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Can a number have more than one cube root explain? - Answers
Yes, a number can have more than one cube root, but the situation varies depending on whether we are considering real or complex numbers. In the realm of real numbers, every non-zero number has one real cube root. However, in the context of complex numbers, every number has three distinct cube roots due to the properties of complex exponentiation. For example, the cube roots of 1 are 1, ( \frac{-1 + \sqrt{3}i}{2} ), and ( \frac{-1 - \sqrt{3}i}{2} ).
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Can a number have more than one cube root explain? - Answers
Yes, a number can have more than one cube root, but the situation varies depending on whether we are considering real or complex numbers. In the realm of real numbers, every non-zero number has one real cube root. However, in the context of complex numbers, every number has three distinct cube roots due to the properties of complex exponentiation. For example, the cube roots of 1 are 1, ( \frac{-1 + \sqrt{3}i}{2} ), and ( \frac{-1 - \sqrt{3}i}{2} ).
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Can a number have more than one cube root explain? - Answers
Yes, a number can have more than one cube root, but the situation varies depending on whether we are considering real or complex numbers. In the realm of real numbers, every non-zero number has one real cube root. However, in the context of complex numbers, every number has three distinct cube roots due to the properties of complex exponentiation. For example, the cube roots of 1 are 1, ( \frac{-1 + \sqrt{3}i}{2} ), and ( \frac{-1 - \sqrt{3}i}{2} ).
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