例 按要求回答下列问题.
(1)计算.
$10^{2}× 10^{5}$
$10^{3}× 10^{5}$
$10^{4}× 10^{5}$
(2)怎样计算$10^{m}× 10^{n}$($m,n$是正整数)?
(3)当$m,n$是正整数时,$2^{m}× 2^{n}$等于什么?$\left(\frac{1}{2}\right)^{m}× \left(\frac{1}{2}\right)^{n}$呢?
(4)当$m,n$是正整数时,试计算$a^{m}\cdot a^{n}$.
$a^{m}\cdot a^{n}=\underbrace{(a\cdot a\cdot\cdots\cdot a)}_{( )个a}\cdot \underbrace{(a\cdot a\cdot\cdots\cdot a)}_{( )个a}=\underbrace{a\cdot a\cdot\cdots\cdot a}_{( )个a}=a^{( )}$
归纳小结:同底数幂的乘法运算性质是________.
拓展延伸:对于任意的底数$a$,当$m,n,p$是正整数时,$a^{m}\cdot a^{n}\cdot a^{p}=$________.
(1)计算.
$10^{2}× 10^{5}$
$10^{3}× 10^{5}$
$10^{4}× 10^{5}$
(2)怎样计算$10^{m}× 10^{n}$($m,n$是正整数)?
(3)当$m,n$是正整数时,$2^{m}× 2^{n}$等于什么?$\left(\frac{1}{2}\right)^{m}× \left(\frac{1}{2}\right)^{n}$呢?
(4)当$m,n$是正整数时,试计算$a^{m}\cdot a^{n}$.
$a^{m}\cdot a^{n}=\underbrace{(a\cdot a\cdot\cdots\cdot a)}_{( )个a}\cdot \underbrace{(a\cdot a\cdot\cdots\cdot a)}_{( )个a}=\underbrace{a\cdot a\cdot\cdots\cdot a}_{( )个a}=a^{( )}$
归纳小结:同底数幂的乘法运算性质是________.
拓展延伸:对于任意的底数$a$,当$m,n,p$是正整数时,$a^{m}\cdot a^{n}\cdot a^{p}=$________.
答案:(1)$10^{2}× 10^{5}=10^{2+5}=10^{7}$;$10^{3}× 10^{5}=10^{3+5}=10^{8}$;$10^{4}× 10^{5}=10^{4+5}=10^{9}$
(2)$10^{m}× 10^{n}=10^{m+n}$
(3)$2^{m}× 2^{n}=2^{m+n}$;$\left(\frac{1}{2}\right)^{m}× \left(\frac{1}{2}\right)^{n}=\left(\frac{1}{2}\right)^{m+n}$
(4)$m$;$n$;$m+n$;$m+n$
归纳小结:同底数幂相乘,底数不变,指数相加,即$a^{m}\cdot a^{n}=a^{m+n}$($m,n$是正整数)
拓展延伸:$a^{m+n+p}$
(2)$10^{m}× 10^{n}=10^{m+n}$
(3)$2^{m}× 2^{n}=2^{m+n}$;$\left(\frac{1}{2}\right)^{m}× \left(\frac{1}{2}\right)^{n}=\left(\frac{1}{2}\right)^{m+n}$
(4)$m$;$n$;$m+n$;$m+n$
归纳小结:同底数幂相乘,底数不变,指数相加,即$a^{m}\cdot a^{n}=a^{m+n}$($m,n$是正整数)
拓展延伸:$a^{m+n+p}$
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