1.6 The algebra of real numbers 17
11.(a
m)
n1 = 1 (a
n)
m1 = 1 a
m×n(g) (2
2)
31 = 1 (2
2) 1 × 1 (2
2) 1 × 1 (2
2) 1 = 12
2 × 31 = 12
6(h) (2
122)
21 = 12
(1 2 2)× 21 = 12
11 = 12
(i) (2
3)
4231 = 1 (2
423)
31 = 12
3 × 4231 = 12
4(j)
12.(ab)
m1 = 1 a
mb
m(k) (2 1 × 1 3)
21 = 12
21 × 13
2(l) (−8)
1231 = 1 (−1)
1231 × 18
1231 = 1 (−1) 1 × 121 = 1 − 2
0 Exercises 50–65
Example 1.13(h) shows that 2
1221 × 12
1221 = 12. It follows that , the square root
of 2. In general, for positive integer m, a
12 mis the mth root of a:
Thus, 2
123is a cube root of 2 because (2
123)
31 = 12
(1 2 3)× 31 = 12
11 = 12. More generally, for
rational exponentm 2 n, rule 11 gives
a
m 2 n1 = 1 (a
m)
12 n1 = 1 (a
12 n)
mor, equivalently,
so thata
m 2 nis both the nth root of the mth power of a and the mth power of the nth
root. For example,
4
3221 = 1 (4
3)
1221 = 1 (4
122)
31 = 18
Although the index rules have been demonstrated only for integral and rational
indices, they apply to all numbers written in the base–index form. When the exponent
mis a variable,a
mis called an exponential function (see Section 3.6 for real exponents
and Chapter 8 for complex exponents). Ifx 1 = 1 a
mthenm 1 = 1 log
axis the logarithm of
x to base a(see Section 3.7).
Rules of precedence for arithmetic operations
An arithmetic expression such as
21 + 131 × 14
is ambiguous because its value depends on the order in which the arithmetic
operations are applied. The expression can be interpreted in two ways:
(2 1 + 1 3) 1 × 141 = 151 × 141 = 120
aaa
mn n m n m==()
aa
1 m m=
22
12=
()2224
22 22 2===
×