Use the like bases property to solve the equation $$ 9^{x}=\frac{1}{243} $$ $$ x=\square $$

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To solve the equation $$ 9^{x} = \frac{1}{243} $$ using the like bases property, we first need to express both sides of the equation with the same base.

1. **Identify the bases**:
   - The left side is $$ 9 $$, which can be expressed as $$ 3^2 $$.
   - The right side $$ 243 $$ can be expressed as $$ 3^5 $$ since $$ 3^5 = 243 $$. Therefore, $$ \frac{1}{243} = 3^{-5} $$.

2. **Rewrite the equation**:
   $$
   9^{x} = \frac{1}{243} \implies (3^2)^{x} = 3^{-5}
   $$

3. **Apply the power of a power property**:
   $$
   3^{2x} = 3^{-5}
   $$

4. **Set the exponents equal to each other** (since the bases are the same):
   $$
   2x = -5
   $$

5. **Solve for $$ x $$**:
   $$
   x = \frac{-5}{2}
   $$

Thus, the solution is:
$$
x = -\frac{5}{2}
$$
$$ x = -\frac{5}{2} $$

Use the like bases property to solve the equation \( 9^{x}=\frac{1}{243} \) \( x=\square \)

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