在計(jì)算“1×2+2×3+…n(n+1)”時(shí),先改寫第k項(xiàng):
k(k+1)=
1
3
[k(k+1)(k+2)-(k-1)k(k+1)],由此得1×2=
1
3
(1×2×3-0×1×2),2×3=
1
3
(2×3×4-1×2×3),..
n(n+1)=
1
3
[n(n+1)(n+2)-(n-1)n(n+1)],相加,得1×2+2×3+…+n(n+1)=
1
3
n(n+1)(n+2)

(1)類比上述方法,請(qǐng)你計(jì)算“1×2×3+2×3×4+…+n(n+1)(n+2)”的結(jié)果;
(2)試用數(shù)學(xué)歸納法證明你得到的等式.
(1)∵n(n+1)(n+2)=
1
4
[n(n+1)(n+2)(n+3)-(n-1)n(n+1)(n+2)]
∴1×2×3=
1
4
(1×2×3×4-0×1×2×3)
2×3×4=
1
4
(2×3×4×5-1×2×3×4)

n(n+1)(n+2)=
1
4
[n(n+1)(n+2)(n+3)-(n-1)n(n+1)(n+2)]
∴1×2×3+2×3×4+…+n(n+1)(n+2)=
1
4
[(1×2×3×4-0×1×2×3)+(2×3×4×5-1×2×3×4)+…+n×(n+1)×(n+2)×(n+3)-(n-1)×n×(n+1)×(n+2)=
1
4
n(n+1)(n+2)(n+3)
(2)利用數(shù)學(xué)歸納法證:1×2×3+2×3×4+…+n(n+1)(n+2)=
1
4
n(n+1)(n+2)(n+3)
①當(dāng)n=1時(shí),左邊=1×2×3,右邊=
1
4
×1×2×3×4
=1×2×3,左邊=右邊,等式成立.
②設(shè)當(dāng)n=k(k∈N*)時(shí),等式成立,
即1×2×3+2×3×4+…+k×(k+1)×(k+2)=
k(k+1)(k+2)(k+3)
4
.  
則當(dāng)n=k+1時(shí),
左邊=1×2×3+2×3×4+…+k×(k+1)×(k+2)+(k+1)(k+2)(k+3)
=
k(k+1)(k+2)(k+3)
4
+(k+1)(k+2)(k+3)
=(k+1)(k+2)(k+3)(
k
4
+1)
=
(k+1)(k+2)(k+3)(K+4)
4

=
(k+1)(k+1+1)(k+1+2)(k+1+3)
4

∴n=k+1時(shí),等式成立.
由①、②可知,原等式對(duì)于任意n∈N*成立.
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在計(jì)算“1×2+2×3+…+n(n+1)”時(shí),某同學(xué)學(xué)到了如下一種方法:先改寫第k項(xiàng):k(k+1)=
1
3
[k(k+1)(k+2)-(k-1)k(k+1)]由此得
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n(n+1)=
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相加,得1×2×3+…+n(n+1)=
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n(n+1)(n+2)
類比上述方法,請(qǐng)你計(jì)算“1×2×3+2×3×4+…+n(n+1)(n+2)”,

其結(jié)果為
 

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科目:高中數(shù)學(xué) 來源: 題型:

在計(jì)算“1×2+2×3+…+n(n+1)”時(shí),有如下方法:
先改寫第k項(xiàng):k(k+1)=
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在計(jì)算“1×2+2×3+…n(n+1)”時(shí),先改寫第k項(xiàng):
k(k+1)=
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(1)類比上述方法,請(qǐng)你計(jì)算“1×2×3+2×3×4+…+n(n+1)(n+2)”的結(jié)果;
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在計(jì)算“1×2+2×3+…+n(n+1)”時(shí),某同學(xué)學(xué)到了如下一種方法:先改寫第k項(xiàng):k(k+1)=[k(k+1)(x+2)-(k-1)k(k+1)],由此得

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在計(jì)算“1×2+2×3+…+n(n+1)”時(shí),有如下方法:
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