\(a,=7^4\left(7^2+7-1\right)=7^4\cdot55=7^4\cdot5\cdot11⋮11\)

\(7^6+7^5-7^4=7^4\cdot55⋮11\)

4/ Chứng minh rằng :a.     76 +75 – 74 chia hết cho 11 . bạn nào giúp mình với (giải thích cho mình hiểu luôn nha các bạ... - Hoc24

\(7^6+7^5-7^4\)

\(=7^4\left(7^2+7-1\right)\)

\(=7^4\cdot55⋮11\)

a)

Ta có: \(222^{333}=\left(222^3\right)^{111}\equiv1^{111}=1\left(mod13\right)\)

\(\Rightarrow222^{333}+333^{222}\equiv1+333^{222}=1+\left(333^2\right)^{111}\)

\(\equiv1+12^{111}\equiv1+12^{110}\cdot12\equiv1+\left(12^2\right)^{55}\cdot12\)

\(\equiv1+1\cdot12\equiv13\equiv0\left(mod13\right)\)

Vậy $222^{333}+333^{222}$ chia hết cho $13.$

b) Ta có:

\(3^{105}\equiv\left(3^3\right)^{35}\equiv1^{35}\equiv1\) (mod13)

\(\Rightarrow3^{105}+4^{105}\equiv1+4^{105}\equiv1+\left(4^3\right)^{35}\)

\(\equiv1+12^{35}\equiv1+\left(12^2\right)^{17}\cdot12\equiv1+1\cdot12\equiv13\equiv0\left(mod13\right)\)

Vậy $3^{105}+4^{105}$ chia hết cho $13.$

Lại có:

\(3^{105}\equiv\left(3^3\right)^{35}\equiv5^{35}\equiv\left(5^5\right)^7\equiv1\left(mod11\right)\)

\(4^{105}\equiv\left(4^3\right)^{35}\equiv9^{35}\equiv\left(9^5\right)^7\equiv1\left(mod11\right)\)

Từ đây:\(3^{105}+4^{105}\equiv1+1\equiv2\left(mod11\right)\)

Vậy $3^{105}+4^{105}$ không chia hết cho $11.$

P/s: Rất lâu rồi không giải, không chắc.

nhân 2a-5b+6c với 9 rồi trừ đi a-11b+3c

Ta có \(a-11b+3c⋮17\Rightarrow2a-22b+6c⋮17\)

Ta có \(17b⋮17\)

Nên \(2a-22b+6c+17b=2a-5b+6c⋮17\left(dpcm\right)\)

1duocgoitienganhla

Ta có:\(\left(2a-5b+6c\right)+15\left(a-11b+3c\right)=17a-170b+51c⋮17\)

Mà \(15\left(a-11b+3c\right)⋮17\Rightarrow2a-5b+6c⋮17\left(đpcm\right)\)