Date: Apr 8, 2013 10:06 AM
Author: JT
Subject: Re: Is there an algorithm that i can use to form the set describing<br> the sqrt of every consecutive natural?
On 8 Apr, 15:58, JT <jonas.thornv...@gmail.com> wrote:

> On 8 Apr, 15:54, JT <jonas.thornv...@gmail.com> wrote:

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> > On 8 Apr, 15:08, JT <jonas.thornv...@gmail.com> wrote:

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> > > On 8 Apr, 14:48, JT <jonas.thornv...@gmail.com> wrote:

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> > > > On 8 Apr, 13:25, KBH <emptyp...@hotmail.com> wrote:

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> > > > > I'll bite:

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> > > > > It's y = x^2 .

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> > > > > Then the square roots are on the x-axis and the whole numbers are on the y-axis.

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> > > > > However, the only points known are the plotting points. The intermediate points between the plotted points are only graphical.

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> > > > Why would they be graphical? You try to say that 2,2 have no sqrt, of

> > > > course it must have. This must be a continous function.

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> > > A continues function over the reals?

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> > Please bare with me here it was a long time since i did any math but i

> > do not think it was the sqrt function i was thinking about, could i

> > not write a function/algorithm describing y as the progression of the

> > sqrt serie without the squareroot function?

> > Where the function describe a progressional series as the difference

> > between each sqrt?

>

> So is there a graph function describing the difference between each

> square?

I have a slight memory it had something todo with power series, but

its gone.