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Chapter 5: Problem 61

Rationalize the denominator. \(\frac{12}{\sqrt{30}}\)

Short Answer

Expert verified
The rationalized form of \(\frac{12}{\sqrt{30}}\) is \( \frac{2\sqrt{30}}{5}\).

Step by step solution

01

Analyze the Fraction.

The given fraction is \( \frac{12}{\sqrt{30}} \). The denominator needs to be made rational. To rationalize, the bottom (denominator) of the given fraction needs to be multiplied by the square root of 30 which also needs to be done for the top (numerator).
02

Multiply by the rationalization factor.

Now multiply the original fraction by the rationalizing fraction \( \frac{\sqrt{30}}{\sqrt{30}} \), which is equivalent to 1 and doesn't change the value of our original fraction. \( \frac{12}{\sqrt{30}} \) * \( \frac{\sqrt{30}}{\sqrt{30}} \) which gives \( \frac{12\sqrt{30}}{30} \).
03

Simplify the Fraction.

Now, simplify the resultant fraction. The number 30 can be divided by 6 and so can the number 12. After dividing both numbers by 6, the simplified fraction becomes \( \frac{2\sqrt{30}}{5} \).

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