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Post date: Sep 04, 2011 2:8:44 AM
PARA SINGS 02
(Featuring 'Roots' on backup vocals)
ax2 + bx + c presents....
Roots:
It's-Degree-Two...
It's-Degree-Two...
It's-Degree-Two...
Aaa-aaaa...
Para:
Where have both your real roots gone
Do you need an assist
There's x-axis intercepts
I see that they exist
Did the check of b squared, minus my 4-a-c
Positive I cross or I touch so don't you dare disagree...
I need a zero;
I'm holding out for a zero so the graph can look right
It's gotta be real
And it's such a big deal
But I'll try not to overexcite
I need a zero;
I'm holding out for a zero but don't get uptight
We've gotta good plan
Like an algorithm
Where we're using our factoring might (factoring might)
3x2 - 6x - 24
3(x+2)(x-4)
Roots:
Oh-we'll-need-two...
Oh-we'll-need-two...
Oh-we'll-need-two...
Aaa-aaaa...
Para:
Factor out the "a" first
If there's fractions, don't worry
Two numbers must multiply
To "c" and have a sum of "b"
Rationals are harder, but zeroes still exist
Perhaps quadratic formula, can show you what you missed... (yeah!)
I need a zero;
I'm holding out for a zero so the graph can look right
It's gotta be real
And it's such a big deal
But I'll try not to overexcite
I need a zero;
I'm holding out for a zero but don't get uptight
We've gotta good plan
Like an algorithm
Where we're using our factoring might...
I need a zero!
Split up the "b" then the zeroes come from grouping just right!
(musical interlude)
Irrational numbers can be zeroes as well
The formula is now the key
I can see there is use of axis
Symmetry
If the zeroes are somehow the same
And the perfect square checks
Then you know that you have
Also found the vertex
Para & Roots:
(Also found the vertex)
(Also found the vertex)
(Also found the vertex)
(Also found the ver... Aaa-aaaa...)
Para:
I need a zero;
I'm holding out for a zero so the graph can look right
It's gotta be real
And it's such a big deal
But I'll try not to overexcite
I need a zero
I'm holding out for a zero but don't get uptight
We've gotta good plan
Like an algorithm
Where we're using our factoring might!
I need a zero!
Split up the "b" then the zeroes come from grouping just right...
(Uuuu-uuu-uuu-uuuuu...)
[fade out]
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