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.但n为100时,应如何计算正方形的具体个数呢?下面我们就一起来探究并解决这个问题.首先,通过探究我们已经知道
时,我们可以这样做:
(1)观察并猜想:
=(1+0)×1+(1+1)×2=l+0×1+2+1×2=(1+2)+(0×1+1×2)
=(1+0)×1+(1+1)×
2+(l+2)×3=1+0×1+2+1×2+3+
2×3=(1+2+3)+(0×1+1×2+2×3)
=(1+0)×1+(1+1)×2+(l+2)×3+ ___________="1+0×1+2+1×2+3+2×3+" ___________
=(1+2+3+4)+(___________)
…
(2)归纳结论:
=(1+0)×1+(1+1)×2+(1+2)×3+…[1+(n-l)]n=1+0×1+2+1×2+3+2×3+…+n+(n-1)×n
=(___________)+[ ___________]
=" ___________+" ___________
=
×___________(3 )实践应用:
通过以上探究过程,我们就可以算出当n为100时,正方形网格中正方形的总个数是_________。
同类型试题
y = sin x, x∈R, y∈[–1,1],周期为2π,函数图像以 x = (π/2) + kπ 为对称轴
y = arcsin x, x∈[–1,1], y∈[–π/2,π/2]
sin x = 0 ←→ arcsin x = 0
sin x = 1/2 ←→ arcsin x = π/6
sin x = √2/2 ←→ arcsin x = π/4
sin x = 1 ←→ arcsin x = π/2
y = sin x, x∈R, y∈[–1,1],周期为2π,函数图像以 x = (π/2) + kπ 为对称轴
y = arcsin x, x∈[–1,1], y∈[–π/2,π/2]
sin x = 0 ←→ arcsin x = 0
sin x = 1/2 ←→ arcsin x = π/6
sin x = √2/2 ←→ arcsin x = π/4
sin x = 1 ←→ arcsin x = π/2
