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New sense of quad formula! Factoring quad trinomial that haz imaginary root
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Topic: New sense of quad formula! Factoring quad trinomial that haz imaginary root (Read 4649 times)
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Yeong
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New sense of quad formula! Factoring quad trinomial that haz imaginary root
«
on:
March 10, 2011, 07:22:44 am »
I don't know if people already knows or just doesn't care, but imma post this anyway because I'm pretty sure this is help at least one people.
Sum of two squares
This is not trinomials but anyway...
It's just similar to difference of two squares, but you just put
i
at the end
Ex) (x
2
-4) = (x-2)(x+2)
(x
2
+4) = (x-2
i
)(x+2
i
)
trinomials
*only works when a=1
There is a step so...
Ex) x
2
-4x +13
1) (x )(x )
2) now put b/2. (x-2 )(x-2 )
________
3) now put plus/minus\/c-(b/2)
2
x
i
(x-2+3
i
)(x-2-3
i
)
«
Last Edit: March 10, 2011, 07:46:58 pm by yeongJIN_COOL
»
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phenomist
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Re: Factoring quad trinomial that haz imaginary root
«
Reply #1 on:
March 10, 2011, 07:09:43 pm »
Yeah, that's the quadratic formula, with a=1.
The "formal" way would be to complete the square.
x^2 -4x + 4 + 9 = 0
(x-2)^2 = -9
x-2 = +3i or -3i
x = 2+3i or 2-3i
So those are the solutions, so necessarily (x-2-3i)(x+2+3i) = original trinomial, since same leading term.
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Yeong
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Re: Factoring quad trinomial that haz imaginary root
«
Reply #2 on:
March 10, 2011, 07:13:40 pm »
I know, but I was just presenting other way.
Personally, I prefer quad formula better
Also, I dont think sqrt(c-(b/2)
2
) is not quad formula at a=1.
it should be -b(+/-)sqrt(b
2
-4c)
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phenomist
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Re: Factoring quad trinomial that haz imaginary root without using quad formula
«
Reply #3 on:
March 10, 2011, 07:18:36 pm »
Well, you divide by 2 when a=1 (denominator's /2a for quad formula), so this gives you b/2, and a divide by 2 = a divide by 4 inside a sqrt sign, hence (b/2)^2-c. The i occurs because you extracted out one factor of sqrt(-1).
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Yeong
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Re: Factoring quad trinomial that haz imaginary root
«
Reply #4 on:
March 10, 2011, 07:33:54 pm »
how does sqrt((b/c)^2-c) turns into (b^2 - 4c)?
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phenomist
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Re: Factoring quad trinomial that haz imaginary root
«
Reply #5 on:
March 10, 2011, 07:42:12 pm »
original
[-b+/-rt(b^2-4ac)]/2a
Let a=1
[-b+/-rt(b^2-4c)]/2
-b/2 +/- rt(b^2-4c)/2
-b/2 +/- rt((b^2-4c)/4)
-b/2 +/- rt(b^2 / 4 - c)
- b/2 +/- rt((b/2)^2 - c)
- b/2 +/- i*rt(c-(b/2)^2)
Meh, I usually omit the sqrt( sign because it's annoying to type. It should be self-evident though.
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Yeong
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Re: Factoring quad trinomial that haz imaginary root
«
Reply #6 on:
March 10, 2011, 07:46:34 pm »
ahh okee
better change the title then.
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New sense of quad formula! Factoring quad trinomial that haz imaginary root