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Mindblank - how would i find the sq root of 'i'. (1 Viewer)

amdspotter

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^^^
i tried equating i which can be written as 0+i with x^2+2xyi-y^2 but dont think this works
 

yanujw

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You were on the right track with equating parts;


Suggesting that the Real and Imaginary parts of your root will be equal or opposite in sign.




Hence,

This can be verified by thinking about roots of a number with modulus 1 geometrically. i = cis(pi/2), so the roots are cis(pi/4) and cis(pi/4 - pi)
 

amdspotter

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You were on the right track with equating parts;


Suggesting that the Real and Imaginary parts of your root will be equal or opposite in sign.




Hence,

This can be verified by thinking about roots of a number with modulus 1 geometrically. i = cis(pi/2), so the roots are cis(pi/4) and cis(pi/4 -
)
ah ok this makes sense thx. also how would i approach this q as well: 1638428214605.png
this needs to be proved.
 

5uckerberg

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^^^
i tried equating i which can be written as 0+i with x^2+2xyi-y^2 but dont think this works
Another way around this is since you have to find the square root of i. A strong note would be since the length of i is 1 and that the equation of the real parts is 0 giving us


This is just simultaneous equations right.
There it becomes

Then find y which is the same
Thus your two roots are
 

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