, as with a hyperbole, anything above means greater.
yes thank you sirs
 

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