Linear Sentences in One Variable
Radicals and Complex Numbers
Radicals are the undoing of exponents. In other words, since 2 squared is 4, radical 4 is 2. The radical sign,
, is used to indicate “the root” of the number beneath it. If the radical sign is unmodified by a number, then it is the square root of the number under the sign that is being sought. When operating arithmetically on radicals, the radical behaves as if it were a variable.
Complex numbers are natural partners of radicals. They result from finding the radical of a negative expression. The imaginary number,
i, is used to represent the square root of 1. So, 3
i expresses the simplification of
.
The expression
is called a
radical expression. The symbol
is called the
radical sign. The expression under the radical sign is called the
radicand, and
n, an integer greater than 1, is called the
index. If the radical expression appears without an index, the index is assumed to be 2. The expression
is read as “the
nth root of
a.” Remember:
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Example 1: Simplify each of the following.
|
-
If
, then
x2 = 25.
Because x could be either value, a rule is established. If a radical expression could have either a positive or a negative answer, then you always take the positive. This is called the “principal root.” Thus,
-
If
, then
-
If
, then
-
If
, then
-
If
, then
x2 = −4. There is no real value for
x, so
is not a real number.
Following are true statements regarding radical expressions.
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When variables are involved, absolute value signs are sometimes needed.
Example 2: Simplify
.
It would seem that
. But there is no guarantee that
x is nonnegative. Because of this,
is expressed as |
x|, which guarantees that the result is nonnegative.
Absolute value signs are never used when the index is odd. Absolute value signs are sometimes used when the index is even, at those times when the result could possibly be negative.
Example 3: Simplify the following, using absolute value signs when needed.
|
-
Since 2 x2 y6 could not be negative even if x or y were negative, absolute value signs are not needed.
-
Since the expression could be negative if y were negative, a correct way to represent the answer is |2 x2 y5|. Because only y could have caused the answer to be negative, another way to represent the answer is 2 x2| y|5.
-
Absolute value signs are never used when the index is odd.
