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In order for a multivariate function to be invertible, what condition must be satisfied? 1) The function must be one-to-one 2) The function must be onto 3) The function must be …

In order for a multivariate function to be invertible, what condition must be satisfied? 1) The function must be one-to-one 2) The function must be onto 3) The function must be …
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In order for a multivariate function to be invertible, what condition must be satisfied?

1) The function must be one-to-one
2) The function must be onto
3) The function must be both one-to-one and onto
4) The function must be neither one-to-one nor onto

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User Lgvalle
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1 Answer

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Final answer:

In order for a multivariate function to be invertible, the condition that must be satisfied is that the function must be both one-to-one and onto.

Step-by-step explanation:

In order for a multivariate function to be invertible, the condition that must be satisfied is that the function must be both one-to-one and onto.

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User Huitlarc
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