To determine which statement is true about a quotient, it would be essential to have the actual quotient to analyze. However, based on the options given, we can clarify some concepts:
- A. The quotient is equal to -10. This statement could be true if the specific numerator and denominator make their division equal to -10.
- B. The quotient is undefined because the denominator is zero. This statement is true if the denominator of the quotient is indeed zero, as division by zero is undefined in mathematics.
- C. The quotient is equal to 0. This could be true if the numerator is zero and the denominator is not zero.
- D. The quotient is undefined because the numerator is negative. This statement is false; a negative numerator does not cause a quotient to be undefined.
Without specific numbers to analyze, the only definitive statement that can be made based on the general properties of quotients is: If the denominator is zero, then the quotient is indeed undefined.
If you provide the actual quotient, I can give a more tailored response.
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