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a³ + 3a = 140 (1 Viewer)

IAU001

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I was just looking over my old yearly maths test paper when i saw this question. school's out so i can't ask my teacher. I would really appreciate it if you could help me on how to solve it. i'm kinda slow so a step by step procedure would be REALLY appreciated

thanks in advance
 

Affinity

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well the way you are meant to do it:
you want to sovle a^3 + 3a - 140 = 0
after a bit of trying you discover that a=5 is a solution.
then you factorize it:
(a-5)(a^2 + 5a + 28) = 0
and since a^2 + 5a + 28 = 0 has no real valued solutions, a = 5 is the only real solution.

the general way:
let a = (x+y)
then you get:

(x^3 + y^3) + (3xy+3)(x+y) = 140
so, if we can get x^3 + y^3 = 140 and xy = -1, we has a solution.

so x=-1/y
y^3 - 1/y^3 = 140
(y^3)^2 - 140(y^3) - 1 = 0
y^3 = {140 [+/-] sqrt(140^2 + 4)}/2
y = cuberoot({140 [+/-] sqrt(140^2 + 4)}/2) etc.
 
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Yeah. That's OK.

You can test the divisors of 140. Eventually you will discover that 5 works. And that's as much as you need for this question.

So what are the divisors of 140?

±1, ±2, ±4, ±5, ±7, ±10, ±14, ±20 ±28, ±35, ±70, ±140

but there's no need to test the negative ones, so try only 1,2,4,5,7,10,14,20,28,35,70,140 - but once you find one you can factorise, so starting from the smallest ones,

1<sup>3</sup>+3(1)-140=-136
2<sup>3</sup>+3(2)-140=-126
4<sup>3</sup>+3(4)-140=-64
5<sup>3</sup>+3(5)-140=0 STOP and factorise:

a<sup>3</sup>+3a-140=(a-5)(a<sup>2</sup>+5a+28)=0, as affinity said and for the quadratic factor, &Delta;=-87 < 0 so there is only 1 real root and it's a=5.

However this method doesn't always work and there is a more general formula for cubics:



and using this formula we see that for your question,



I made a thread on cubics and quartics at
http://community.boredofstudies.org...acurricular-topics/99063/cubics-quartics.html

Here is an attachment of a more complete version of affinity's method:
 
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Challenge: Now see if you can solve a<sup>4</sup>+3a=140

<a href="http://users.tpg.com.au/nanahcub/ans.gif">click here for the answer</a> using <a href="http://users.tpg.com.au/nanahcub/quartic.gif">this formula</a>
 
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jyu

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How do you derive these formulae? Is it a good idea for sec students to learn the derivations?
 

bos1234

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that cubic forumla method is confusing...... i think ill stick to the remainder theorme.. :confused: :confused:
 

Riviet

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bos1234 said:
that cubic forumla method is confusing...... i think ill stick to the remainder theorme.. :confused: :confused:
Don't worry about it if it's confusing you, I never used it and it's not in the syllabus.
 
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And here's an article which appeared on it in UNSW's Parabola Magazine in 2005:
 

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