\(7^{101}+13^{101}+19^{101}⋮7+13+19\)

\(\Rightarrow7^{101}+13^{101}+19^{101}⋮39\)

Theo mình là :

7^101 + 13^101 + 19^101 

= 39¹⁰¹ 

Có : 39¹⁰¹ = 39 . 39 . 39 . 39 .... (101 số 39) chia hết cho 39

=> 39¹⁰¹ chia hết cho 39 

Vậy 7^101 + 13^101 + 19^101 

\(P=\dfrac{1+19+\dfrac{19}{13}+\dfrac{19}{101}}{7+\dfrac{7}{13}+\dfrac{7}{19}+\dfrac{7}{101}}\)

\(=\dfrac{19\left(1+\dfrac{1}{3}+\dfrac{1}{19}+\dfrac{1}{101}\right)}{7\left(1+\dfrac{1}{13}+\dfrac{1}{19}+\dfrac{1}{101}\right)}=\dfrac{19}{7}\)

a) \(3^{10}+3^{11}+3^{12}\)

⇔ \(3^{10}\left(1+3+3^2\right)\)

⇔  \(3^{10}.13\) 

⇒   \(3^{10}.13\)  chia hết cho 13

Đặt A = 1 + 7 + 7² + ... + 7¹⁰¹

=> A = 7⁰ + 7¹ + ... + 7¹⁰¹

=> A = 7⁰ ( 1 + 7 ) + ... + 7¹⁰⁰ ( 1 + 7 )

=> A = 7⁰ . 8 + ... + 7¹⁰⁰ . 8

=> A = 8 . ( 7⁰ + ... + 7¹⁰⁰ ) chia hết cho 8 ( đpcm )

\(13^{101}-13=13\left(13^{100}-1\right)\)

Xét: \(169\equiv1\left(mod168\right)\Leftrightarrow169^{50}\equiv1\left(mod168\right)\Leftrightarrow13^{100}\equiv1\left(mod168\right)\)

\(\Leftrightarrow13^{100}-1\equiv0\left(mod168\right)\)<=>13¹⁰⁰-1 chia hết cho 168

=>13(13¹⁰⁰-1) chia hết cho 168=> đpcm

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