Ta có \(2015^{2015}-2015^{2014}=2015^{2014}.2015-2015^{2014}=2015^{2014}.\left(2015-1\right)=2015^{2014}.2014\) chia hết cho 2014 (đpcm).

2014 đồng dư với -1(mod 2015)

=>2014²⁰¹⁵ đồng dư với (-1)²⁰¹⁵=-1(mod 2015)

2016 đồng dư với 1(mod 2015)

=>2016²⁰¹³ đồng dư với 1(mod 2015)

=>2014²⁰¹⁵+2016²⁰¹³ đồng dư với -1+1=0(mod 2015)

=>2014²⁰¹⁵+2016²⁰¹³ chia hết cho 2015

=>đpcm 

\(2014^{2015}+2016^{2013}=\left(2015-1\right)^{2015}+\left(2015+1\right)^{2013}=2015^{2015}+2015^{2013}=2015.\left(2015^{2014}+2015^{2012}\right)\)

chia hết cho 2015 

đúng rồi Đào Đức Mạnh , đề sai ròi

\(vt=1+2015+2015^2+2015^3+2015^4+2015^5+2015^6+2015^7\)

\(=\left(1+2015\right)+\left(2015^2+2015^3\right)+\left(2015^4+2015^5\right)+\left(2015^6+2015^7\right)\)

\(=1\left(1+2015\right)+2015^2\left(1+2015\right)+2015^4\left(1+2015\right)+2015^6\left(1+2015\right)\)

\(=\left(2015+1\right)\left(1+2015^2+2015^4+2015^6\right)\)

\(=2016\left(1+2015^2+2015^4+2015^6\right)\)

\(=2016\left[\left(1+2015^2\right)+\left(2015^4+2015^6\right)\right]\)
\(=2016\left[1\left(1+2015^2\right)+2015^{2014}\left(1+2015^2\right)\right]=vp\left(đpcm\right)\)

\(=2016\left(1+2015^{2014}\right)\left(1+2015^{2012}\right)\)

cái chỗ =vp(đpcm ở dòng dưới nhé mk gõ nhầm)

x=2015

=> x+1=2016

=> A=x²⁰¹⁶-(x+1).x²⁰¹⁵+(x+1).x²⁰¹⁴-(x+1).x²⁰¹³+...+(x+1)x²-(x+1)x+2016

=x²⁰¹⁶-x²⁰¹⁶-x²⁰¹⁵+x²⁰¹⁵+x²⁰¹⁴-x²⁰¹⁴-x²⁰¹³+...+x³+x²-x²-x+2016

=-x+2016

=-2015+2016

=1

Vậy A=1.