I need help with this hard maths question (1 Viewer)

Stabilo123

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My brother asked me to do this question but I couldnt do it

1. Prove that Root 3 is irrational (pg 37 in Cambridge Yr 11 Book Question 4)

2. Prove the identity ( a + b + c )( ab + bc + ca ) - abc = ( a + b )( b + c )( c + a )
 

SpiralFlex

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Common proof:

Assume is rational.

Hence it can be expressed in the form,



(Note: p, q have no common factors.)


Squaring,






Clearly, is a multiple of therefore so is


We can expressed this multiple of as,






Substitute that in,





is a multiple of 3! Hence so is


Therefore we have just contradicted our assumption.

If both is a multiple of , it will have common factors.


















 
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Stabilo123

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thanks for doing the first one, but is there any way to do the 2nd one without just expanding both sides?
 

1xcv3we

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I've given the 2nd one a shot by just expanding 1 side but to be honest with you this one has me stuck. Spiralflex's method is best method I know of if expanding then rearranging and factoring fails.
 

Carrotsticks

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There is a faster way of doing the second question using something called 'Cyclic Expansion', which is a very useful tool sometimes. It eliminates the need for mindless and boring expansions.



Writing up an alternative proof for irrationality of sqrt3 now.
 

bleakarcher

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Spiral, I dont really understand your common factors argument. Even if p and q had common factors they would cancel and leave still a rational number wouldnt they?
 

4025808

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I love the adding and subtraction of a value, it's such a smart manipulation technique :)
 

Carrotsticks

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Here is a *rough* proof for irrationality of root 3.



Substituting x into itself recursively gives us an infinite periodic continued fraction, meaning that...



... is irrational.

It follows through that the root of 3 is also irrational.
 

AAEldar

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Different approach again - I like it though.
 

Trebla

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Spiral, I dont really understand your common factors argument. Even if p and q had common factors they would cancel and leave still a rational number wouldnt they?
The initial assumption is that p/q is the simplest fraction that the number can be. Perhaps a better worded version would be

 
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Drongoski

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There is a faster way of doing the second question using something called 'Cyclic Expansion', which is a very useful tool sometimes. It eliminates the need for mindless and boring expansions.



Writing up an alternative proof for irrationality of sqrt3 now.

If this is a Gawd's Method how about a Dawg's "Proof"?



Take any valid values for a, b and c chosen at random: for simplicity say a=1, b=2, c=-3





Therefore RHS = LHS

Or, if you like, try any other values: say a = 2.37, b = 5.209 and c = 3.153

or you can use a Random Number Generator to furnish the 3 numbers.

PS:remember: (a+b)(b+c)(c+a) = (a+b+c)(ab+ac+ca) - abc is an identity.
 
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Demento1

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If this is a Gawd's Method how about a Dawg's "Proof"?



Take any valid values for a, b and c chosen at random: for simplicity say a=1, b=2, c=-3





Therefore RHS = LHS

Or, if you like, try any other values: say a = 2.37, b = 5.209 and c = 3.153

PS:remember: (a+b)(b+c)(c+a) = (a+b+c)(ab+ac+ca) - abc is an identity.
Exactly what I did for this question ^. I just let a,b and c all be integers and subbed and simplified it from there.
 

SpiralFlex

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Of course not haha.

Drongoski was merely demonstrating his puppy power!
 

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