始終搵唔到個通項,唔明白... @ ppi93gk88d的部落格

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始終搵唔到個通項,唔明白...

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一般ge等差/等比數列個d就明,不過好似以下個d數我點都搵唔到個通項... 1) 3,4,6,9,13,... 2) 1,3,7,13,21,... 3)3,6,12,24,48,... 4) 10,14,22,34,... 5) 4,7,13,22,34,... 唔該大家解釋一下點搵個通項,最好有埋個通項比我...

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1, 3,4,6,9,13... = 3, 3+1, 3+1+2, 3+1+2+3, 3+1+2+3+4... T(n)= 3+1+2+3+....+n-1 T(n)= 3+(1+n-1)(n-1)/2 T(n)= 3+(n)(n-1)/2 2, 1,3,7,13,21....= 1, 1+(2), 1+(2+4), 1+(2+4+6), 1+(2+4+6+8)... 1,3,7,13,21....= 1, 1+2(1), 1+2(1+2), 1+2(1+2+3), 1+2(1+2+3+4)... T(n)=1+2(1+2+3+4+.....+(n-1)) T(n)=1+2(n)(n-1)/2 T(n)=1+(n)(n-1) 3, 3,6,12,24,48...=3, 3*2, 3*2^2, 3*2^3 等比數列, ratio=2, 首項是3 T(n)=3*[2^(n-1)] 4, 10,14,22,34,...=10, 10+4(1), 10+4(1+2), 10+4(1+2+3),...... T(n)=10+4(1+2+3+....+n-1) T(n)=10+4n(n-1)/2 T(n)=10+2n(n-1) 5, 4,7,13,22,34,...=4, 4+3(1), 4+3(1+2), 4+3(1+2+3), 4+3(1+2+3+4) T(n)=4+3(1+2+3+...+n-1) T(n)=4+3n(n-1)/2 T(n)=4+(3/2)(n)(n-1) 其實只要注意項與項的相差...便會發現一些提示

其他解答:

1.18 2.31 3.96 4.50 5.49|||||(1) T(2)-T(1)=4-3=1 T(3)-T(2)=6-4=2 T(4)-T(3)=9-6=3 T(5)-T(4)=13-9=4 Therefore T(n+1)-T(n)=n T(n)=3+1+2+3+......+(n-1)=3+[1+(n-1)](n-1)/2=3+n(n-1)/2 Therefore the general term is T(n)=3+n(n-1)/2 Check: T(1)=3+1(1-1)/2=3 T(2)=3+2(2-1)/2=3+1=4 T(3)=3+3(3-1)/2=3+3=6 T(4)=3+4(4-1)/2=3+6=9 T(5)=3+5(5-1)/2=3+10=13 (2) T(2)-T(1)=3-1=2 T(3)-T(2)=7-3=4 T(4)-T(3)=13-7=6 T(5)-T(4)=21-13=8 Therefore T(n+1)-T(n)=2n T(n)=1+2+4+6+8+......+2(n-1)=1+[1+(n-1)](n-1)=1+n(n-1) Therefore the general term is T(n)=1+n(n-1) Check: T(1)=1+1(1-1)=1 T(2)=1+2(2-1)=1+2=3 T(3)=1+3(3-1)=1+6=7 T(4)=1+4(4-1)=1+12=13 T(5)=1+5(5-1)=1+20=21 (3) T(2)/T(1)=6/3=2 T(3)/T(2)=12/6=2 T(4)/T(3)=24/12=2 T(5)/T(4)=48/24=2 It is a geometric sequence. Therefore the general term is T(n)=3(2)^(n-1) (4) T(2)-T(1)=14-10=4 T(3)-T(2)=22-14=8 T(4)-T(3)=34-22=12 Therefore T(n+1)-T(n)=4n Therefore T(n)=10+4+8+12+......+4(n-1)=10+2[1+(n-1)](n-1)=10+2n(n-1) Therefore the general term is T(n)=10+2n(n-1) Check: T(1)=10+2(1)(1-1)=10 T(2)=10+2(2)(2-1)=10+4=14 T(3)=10+2(3)(3-1)=10+12=22 T(4)=10+2(4)(4-1)=10+24=34 You can try (5) yourselves. The answer is T(n)=4+3n(n-1)/2 The formula of the sequence which is like: a,a+b,a+b+(b+1),a+b+(b+1)+(b+2)...... is T(n)=a+bn(n-1)/2 2006-11-07 16:54:46 補充：我相信所有有明顯關係的數列都一定有通項連1,1,2,3,5,8,13,21,34......都有通項見http://zh.wikipedia.org/w/index.php?title=斐波那契数列&variant=zh-tw 2006-11-07 17:21:25 補充： Sorry, some statement in my answer is wrong:The formula of the sequence which is like:a,a十b,a十b十2b,a十b十2b十3b...... isT(n)=a十bn(n-1)/2 2006-11-07 17:26:16 補充： The sequence which is like:a,ab,ab(2b),ab(2b)(3b)......T(n)=(n-1)!ab^(n-1)The sequence which is like:ab,ab(b 1),ab(b 1)(b 2)......T(n)=a(b n-1)!/(b-1)!|||||一般ge等差/等比數列個d就明,不過好似以下個d數我點都搵唔到個通項... 1) 3,4,6,9,13,... 2) 1,3,7,13,21,... 3)3,6,12,24,48,... 4) 10,14,22,34,... 5) 4,7,13,22,34,... 唔該大家解釋一下點搵個通項,最好有埋個通項比我... 呢d數係唔係話找邏輯關係?? 如果係： 1) 3,4,6,9,13,....就係+1,+2,+3,+4...之後應該係+5 (3+1=4,4+2=6,6+3=9,9+4=13,所以之後應該係13+5=18) 2) 1,3,7,13,21,...就係+2,+4,+6,+8 ...之後應該係+10 (1+2=3,3+4=7,7+6=13,13+8=21,所以之後應該係21+10=31) 3)3,6,12,24,48,...就係不斷乘2....之後都係乘2 (3乘2=6,6乘2=12,12乘2=24,24乘2=48,所以之後應該係48乘2=96) 4) 10,14,22,34....就係+4,+8,+12...之後應該係+16 (10+4=14,14+8=22,22+12=34,所以之後應該係34+16=50) 5) 4,7,13,22,34,...就係+3,+6,+9,+12...之後應該係+15 (4+3=7,7+6=13,13+9=22,22+12=34,所以之後應該係34+15=49) 通常你要睇下他們有冇關連,通常加減乘...有d會係次方...