a, n-2;n;n+2 ( n là số  tự nhiên lẻ >= 3 )

b,n(n+2)-n(n-2) = 20 <=> n(n+2-n+2)=20 

<=> 4n = 20 <=> n=5

vậy 3 số đó là 3,5,7

(2n+3)(2n+5)−(2n+1)(2n+3)=20(4n2+10n+6n+15)−(4n2+6n+2n+3)=204n2+10n+6n+15−4n2−6n−2n−3=208n+12=208n=8⇔x=1(2n+3)(2n+5)−(2n+1)(2n+3)=20(4n2+10n+6n+15)−(4n2+6n+2n+3)=204n2+10n+6n+15−4n2−6n−2n−3=208n+12=208n=8⇔x=1

Vậy ba số tự nhiên lẻ tiên tiếp cần tìm là 3(=2.1+1);5(=2.1+2);7(=2.1+5)

Ta có : 

2a + 2 ( a + 1) + ... + ( a + 2003 )

= 4008a + 2 ( 1 + 2 + ... + 2003 )

= 2004 ( 2a + 2003 )

= 8030028

Như vậy : 

 8030028 = 2004+ 2008 + .... + 6010

Ta có:
2a+2(a+1)+...+2(a+2003)=4008a+2(1+2+...+2003)=2004(2a+2003)=8030028⇒a=10022a+2(a+1)+...+2(a+2003)=4008a+2(1+2+...+2003)=2004(2a+2003)=8030028⇒a=1002
Như vậy:
8030028=2004+2008+...+60108030028=2004+2008+...+6010 

2004+2008+...+6010 

2a+2(a+1)+...+2(a+2003)=4008a+2(1+2+...+2003)=2004(2a+2003)=8030028⇒a=1002
Như vậy:
8030028=2004+2008+...+6010

8030028=2004+2006+2008+.....+6016

Ta có:
2a+2(a+1)+...+2(a+2003)=4008a+2(1+2+...+2003)=2004(2a+2003)=8030028⇒a=10022a+2(a+1)+...+2(a+2003)=4008a+2(1+2+...+2003)=2004(2a+2003)=8030028⇒a=1002
Như vậy:
8030028=2004+2008+...+60108030028=2004+2008+...+6010 

tích nha má