如何计算乘法指数。
对于具有相同底数的指数,我们应该将指数相加:
a n ⋅ a m = a n+m
例子:
23 ⋅ 24 = 23+4 = 27 = 2⋅2⋅2⋅2⋅2⋅2⋅2 = 128
当底数不同且 a 和 b 的指数相同时,我们可以先乘 a 和 b:
a n ⋅ b n = (a ⋅ b) n
例子:
32 ⋅ 42 = (3⋅4)2 = 122 = 12⋅12 = 144
当底数和指数都不同时,我们需要先计算每个指数,然后再乘:
a n ⋅ b m
例子:
32 ⋅ 43 = 9 ⋅ 64 = 576
对于具有相同底数的指数,我们可以将指数相加:
a -n ⋅ a -m = a -(n+m) = 1 / a n+m
例子:
2-3 ⋅ 2-4 = 2-(3+4) = 2-7 = 1 / 27 = 1 / (2⋅2⋅2⋅2⋅2⋅2⋅2) = 1 / 128 = 0.0078125
当底数不同且 a 和 b 的指数相同时,我们可以先乘 a 和 b:
a -n ⋅ b -n = (a ⋅ b) -n
例子:
3-2 ⋅ 4-2 = (3⋅4)-2 = 12-2 = 1 / 122 = 1 / (12⋅12) = 1 / 144 = 0.0069444
当底数和指数都不同时,我们需要先计算每个指数,然后再乘:
a -n ⋅ b -m
例子:
3-2 ⋅ 4-3 = (1/9) ⋅ (1/64) = 1 / 576 = 0.0017361
乘法具有相同底数分数的指数:
(a / b) n ⋅ (a / b) m = (a / b) n+m
例子:
(4/3)3 ⋅ (4/3)2 = (4/3)3+2 = (4/3)5 = 45 / 35 = 4.214
乘法具有相同指数分数的指数:
(a / b) n ⋅ (c / d) n = ((a / b)⋅(c / d)) n
例子:
(4/3)3 ⋅ (3/5)3 = ((4/3)⋅(3/5))3 = (4/5)3 = 0.83 = 0.8⋅0.8⋅0.8 = 0.512
乘法具有不同底数和指数分数的指数:
(a / b) n ⋅ (c / d) m
(4/3)3 ⋅ (1/2)2 = 2.37 ⋅ 0.25 = 0.5925
乘法具有相同分数指数的指数:
a n/m ⋅ b n/m = (a ⋅ b) n/m
例子:
23/2 ⋅ 33/2 = (2⋅3)3/2 = 63/2 = √(63) = √216 = 14.7
乘法具有相同底数分数的指数:
a (n/m) ⋅ a (k/j) = a [(n/m)+(k/j)]
例子:
2(3/2) ⋅ 2(4/3) = 2[(3/2)+(4/3)] = 7.127
乘法具有不同指数和分数的指数:
a n/m ⋅ b k/j
2 3/2 ⋅ 24/3 = √(23) ⋅ 3√(24) = 2.828 ⋅ 2.52 = 7.127
对于具有相同底数的指数,我们可以将指数相加:
(√a)n ⋅ (√a)m = a(n+m)/2
例子:
(√5)2 ⋅ (√5)4 = 5(2+4)/2 = 56/2 = 53 = 125
对于具有相同底数的指数,我们可以将指数相加:
xn ⋅ xm = xn+m
例子:
x2 ⋅ x3 = (x⋅x) ⋅ (x⋅x⋅x) = x2+3 = x5