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Express \( \sqrt{-64} \) as a complex number, in terms of \( i \) : \( \sqrt{-64}=\square \)

Ask by Rose John. in the United States
Jan 23,2025

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\( \sqrt{-64} = 8i \)

Solution

To express \( \sqrt{-64} \) as a complex number in terms of \( i \), follow these steps: 1. **Recognize the imaginary unit**: \[ i = \sqrt{-1} \] 2. **Factor the expression**: \[ \sqrt{-64} = \sqrt{64 \times (-1)} = \sqrt{64} \times \sqrt{-1} \] 3. **Simplify the square roots**: \[ \sqrt{64} = 8 \quad \text{and} \quad \sqrt{-1} = i \] 4. **Combine the results**: \[ \sqrt{-64} = 8i \] **Final Answer:** \[ \sqrt{-64} = 8i \]

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To express \( \sqrt{-64} \) as a complex number, we can use the fact that \( \sqrt{-1} \) is represented by \( i \). Therefore: \[ \sqrt{-64} = \sqrt{64} \cdot \sqrt{-1} = 8i \] So we have: \[ \sqrt{-64} = 8i \]

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