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Disclosure: This is homework, but not part of the homework. This is just something that I do not understand.

$$ x = \sqrt{\frac{5}{3}} $$

$$ x = \frac{\sqrt{15}}{3} $$

Could anyone please explain this to me?

Thanks in advance.

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    See also this post: http://math.stackexchange.com/questions/47748/fractions-with-radicals-in-the-denominator/47855#478552011-11-13
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    BTw, you can use LaTeX makeup by starting with an \$ and ending with another \$, for instance `$\sqrt{\frac{5}{3}}$` becomes $\sqrt{\frac{5}{3}}$.2011-11-13
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    If you only want to *verify* that the two are the same, (note that both are positive and) square them: $x^2$ in the former is $\displaystyle \frac{5}{3}$ and in the latter is $\displaystyle \frac{15}{9}$ and you probably know how to verify that the two are the same.2011-11-13

3 Answers 3

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$$ x= \sqrt{\frac{5}{3}} = \frac{\sqrt{5}}{\sqrt{3}} =\frac{\sqrt{5} \times\sqrt{3} }{\sqrt{3}\times \sqrt{3}} = \frac{\sqrt{15}}{3}$$

This is called rationalizing the denominator, you can practice more here.

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If you have the root $\sqrt{5/3}$, you can simply extend by three, yielding $\sqrt{15/9}$. Then you can proceed by the laws for roots and get $$\sqrt{15\over9} = \frac{\sqrt{15}}{\sqrt9} = \frac{\sqrt{15}}3$$

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    what is "extend by 3"?2011-11-13
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    @Max ${5\over3}\to{15\over9}$2011-11-13
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Multiply top and bottom of the fraction by $\sqrt{3}$ and you get $\sqrt{3} \cdot \sqrt{5}=\sqrt{15}$ on top and $\sqrt{3} \cdot \sqrt{3}=3$ on the bottom. The trick is to multiply the fraction by the bottom square root, thus getting rid of the square root in the bottom of the fraction. Mathematicians don't like square roots on the bottom of fraction :)

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    "Mathematicians don't like square roots on the bottom of fraction :)" - I am arguably not a mathematician, but I prefer $\sqrt{5/3}$ to $\sqrt{15}/3$; in fact, writing $\sin 45^{\circ} = \sqrt{2}/2$ instead of $1/\sqrt{2}$ looks funny to me. I think it is high school math teachers who have some (unnecessary, IMO) aversion to denominators containing radical signs.2011-11-13
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    I was only joking if you notice the smile ":)"2011-11-13
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    Yes, I did recognize that you were joking. But considering that this site will be visited by new users as well, it's good to point that out explicitly as well, I feel.2011-11-13
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    fair enough , but I am a new user too, so I think you can let me off this time :)2011-11-13
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    Sorry if I came across as picky. I didn't intend to fault you when I wrote that comment; just clarifying my stand. =)2011-11-13