Simplifying with Exponents (2)

04.07

Diposting oleh Melany Christy

Definition: (x/y)^a = x^a/y^a

When this works: A quotient in parentheses that is raised to a power.

Examples of when to use the Power of a Quotient Rule:

(x/5)⁴
(6/e)¹⁰
(ab ÷ 180)³

Notice that the numerator and denominator can be different.

1. Power of a Quotient Rule and Constants

Simplify (18/6)⁴.

(18/6)⁴ = 18⁴/6⁴ = 104976/1296 = 81

Why Does this Work?

Rewrite (18/6)⁴:

(18/6)⁴ = (18/6) * (18/6) * (18/6) * (18/6)

Multiply:

104976/1296 = 81

2. Power of a Quotient Rule and Variables

Simplify (j/k)³.

(j/k)³= j³/k³

Why does this work?

Rewrite (j/k)³

(j/k)³= (j/k)*(j/k)*(j/k)Multiply numerators and multiply denonominators:

j * j * j = j³

k * k * k = k³

Bring the numerator and denominator together.

j³/k³

3. Power of a Quotient Rule Practice

Power of a Quotient Rule: (x/y)^a = x^a/y^a

Simplify:

1. (36/49)^1/2

2. (ab ÷ 180)³

3. (-5/p)³

4. (-f/g)⁷

5. (e/20)^-1

6. (xy/Π)¹⁰

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