Section 4: Rational Exponents

It is important the you watch this video first.

Definition of a Rational Exponent.

am/n  = (n√a)m 


In general, if  n squared a is a real number, then

a1/n =  n squared a
 

The denominator of a fractional exponent is equal to the index of the radical. 

So 81/3  is the exponential form of the cube root of 8, and  3 squared 8 is its radical form.

Next, we ask: what sense can we make of a symbol like a2/3? According to the rules of exponents:

a2/3 = (a1/3)2  or a2/3 = (a2)1/3


 Example:

Use can use either of these rules to simplify the expression 82/3 as shown below.

Solution:

82/3 = (81/3)2 = 22 = 4

or

82/3 = (82)1/3 = 641/3 = 4


Notice that we get the same answer either way. However, to evaluate a fractional power, it is more efficient to take the root first.

take the root first

 

The denominator of a fractional exponent indicates the root.

Specifically,     a1/3 or in general: a=m/n

 

Notice:   The index of the radical becomes the denominator of the rational power, and the exponent of the radicand (expression inside the radical) becomes the numerator. 


 

Test Your Knowledge by opening up the Test Yourself Activity.

Click to go to test

 

 

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