Question
Use the imaginary number \( i \) to rewrite the expression below as a complex number. Simplify all radicals. \[ 9-\sqrt{-93} \]
Ask by Bolton Moreno. in the United States
Jan 24,2025
Real Tutor Solution
Tutor-Verified Answer
Answer
The expression simplifies to \( 9 - i\sqrt{93} \).
Solution
To rewrite the expression \( 9 - \sqrt{-93} \) as a complex number using the imaginary unit \( i \), follow these steps:
1. **Understand the Imaginary Unit:**
The imaginary unit \( i \) is defined as \( i = \sqrt{-1} \). This allows us to express square roots of negative numbers in terms of \( i \).
2. **Rewrite the Square Root of a Negative Number:**
\[
\sqrt{-93} = \sqrt{93} \cdot \sqrt{-1} = \sqrt{93} \cdot i
\]
3. **Substitute Back into the Original Expression:**
\[
9 - \sqrt{-93} = 9 - \sqrt{93} \cdot i
\]
4. **Simplify the Expression:**
The expression is already in its simplest form since \( \sqrt{93} \) cannot be simplified further (93 factors into 3 and 31, both of which are prime numbers).
**Final Answer:**
\[
9 - i\,\sqrt{93}
\]
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Simplify this solution Bonus Knowledge
To rewrite the expression \( 9-\sqrt{-93} \) as a complex number, we start by recognizing that the square root of a negative number can be expressed using the imaginary unit \( i \). First, we rewrite the radical: \[ \sqrt{-93} = \sqrt{93} \cdot \sqrt{-1} = \sqrt{93} i. \] Now, substitute this back into the original expression: \[ 9 - \sqrt{-93} = 9 - \sqrt{93} i. \] Thus, the expression \( 9 - \sqrt{-93} \) simplifies to: \[ 9 - \sqrt{93} i. \] So the final answer as a complex number is: \[ 9 - \sqrt{93} i. \]
