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Maths complex number help (1 Viewer)

Drongoski

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Then P(x) will always be positive, i.e. cannot become zero. That means it cannot have real roots. That is you cannot find a real number "a" say, such that P(a) = 0.


To expand:
x^4 >= 0; Ax^2 >= 0; B > 0 ==> P(x) > 0
So the curve of y = P(x) cannot cross the x-axis; so no real roots !!!!!
 
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CM_Tutor

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you could turn this into a quadratic u^2 + Au + B where the constants are >0, and since the quadratic is positive definite (meaning its always above the x axis) that means it has no real roots. if x^2 has no real roots, neither can x.
Why is the quadratic positive definite?
 

notme123

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@notme123 fair - are there other methods?
oh i thought of another method. do the substitution as before where the roots are for x^2. now if you do sum of roots, the sum of the real parts would be -A which is less than 0. so if x^2 is less than 0, x must be not purely real
 

Trebla

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Note that P'(x)=4x^3+2Ax and P''(x)=12x^2+2A.

P(x) is concave up with a minimum turning point at (0,B). Hence, P(x) > B > 0 so no real roots.
 

CM_Tutor

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oh i thought of another method. do the substitution as before where the roots are for x^2. now if you do sum of roots, the sum of the real parts would be -A which is less than 0. so if x^2 is less than 0, x must be not purely real
This requires the conjugate root theorem.

The result can be established without it, by proving that . This can be done by noting that



and that





 

Life'sHard

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This requires the conjugate root theorem.

The result can be established without it, by proving that . This can be done by noting that



and that





Is latex broken? Or is it just me?
 

Trebla

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Yeah, looks like it is broken at the moment
 

5uckerberg

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b is conjugate root theorem.

c is just the sum of 2 roots put together giving us
and , effectively just giving us
 

jimmysmith560

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It seems that LaTeX is currently experiencing some sort of issue that is preventing users from seeing particular input.

A temporary solution to this (if you're using a PC) is to right-click on the 1637501374875.png icon, then clicking on "Open image in new tab" (for Google Chrome and Edge, or the equivalent option on other browsers).

The following message may appear:

1637501517522.png

This is due to the fact that the certificate for latex.codecogs.com has expired and needs to be updated. However, because the "Open image in new tab" option will only take you to an image file, there is most likely no real risk associated with proceeding, which can be done by clicking the "Advanced" button and then clicking on the "Proceed to latex.codecogs.com (unsafe)" option.

It is possible that the expired certificate of https://latex.codecogs.com/ is what is causing this issue.

Alternatively, you may wish to wait until https://latex.codecogs.com/ update their certificate, which will likely rectify the LaTeX issue on here.
 

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