Roots (1 Viewer)

nrlwinner

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I have a question and I'm not sure how to solve it.

Show that the roots of the equation

4(m+1)x^2 -4(m-1)x -3 = 0 (m does not equal -1)

are real for all m.



P.S. Can you take the discriminate of a discriminate?
 

hermand

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Wouldnt it be possible to not complete the square and just state the conclusion??
i think so yeah, because even if m is negative, m^2 is greater than m when m is greater than one, less than negative one, and when it's between 1 & -1, the addition of four will cancel any negative out anyway.
 

Timothy.Siu

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i think so yeah, because even if m is negative, m^2 is greater than m when m is greater than one, less than negative one, and when it's between 1 & -1, the addition of four will cancel any negative out anyway.
but u have to show that.
how can u be so sure
 

lolokay

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if m<-1, then m^2 > -m -> m^2 + m > 0 so m^2 + m + 4 > 0
if -1 < m < 0, then 0 < m^2 < 1
so m^2 + m + 4 > 3
and if m > 0, m^2 > 0
m^2 + m > 0,
as m^2 + m + 4 is greater than zero for each case it is always postive

works well for seeing it intuitively, but as for actually proving you're best to either complete the square or take the disciminant
 

lolokay

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if b^2 - 4ac < 0, (and a > 0) the quadratic is always positive
for m^2 + m + 4, the discriminant is 1 - 16 = -15 < 0
so always positive
 
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study-freak

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shouldn't you say that coefficient of x^2>0 to get the mark if you use the discriminant method?
 

Lukybear

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Ah, I see. Thats very simple concepts applied. Very very good. Hopefully one day ill reach you levels of thinking.
 

omniscience

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roots? niceeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeeee
 

Lukybear

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If thread dosent mind me asking, where was this question from? Which text book?
 

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