1.
a) \(3^4\times3^5\times3^6=3^{4+5+6}=3^{15}\)

b) \(5^2\times5^4\times5^5\times25=5^2\times5^4\times5^5\times5^2=5^{2+4+5+2}=5^{13}\)

c) \(10^8\div10^3=10^{8-3}=10^5\)

d) \(a^7\div a^2=a^{7-2}=a^5\)

2.

\(987=900+80+7\\ =9\times100+8\times10+7\\ =9\times10^2+8\times10^1+7\times10^0\)

\(2021=2000+20+1\\ =2\times1000+2\times10+1\times1\\ =2\times10^3+2\times10^1+1\times10^0\)

\(abcde=a\times10000+b\times1000+c\times100+d\times10+e\times1\\ =a\times10^4+b\times10^3+c\times10^2+d\times10^1+e\times10^0\)

a) \(7^{15}\)

b)\(162^8\).    2

c)\(10^8\)

d) \(a^0\)

Xin lỗi nha mk hơi vội nên có sai thì bạn châm trc cho mk nha.

Đặt A=1010+10102+...+10102015A=1010+10102+...+10102015

Dễ thấy 1010≡4(mod7)1010≡4(mod7)

Nên A≡4+410+4102+...+4102014A≡4+410+4102+...+4102014

Dễ chứng minh được 410≡4(mod7)410≡4(mod7)

Nên 410≡4102≡...≡4102015≡4(mod7)410≡4102≡...≡4102015≡4(mod7)

Do đó A≡4.2015≡3(mod7)A≡4.2015≡3(mod7)

10² = 100

10³ = 1000

10⁴ = 10000

10⁵ = 100000

10⁶ = 1000000

1000 = 10³

1000000 = 10⁶

1000000000 = 10⁹

100...0 (12 chữ số 0) = 10¹²

lỗi rồi nhé

Bị lỗi rồi

a. 2^3 . 2^2 . 2^4

= 2^9

b. 10^2 . 10^3 . 10^5

= 10^10

c. x. x^5

= x^6

d. a^3 . a^2 . a^5

= a^10

a) \(2^3.2^2.2^4\)

   \(=2^{3+2+4}\)

   \(=2^9\)

b) \(10^2.10^3.10^5\)

   \(=10^{2+3+5}\)

   \(=10^{10}\)

c) \(x.x^5=x^1.x^5=x^6\)

d) \(a^3.a^2.a^5=a^{3+2+5}=a^{10}\)

\(2^3\cdot2^2\cdot2^x\cdot x^5\cdot=2^{5+x}\cdot x^5\)

\(10^2\cdot2^{10}\cdot10^3\cdot10^5=10^{10}\cdot2^{10}=2^{10}\cdot5^{10}\cdot2^{10}=4^{10}\cdot5^{10}=20^{10}\)

\(a^3\cdot a^2\cdot a^5=a^{3+2+5}=a^{10}\)

P/s: Mình chỉ hiểu ý bạn như này!

 trả lời ngu như mày