Pregunta
se the imaginary number \( i \) to rewrite the expression below as a complex number Il radicals. \( -\sqrt{-90} \)
Ask by Daniels Martin. in the United States
Jan 24,2025
Solución de tutoría real
Respuesta verificada por el tutor
Responder
\(-3\sqrt{10}i\)
Solución
To rewrite the expression \(-\sqrt{-90}\) 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 the square root of a negative number in terms of \(i\).
2. **Rewrite the Expression**:
\[
-\sqrt{-90} = -\sqrt{90} \cdot \sqrt{-1} = -\sqrt{90} \cdot i
\]
3. **Simplify \(\sqrt{90}\)**:
Factor 90 to simplify the square root:
\[
\sqrt{90} = \sqrt{9 \times 10} = \sqrt{9} \cdot \sqrt{10} = 3\sqrt{10}
\]
4. **Combine the Results**:
Substitute back into the expression:
\[
-\sqrt{-90} = -3\sqrt{10} \cdot i
\]
So, the expression \(-\sqrt{-90}\) rewritten as a complex number is:
\[
-3\sqrt{10}\,i
\]
**Answer:** \(-3\,\sqrt{10}\,i\)
Revisado y aprobado por el equipo de tutoría de UpStudy
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Simplifique esta solución Beyond the Answer
To rewrite \(-\sqrt{-90}\) as a complex number, we start by pulling out the imaginary unit \(i\). We can express this as: \[ -\sqrt{-90} = -\sqrt{90} \cdot \sqrt{-1} = -\sqrt{90} \cdot i \] Next, simplifying \(\sqrt{90}\), we see that \(\sqrt{90} = \sqrt{9 \cdot 10} = 3\sqrt{10}\). Hence, \[ -\sqrt{-90} = -3\sqrt{10} \cdot i \] So, the complex number representation is \(-3\sqrt{10}i\). Now you have a nice complex number instead of a cumbersome expression! Keep this in mind that whenever you see a negative sign under a square root, just pull out that \(i\) and simplify with good vibes!
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