Multiply rational expressions.
Use the same properties to multiply and divide rational expressions as you would with numerical fractions.
Pg. 662 (11 – 26 all)
Divide rational expressions. Simplify complex fractions.
A complex fraction is a fraction that contains one or more fractions in its numerator, in its denominator, or both. Simplify a complex fraction by dividing its numerator by its denominator.
Pg. 662 (32 – 38 all, 41 – 45 all)