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A = 2014+2014^2+2014^3++2014^4+...+2014^100

2014 . A = 2014² + 2014³ + 2014⁴ + 2014⁵ + ... + 2014¹⁰¹

2014 . A - A = (  2014² + 2014³ + 2014⁴ + 2014⁵ + ... + 2014¹⁰¹ ) - ( 2014 + 2014² + 2014³ + 2014⁴ + ... + 2014¹⁰⁰ )

2013 . A = 2014¹⁰¹ - 2014

A = ( 2014¹⁰¹  - 2014 ) : 2013

Ta có:

A = 2014 + 2014² + 2014³ + 2014⁴ + ... + 2014¹⁰⁰

2014A = 2014² + 2014³ + 2014⁴ + 2014⁵ + ... + 2014¹⁰¹

2014A - A = (2014² + 2014³ + 2014⁴ + 2014⁵ + ... + 2014¹⁰¹) - (2014 + 2014² + 2014³ + 2014⁴ + ... + 2014¹⁰⁰)

2013A = 2014¹⁰¹ - 2014

A = \(\frac{2014^{101}-2014}{2013}\)

a)2014 + 2014^2 + 2014^3 + ... + 2014^10

=(2014+2014^2)+(2014^3+2014^4)+...+(2014^9+2014^10)

=2014(1+2014)+2014^3(1+2014)+...+1014^9(1+2014)

=2014.2015+2014^3.2015+...+2014^9.2015

vì 2014.2015 chia hết cho 2015

2014^3.2015 chia hết cho 2015

.....

2014^9.2015 chia hết cho 2015

=>2014.2015+2014^3.2015+...+2014^9.2015 chia hết cho 2015

vậy 2014 + 2014^2 + 2014^3 + ... + 2014^10 chia hết cho 2015 

a,2014+2014²+2014³+....+2014¹⁰

=(2014+2014²)+(2014³+2014⁴)+.....+(2014⁹+2014¹⁰)

=2014.(1+2014)+2014³.(1+2014)+.........+2014⁹.(1+2014)

=2014.2015+2014³.2015+..........+2014⁹.2015

=2015.(2014+2014³+...........+2014⁹) \(^._:\)2015 (đpcm)

b,4n+1\(^._:\)n+1

4n+4 -3\(^._:\)n+1

Vì 4n+4\(^._:\)n+1 =>3\(^._:\)n+1

=>n+1\(\in\){1; -1; 3; -3}

KL: n\(\in\){0; 2; -2; -4}