Question
Use the imaginary number \( i \) to rewrite the expression below as a complex number. Simplify all radicals. \( -18+\sqrt{-33} \) \begin{tabular}{|c|c|}\hline \\ \hline\( i \) & \\ \hline\end{tabular}
Ask by Chandler Phillips. in the United States
Jan 24,2025
Real Tutor Solution
Tutor-Verified Answer
Answer
\( -18 + \sqrt{33}\,i \)
Solution
To rewrite the expression \( -18 + \sqrt{-33} \) as a complex number using the imaginary unit \( i \), follow these steps:
1. **Identify the Imaginary Part:**
The term \( \sqrt{-33} \) involves a square root of a negative number. Recall that \( \sqrt{-1} = i \). Therefore:
\[
\sqrt{-33} = \sqrt{33} \cdot \sqrt{-1} = \sqrt{33} \, i
\]
2. **Rewrite the Expression:**
Substitute \( \sqrt{-33} \) with \( \sqrt{33} \, i \) in the original expression:
\[
-18 + \sqrt{-33} = -18 + \sqrt{33} \, i
\]
3. **Final Complex Number:**
The expression is now written in standard form for a complex number \( a + b i \), where \( a = -18 \) and \( b = \sqrt{33} \).
\[
-18 + \sqrt{33}\,i
\]
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Simplify this solution Mind Expander
To rewrite the expression \( -18 + \sqrt{-33} \) as a complex number, we first separate the real and imaginary parts. We know that \( \sqrt{-33} \) can be expressed as \( \sqrt{33} \cdot i \). Therefore, we can rewrite the expression as: \[ -18 + \sqrt{-33} = -18 + \sqrt{33} \cdot i \] Thus, the expression simplifies to: \[ -18 + \sqrt{33} i \] Now, this is in the form of a complex number \( a + bi \) where \( a = -18 \) and \( b = \sqrt{33} \). The final answer is: \[ -18 + \sqrt{33} i \]
