Polynomials question (1 Viewer)

whitnall8

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Could someone please help me with this question:

If ax^3 + cx + d has a double root, show that 27da^2 + 4b^3 = 0
 

scardizzle

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your question isn't making much sense to me. Where did you get the b term from? The only advice i can give atm is this q probably involves differentiating and making x the subject
 
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khorne

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y' => 3ax^2 + c = 0

=> x = +/- sqrt(-c/3a)

sub it in, divide through by sqrt(-c/3a), and re-arrange, square, collect like terms, and you will have it.
 

whitnall8

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Sorry, I was caught between two questions.

The actual question is:

If ax^3 + cx + d has a double root, show that 27ad^2 + 4c^3 = 0
 

Sakeeee

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Sorry, I was caught between two questions.

The actual question is:

If ax^3 + cx + d has a double root, show that 27ad^2 + 4c^3 = 0
sub @ as a root

a@^3+c@x+d=0 eqn(1)

now lets find what @ equals to

y'=3ax^2+c

x^2=-c/3a

that means @^2=-c/3a since @ is the root

sub it into eqn 1
a(-c/3a)^(3/2) + c(-c/3a)^(1/2)+d=0

[(-c/3)^3/2]/a^(1/2) + [(-c)^(3/2)]/3a)+d=0

Yeah it's getting hard to simply with this inefficient forum. you do the rest ;) it will work
 

cutemouse

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This is from a CSSA trial. It comes up now and then :D
 

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