Chapter 1 - Introduction to Algebraic Expressions - 1.7 Multiplication and Division of Real Numbers - 1.7 Exercise Set - Page 59: 144

(a) Among $m$ and $n$ only one must be negative. (b) Among $m$ and $n$ one of them must zero. (c) Among $m$ and $n$, either they both must be positive or they both must be negative.

(a) We get a positive answer if we have even negative signs. Since we already have one negative sign. Among $m$ and $n$ only one must be negative. (b) If we multiply zero in any real number we get zero. So, among $m$ and $n$ one of them must zero. (c) We get a negative answer if we have odd negative signs. Since we already have one negative sign. Among $m$ and $n$, either they both must be positive or they both must be negative.