Lols Question (maths) (1 Viewer)

super.muppy

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Factorise x^6-1 first as (x^3)^2-1, then go on
similarly factor: x^8 - a^8, x^10-1

and one more

by expressing x as (root x)^2 and y as (root y)^2, factor

(x^3/2)-(y^3/2)


show working plz thanks
 
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kurt.physics

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super.muppy said:
Factor x^6-1 first as (x^3)^2-1, then go on
similarly factor: 1 x^8 - a^8, 2 x^10-1

and one more

by expressing x as (root x)^2 and y as (root y)^2, factor

(x^3/2)-(y^3/2)


show working plz thanks
1 x8 - a8 = (x4)2 - (a4)2
=(x4 - a4)(x4 + a4)
=((x2)2 - (a2)2)(x4 + a4)
=(x2 - a2)(x2 + a2)(x4 + a4)
=(x - a)(x + a)(x2 + a2)(x4 + a4)
 

suzlee

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factor = factorise?

I didn't get what the question was at first... lol.
 

RachelElizabeth

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super.muppy said:
Factor x^6-1 first as (x^3)^2-1, then go on
similarly factor: x^8 - a^8, x^10-1

and one more

by expressing x as (root x)^2 and y as (root y)^2, factor

(x^3/2)-(y^3/2)


show working plz thanks
I am sooo not ready for that.. I have no hope! :(
 

kurt.physics

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super.muppy said:
1 Factorise x^10-1

and one more

2 by expressing x as (root x)^2 and y as (root y)^2, factor

(x^3/2)-(y^3/2)

show working plz thanks
1 x10 - 1
= (x5)2 - 12
= (x5 - 1)(x5 + 1)

And thats as far as it goes

For the second one, i presume you mean this

(x^3/2)-(y^3/2) is x3/2 - y3/2

In which case, substituting ( (root x)2 and similarly with y) we get

= ((root x)2)3/2 - ((root y)2)3/2

= (root x)2 * 3/2 - (root y)2 * 3/2

= (root x)3 - (root y)3

Now we apply the difference of two cubes ( ie a2 - b2 = (a - b)(a2 + ab + b2) )

so,

x3/2 - y3/2 = (root(x) - root(y))(x +root(xy) + y)


P.S. Sorry about the lateness :S
 

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