Q&A for How to Rationalize the Denominator

Something like 1/(1+root2 + root3)? If so, group as 1+(root2 + root3) and multiply through by the "difference of squares conjugate" 1-(root2 + root3). That makes the denominator -4 - root6, which is still irrational, but did improve from two irrational terms to only one. So repeat the same trick by multiplying through by -4+root6 and the denominator is rationalized.

If you're asking about the dots that are placed between various fractions, those are multiplication signs. For example, in the article's second image we see (7√3) / (2√7), then a dot, then (√7 / √7). That means we multiply the first fraction by the second fraction (numerator times numerator, and denominator times denominator), giving us (7√21) / 14, which simplifies to √21 / 2. (Incidentally, the article shows some other dots that are not between fractions. Those are merely "bullet points.")

If it is a binomial expression, follow the steps outlined in method 2.

This is a little trickier, but can be done. Multiply top and bottom by (cuberoot 25 + cuberoot 15 + cuberoot 9) and the denominator simplifies to 2. This trick is analogous to the quadratic case since it uses the difference of cubes factorization of 5-3, whereas the quadratics use the difference of squares factorization.

Multiply both the numerator and denominator by the conjugate of the denominator, which is √11 + 3. The expression becomes (√11 + 3) / 11 - 9, or (3 + √11) / 2.