Nonexp.html

NON-INTEGER EXPONENTS

Objective: To extend the definition of xn to non-integer exponents..

Recall 1: The square root of 5, is a number b, such that b*b = 5.
Similarly, the cube root of 5 is a number b such that b*b*b =5, and the n-th root of 5 is a number b such that

In general the n-th root of a is denoted by

In particular, if n = 2, then the notation is just plain sqrt(a).

Recall 2: Remember that

This means that 1/a multiplied to itself n times gives 1/(a^n). This number must be the n-th root of a, because that is how the n-th root of a was defined. So,

Recall 3: By knowing that

we also know what a^(m/n) means, since

Note

For this to make sense, we must have n > 0, a different from 0 and a^(1/n) be a real number. Notice that a^(1/n) is not a real number if n is even and a < 0. Take the case where a = -1 and n = 2. In that case we would be looking for a number sqrt(-1), where sqrt(-1)*sqrt(-1)= -1. Remember that if you multiply any real number by itself you must get a non-negative number.

Note
If m/n > 0, then 0^(m/n)= 0.

Examples

Example 1. Compute the values of

(a) 8^(4/3) (b) 9^(-3/2) (c) (-27)^(4/3).

Solution:

(a) 8^(4/3) = [8^(1/3)]^4=2^4=16,

(b) 9^(-3/2) =[9^(-1/2)]^3=(1/3)^3=1/27 ,

Note
If Example 1 c) had been (-27)^(3/4), then we would have to say that it is not a real number because (-27)^(1/4) is the 4-th root of a negative number, which does not exist.

Example 2. Write the expression as a fractional exponent.

Solution: The expression may be rewritten as . Apply Recall 3, to write it as (5*x)^(3/2).

Example 3. Write the expression as a fractional exponent.

Solution: Work from the inside out. Applying Recall 3 to sqrt(x^5), we may rewrite it as x^(5/2), so that the original expression becomes sqrt(x^(5/2)).
Apply Recall 3 once again, to write sqrt(x^(5/2)) as x^(5/4) .

Example 4 Write the expression as a fractional exponent.