- Things to Learn
- Know the definition of a number raised to a negative exponent.
- Simplify and write equivalent expressions that contain negative exponents.
Exploring Negative Exponents Warm-Up
Defining Negative Exponents
[shc_shortcode class=”shc_mybox”]For any nonzero number `x`, and for any positive integer `n`, we define `x^(−n)` as `1/(x^n)`
Note that this definition of negative exponents says `x^(−1)` is just the reciprocal of `x` — `1/x`.
As a consequence of the definition, for a nonnegative `x` and all integers `b` we get `x^(-b) = 1/(x^b)`.[/shc_shortcode]
Exercise and Practice(PDF printable)
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We accept that for nonzero numbers `x` and `y` and all integers `a` and `b`,
`x^a * x^b = x^(a+b)`
`(x^b)^a = x^(ab)`
`(xy)^a = x^ay^a`.
We claim:
`x^a/x^b = x^(a-b)` for all integers `a, b`.
`(x/y)^a = x^a/y^a` for any integer `a`.
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