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**Au101****Member**- Registered: 2010-12-01
- Posts: 270

Sorry to but in, but I was just browsing and couldn't resist the chance to do some algebra and show how bob bundy's and bobbym's answers are the same:

*Last edited by Au101 (2013-08-05 03:47:43)*

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**Au101****Member**- Registered: 2010-12-01
- Posts: 270

Sorry, posted that before I saw bob bundy had done the same thing

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**bob bundy****Moderator**- Registered: 2010-06-20
- Posts: 6,092

That's OK. Great minds think alike and all that.

I now have a diagram for my statement about the position of mathematica in the hierarchy of intelligence, etc.

Bob

You cannot teach a man anything; you can only help him find it within himself..........Galileo Galilei

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**bobbym****Administrator**- From: Bumpkinland
- Registered: 2009-04-12
- Posts: 81,429

I will have to concede that is probably true.

**In mathematics, you don't understand things. You just get used to them.I have the result, but I do not yet know how to get it.All physicists, and a good many quite respectable mathematicians are contemptuous about proof.**

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**bob bundy****Moderator**- Registered: 2010-06-20
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OK. Don't get me wrong. It's a useful tool but that's all. I'm a better driver than my car. Last time it tried driving on its own there was a right crunch.

Bob

You cannot teach a man anything; you can only help him find it within himself..........Galileo Galilei

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**EbenezerSon****Member**- Registered: 2013-07-04
- Posts: 230

Au101 wrote:

Where from the negative or positive sign in front of the root sign?

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**bobbym****Administrator**- From: Bumpkinland
- Registered: 2009-04-12
- Posts: 81,429

Look at post #23, he is continuing from there.

**In mathematics, you don't understand things. You just get used to them.I have the result, but I do not yet know how to get it.All physicists, and a good many quite respectable mathematicians are contemptuous about proof.**

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**Au101****Member**- Registered: 2010-12-01
- Posts: 270

Yep, because a negative number times a negative number is a positive number, so:

Try it:

Therefore, when we 'undo' the squaring, by square rooting, the answer could be positive, or negative. The square root of 4 is either 2, or -2. We can't tell.

Again:

Edit: this is why bobbym's original solution had two answers

And:

Which is the same as:

*Last edited by Au101 (2013-08-05 05:06:24)*

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**EbenezerSon****Member**- Registered: 2013-07-04
- Posts: 230

bob bundy wrote:

Still I cant grasp why there is positive and negative sign before the root.

I have other questions but want this cleared.

Amen.

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**bobbym****Administrator**- From: Bumpkinland
- Registered: 2009-04-12
- Posts: 81,429

When you take a square root of a number there are two possible roots. (-3)(-3) = 9 and (3)(3)=9

**In mathematics, you don't understand things. You just get used to them.I have the result, but I do not yet know how to get it.All physicists, and a good many quite respectable mathematicians are contemptuous about proof.**

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**bob bundy****Moderator**- Registered: 2010-06-20
- Posts: 6,092

eg. √9 = 3

But this is not the only square root of 9.

-3 x -3 = 9 as well, so √9 = -3 is also correct.

to show you have got all possible answers you write

Let's look at an actual question.

Consider the graph y = x^2

Find x when y = 9

see graph below.

If you said x = 3, you would loose some marks because you hadn't given all the possible values.

Bob

You cannot teach a man anything; you can only help him find it within himself..........Galileo Galilei

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**anonimnystefy****Real Member**- From: The Foundation
- Registered: 2011-05-23
- Posts: 14,812

Actually,

only, but both 3 and -3 satisfy the equation .Here lies the reader who will never open this book. He is forever dead.

Taking a new step, uttering a new word, is what people fear most. ― Fyodor Dostoyevsky, Crime and Punishment

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**Au101****Member**- Registered: 2010-12-01
- Posts: 270

anonimnystefy wrote:

Actually,

only, but both 3 and -3 satisfy the equation .

Excellent technical observation, we should, really, say that:

However, it is true to say that the square root of 9 is plus or minus 3. The problem we have is that the sign √ refers to the principal square root only.

This does make the thing a little harder to understand, though

Suffice it to say that when we square root both sides of an equation, we must include the ± sign, as an equation of the form:

Has two solutions.

*Last edited by Au101 (2013-08-05 05:54:17)*

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**bobbym****Administrator**- From: Bumpkinland
- Registered: 2009-04-12
- Posts: 81,429

Hi;

I knew that about the principal square root and should have phrased post #35 better. Sorry for the confusion.

I have the result, but I do not yet know how to get it.

All physicists, and a good many quite respectable mathematicians are contemptuous about proof.

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**bob bundy****Moderator**- Registered: 2010-06-20
- Posts: 6,092

Interesting.

When I use this: √, I have always meant 'the square root of' and never worried about the term 'principle square root'. Somehow I've managed. This probably means that the same error has occurred before in one of my posts, but no one noticed. I'll try to stick to the convention in future, but I cannot promise I'll succeed.

If you read the Wiki article on square roots

http://en.wikipedia.org/wiki/Square_root

you'll see it all starts nicely, with the principle root defined and then it gets in a muddle when complex roots are introduced.

Bob

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**Au101****Member**- Registered: 2010-12-01
- Posts: 270

I agree, it was sloppy phrasing on my part as well. Although, bobbym, I think your post #35 was correct. 9 does have two square roots (the principal root being 3, the other being -3) the problem is that the notation √9 gives us the principal square root. This is why we have to write the ± sign before the radical.

Thus ± √9 = ±3 and √9 = 3.

But "the square root of nine is plus, or minus, three" is correct (or, perhaps I should say "the square roots of 9 are..."). It is a problem of formal notation that we have, I believe - if I have understood everything correctly.

*Last edited by Au101 (2013-08-05 06:27:30)*

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**bob bundy****Moderator**- Registered: 2010-06-20
- Posts: 6,092

hi

It matters when you are labelling the button on a calculator. Some of us are old enough to remember when there was no such thing (as a calculator). Has this convention come about because calculators and computers have to generate single values? It would be interesting to know if the convention existed pre-1960.

Bob

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**Au101****Member**- Registered: 2010-12-01
- Posts: 270

I would imagine it dates back to early geometry. If, say, you're trying to calculate the length of a hypotenuse, you're not interested in the negative values. I imagine this general precedence of the principal square root was incorporated into the notation when it was defined. Because, of course, we define our notation to be useful to us and easy to work with. But, without realising it, you've always been using the convention whenever you've gone:

If it weren't for the fact that the √ sign only referred to the principal value, you wouldn't need the ±, that would be implied by the √. Then you could just write:

It's just the way we learn to think about it conceptually

*Last edited by Au101 (2013-08-05 06:38:06)*

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**Au101****Member**- Registered: 2010-12-01
- Posts: 270

Another way to think about it is if √25 = ± 5, then the ±'s would cancel each other out. You would have:

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**zetafunc.****Guest**

Au101 wrote:

Another way to think about it is if √25 = ± 5, then the ±'s would cancel each other out. You would have:

Surely

?**anonimnystefy****Real Member**- From: The Foundation
- Registered: 2011-05-23
- Posts: 14,812

Again, the square root returns only the principal value by convention, not because it would cause contradiction otherwise.

*Last edited by anonimnystefy (2013-08-05 08:25:14)*

Here lies the reader who will never open this book. He is forever dead.

Taking a new step, uttering a new word, is what people fear most. ― Fyodor Dostoyevsky, Crime and Punishment

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**Au101****Member**- Registered: 2010-12-01
- Posts: 270

Hmmmm....on second thought, maybe? I'm not sure. My original thinking was that when the first ± is +, so is the second one and when the first ± is -, so is the second one. So, for example:

When the first ± is +, so is the second one and when the first ± is -, so is the second one. So we have:

Hence the need for a ∓ sign. In this case we would have +(+5) or -(-5) and only these options. But it seems reasonable to be able to say:

So, yes, I think you're right. Ignore my second post. The first one still stands, though, I think

But yes, anonimnystefy is right. Sorry for confusing the matter further, the important thing to note is √x is always the positive, principal root, hence the need for the ± sign before the radical sign.

*Last edited by Au101 (2013-08-05 08:26:57)*

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**zetafunc.****Guest**

bob bundy wrote:

Interesting.

When I use this: √, I have always meant 'the square root of' and never worried about the term 'principle square root'. Somehow I've managed. This probably means that the same error has occurred before in one of my posts, but no one noticed. I'll try to stick to the convention in future, but I cannot promise I'll succeed.

If you read the Wiki article on square roots

[link]

you'll see it all starts nicely, with the principle root defined and then it gets in a muddle when complex roots are introduced.

Bob

It can become quite a complex issue (pun not intended). For example, I did this problem via contour integration:

Naturally, the first step is to compute the sum of the residues of that function. Tell Mathematica to do that, and it won't give you the correct answer, thanks to the square root.

**bob bundy****Moderator**- Registered: 2010-06-20
- Posts: 6,092

So does power one half mean take the principle value as well?

ie is the following true

Generally what about other fractional powers?

eg.

Bob

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**anonimnystefy****Real Member**- From: The Foundation
- Registered: 2011-05-23
- Posts: 14,812

I'd say so.

Here lies the reader who will never open this book. He is forever dead.

Taking a new step, uttering a new word, is what people fear most. ― Fyodor Dostoyevsky, Crime and Punishment

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