Ta có:

\(VT=75^{2005}-75^{2004}\)

\(VT=75^{2004}.75-75^{2004}.1\)

\(VT=75^{2004}\left(75-1\right)\)

\(VT=75^{2004}.74\)

\(VP=75^{2004}-75^{2003}\)

\(VP=75^{2003}.75-75^{2003}.1\)

\(VP=75^{2003}\left(75-1\right)\)

\(VP=75^{2003}.74\)

\(VT>VP\)

\(75^{2005}-75^{2004}=75^{2004}\cdot\left(75-1\right)=75^{2004}\cdot74\\ 75^{2004}-75^{2003}=75^{2003}\cdot\left(75-1\right)=75^{2003}\cdot74\\ \text{Vì }75^{2004}>75^{2003}\text{ nên }75^{2004}\cdot74>75^{2003}\cdot74\Leftrightarrow75^{2005}-75^{2004}>75^{2004}-75^{2003}\)

Thay \(x=2003\) vào A ta có:\(A=2003^{17}-2004.2003^{16}+2004.2003^{15}-2004.2003^{14}+...+2004.\left(2003-1\right)\)

\(=2003^{17}-\left(2003+1\right).2003^{16}+\left(2003+1\right).2003^{15}-\left(2003+1\right).2003^{14}+...+\left(2003+1\right).\left(2003-1\right)\)

\(=2003^{17}-2003^{17}+2003^{16}-2003^{16}+2003^{15}-2003^{15}+2003^{14}-2003^{14}+...+\left(2003+1\right).\left(2003-1\right)\)

\(=2004.2002=4012008\)

Ta có:

        7²⁰⁰⁴=7^4.501=A1

      =>A1:10=(A0+1):10=B0+1=B1=>7²⁰⁰⁴:10 dư 1

        3²⁰⁰³=3^4.500+3=3^4.500+3³=C1+27=D8:10 dư 8

Ta xét chữ số tận cùng của 7²⁰⁰⁴ và 3²⁰⁰³

ta có: 7²⁰⁰⁴ = 7^4.501 = (.....1)⁵⁰¹ = .........1 => tận cùng là 1 => chia 10 dư 1

ta có: 3²⁰⁰³ = 3^4.500+3 = (......1)⁵⁰⁰ . 3³ = (........1) . 27 = ......7 => tận cùng là 7 => chia 10 dư 7

Vậy: 7²⁰⁰⁴ chia 10 dư 1 ; 3²⁰⁰³ chia 10 dư 7

Đặt \(B=4^{2004}+4^{2003}+...+4^2+4+1\)

\(\Leftrightarrow4B=4^{2005}+4^{2004}+...+4^3+4^2+4\)

\(\Leftrightarrow B=\dfrac{4^{2005}-1}{3}\)

\(A=75\cdot\dfrac{4^{2005}-1}{3}+25\)

\(=25\left(4^{2005}-1+1\right)=100\cdot4^{2004}⋮100\)