Chapter P, Prerequisites - Section P.3 - Integer Exponents and Scientific Notation - P.3 Exercises - Page 24: 48

a) negative (-) b) positive (+) c) negative (-) d) negative (-) e) positive (+) f) negative (-)

Note: When a negative number is taken to an even power, the result is positive, and when it is taken to an odd power, the result is negative. a) Since b is a negative number, and it is taken to an odd power, the result will still be negative. b) Since b is a negative number, and it is taken to an even power, the result will be positive. c) Since a is positive, b squared is a positive number (a negative number taken to an even power), and c is a negative number (a negative number taken to an odd power), the result is a positive number times a positive number times a negative number, which is a negative number (for example, $3\times 4\times-5$ is a negative number.) d) Since b is negative, and a is positive, the result of $b - a$ is negative. This negative number is taken to an odd power, which makes the result negative. e) As stated in part d), $b - a$ is negative. Since it is taken to an even power, it is positive. f) Since a is a positive number, a cubed is also positive. Since c is a negative number, c cubed is negative. Therefore, when multiplied together, the product is negative. Both b to the sixth power and c to the sixth power are both negative, so when multiplied together, the result is positive. When the positive numerator is divided by the negative denominator, the result is negative.