Rationalizing Denominators and Numerators of Radical Expressions

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Rationalizing Denominators and Numerators of Radical Expressions Section 10.5 Rationalizing Denominators and Numerators of Radical Expressions

Rationalizing Denominators Many times it is helpful to rewrite a radical quotient with the radical confined to ONLY the numerator. If we rewrite the expression so that there is no radical in the denominator, it is called rationalizing the denominator. This process involves multiplying the quotient by a form of 1 that will eliminate the radical in the denominator.

Example Rationalize the denominator.

Example Rationalize the denominator.

Example Rationalize the denominator of

Example Rationalize the denominator.

Conjugates Many rational quotients have a sum or difference of terms in a denominator, rather than a single radical. In that case, we need to multiply by the conjugate of the numerator or denominator (which ever one we are rationalizing). The conjugate uses the same terms, but the opposite operation (+ or –).

Example Rationalize the denominator.

Example Rationalize the denominator.