配套习题- 二次函数规律探究问题（二） -【青果学院】

1/5单选题

难度：

1.定义：若抛物线的顶点与x轴的两个交点构成的三角形是直角三角形，则这种抛物线就称为：“美丽抛物线”. 如图，直线l：y=

x+b经过点M（0，

），一组抛物线的顶点B₁（1，y₁），B₂（2，y₂），B₃（3，y₃），…B_n（n，y_n）（n为正整数），依次是直线l上的点，这组抛物线与x轴正半轴的交点依次是：A₁（x₁，0），A₂（x₂，0），A₃（x₃，0），…A_n+1（x_n+1，0）（n为正整数）. 若x₁=d（0＜d＜1），当d为（　　）时，这组抛物线中存在美丽抛物线.

A
B
C
D

正确答案：Qg==

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

2/5单选题

难度：

2.如图，已知点A₁，A₂，…，A₂₀₁₁在函数y=x²位于第二象限的图象上，点B₁，B₂，…，B₂₀₁₁在函数y=x²位于第一象限的图象上，点C₁，C₂，…，C₂₀₁₁在y轴的正半轴上，若四边形OA₁C₁B₁、C₁A₂C₂B₂，…，C₂₀₁₀A₂₀₁₁C₂₀₁₁B₂₀₁₁都是正方形，则正方形C₂₀₁₀A₂₀₁₁C₂₀₁₁B₂₀₁₁的边长为（　　）

A	2010
B	2011
C	2010
D	2011

正确答案：RA==

6Kej77ya4oi1T0E8c3ViPjE8L3N1Yj5DPHN1Yj4xPC9zdWI+QjxzdWI+MTwvc3ViPuaYr+ato+aWueW9ou+8jDxicj7iiLRPQjxzdWI+MTwvc3ViPuS4jnnovbTnmoTlpLnop5LkuLo0NcKw77yMPGJyPuKItE9CPHN1Yj4xPC9zdWI+55qE6Kej5p6Q5byP5Li6eT14PGJyPuiBlOerizxpbWcgd2lkdGg9NDEgaGVpZ2h0PTQyIHNyYz0iaHR0cHM6Ly9wMi5xaW5nZ3VvLmNvbS9HMS9NMDAvQjMvNEQvckJBQ0UxUGtiNzJBbHlvMUFBQUNXMGtrdTVjNzA3LnBuZyI+PGJyPuino+W+l++8mjxpbWcgd2lkdGg9MTEyIGhlaWdodD00MiBzcmM9Imh0dHBzOi8vcDEucWluZ2d1by5jb20vRzEvTTAwLzc1L0FFL3JCQUNGRlBrYjc2ekhuQlpBQUFET0FuR0lmUTMyMS5wbmciPjxicj7iiLTngrlCPHN1Yj4xPC9zdWI+77yIMe+8jDHvvInvvIw8YnI+T0I8c3ViPjE8L3N1Yj49PGltZyB3aWR0aD0xOSBoZWlnaHQ9NDIgc3JjPSJodHRwczovL3AyLnFpbmdndW8uY29tL0cxL00wMC9CMy80RC9yQkFDRTFQa2I3NmpDZG16QUFBQmUzX1Radmc1ODkucG5nIj48dGFibGUgY2xhc3M9TXNvTm9ybWFsVGFibGUgYm9yZGVyPTAgY2VsbHNwYWNpbmc9MCBjZWxscGFkZGluZz0wIHN0eWxlPSdib3JkZXItY29sbGFwc2U6Y29sbGFwc2UnPiA8dHI+ICA8dGQgc3R5bGU9J3BhZGRpbmc6LS43NXB0IC0uNzVwdCAtLjc1cHQgLS43NXB0Jz48L3RkPiA8L3RyPjwvdGFibGU+4oi1T0E8c3ViPjE8L3N1Yj5DPHN1Yj4xPC9zdWI+QjxzdWI+MTwvc3ViPuaYr+ato+aWueW9ou+8jDxicj7iiLRPQzxzdWI+MTwvc3ViPj08aW1nIHdpZHRoPTYzIGhlaWdodD00MiBzcmM9Imh0dHBzOi8vcDIucWluZ2d1by5jb20vRzEvTTAwL0IzLzREL3JCQUNFMVBrYjc3eU1TWmNBQUFDQ2h3T0lzODg4MC5wbmciPjI8YnI+4oi1QzxzdWI+MTwvc3ViPkE8c3ViPjI8L3N1Yj5DPHN1Yj4yPC9zdWI+QjxzdWI+Mjwvc3ViPuaYr+ato+aWueW9ou+8jDxicj7iiLRDPHN1Yj4xPC9zdWI+QjxzdWI+Mjwvc3ViPueahOino+aekOW8j+S4unk9eCsy77yMPGJyPuiBlOerizxpbWcgd2lkdGg9NjMgaGVpZ2h0PTQyIHNyYz0iaHR0cHM6Ly9wMi5xaW5nZ3VvLmNvbS9HMS9NMDAvQjMvNEQvckJBQ0UxUGtiNzZ6RTRrYkFBQUNreW80emJnMTY3LnBuZyI+PGJyPuino+W+l++8mjxpbWcgd2lkdGg9MTIyIGhlaWdodD00MiBzcmM9Imh0dHBzOi8vcDEucWluZ2d1by5jb20vRzEvTTAwLzc1L0FFL3JCQUNGRlBrYjc3Q29RRXpBQUFEZWlEcnVLRTU3MS5wbmciPjxicj7iiLTngrlCPHN1Yj4yPC9zdWI+77yIMu+8jDTvvInvvIw8YnI+4oi0PGltZyB3aWR0aD0yMDcgaGVpZ2h0PTQyIHNyYz0iaHR0cHM6Ly9wMS5xaW5nZ3VvLmNvbS9HMS9NMDAvNzUvQUUvckJBQ0ZGUGtiNzd5ckVJS0FBQURyWHhmeFYwOTg2LnBuZyI+PGJyPuKItUM8c3ViPjE8L3N1Yj5BPHN1Yj4yPC9zdWI+QzxzdWI+Mjwvc3ViPkI8c3ViPjI8L3N1Yj7mmK/mraPmlrnlvaLvvIw8YnI+4oi0QzxzdWI+MTwvc3ViPkM8c3ViPjI8L3N1Yj49PGltZyB3aWR0aD0xNyBoZWlnaHQ9MjEgc3JjPSJodHRwczovL3AyLnFpbmdndW8uY29tL0cxL00wMC9CMy80RC9yQkFDRTFQa2I3M1FlOVZ6QUFBQmRtWldXZlkwNjcucG5nIj5DPHN1Yj4xPC9zdWI+QjxzdWI+Mjwvc3ViPj08aW1nIHdpZHRoPTE3IGhlaWdodD0yMSBzcmM9Imh0dHBzOi8vcDIucWluZ2d1by5jb20vRzEvTTAwL0IzLzREL3JCQUNFMVBrYjczUWU5VnpBQUFCZG1aV1dmWTA2Ny5wbmciPsOXMjxpbWcgd2lkdGg9MTcgaGVpZ2h0PTIxIHNyYz0iaHR0cHM6Ly9wMi5xaW5nZ3VvLmNvbS9HMS9NMDAvQjMvNEQvckJBQ0UxUGtiNzNRZTlWekFBQUJkbVpXV2ZZMDY3LnBuZyI+PTQ8YnI+4oi0QzxzdWI+Mjwvc3ViPkI8c3ViPjM8L3N1Yj7nmoTop6PmnpDlvI/kuLp5PXgr77yINCsy77yJPXgrNu+8jDxicj7ogZTnq4s8aW1nIHdpZHRoPTY0IGhlaWdodD00MiBzcmM9Imh0dHBzOi8vcDEucWluZ2d1by5jb20vRzEvTTAwL0IzLzREL3JCQUNFMVBrYjc2UzVUSU5BQUFDeG15bmJCVTY3My5wbmciPjxicj7op6Plvpc8aW1nIHdpZHRoPTEyMiBoZWlnaHQ9NDIgc3JjPSJodHRwczovL3AyLnFpbmdndW8uY29tL0cxL00wMC9CMy80RC9yQkFDRTFQa2I3NmctMnNJQUFBRGhFTFRRdUk5NjcucG5nIj48YnI+4oi054K5QjxzdWI+Mzwvc3ViPu+8iDPvvIw577yJ77yMPGJyPkM8c3ViPjI8L3N1Yj5CPHN1Yj4zPC9zdWI+PTxpbWcgd2lkdGg9OTEgaGVpZ2h0PTIxIHNyYz0iaHR0cHM6Ly9wMi5xaW5nZ3VvLmNvbS9HMS9NMDAvNzUvQUUvckJBQ0ZGUGtiNzdqeTl2bkFBQUNhVWRjRng4ODA1LnBuZyI+PTM8aW1nIHdpZHRoPTE3IGhlaWdodD0yMSBzcmM9Imh0dHBzOi8vcDIucWluZ2d1by5jb20vRzEvTTAwL0IzLzREL3JCQUNFMVBrYjczUWU5VnpBQUFCZG1aV1dmWTA2Ny5wbmciPjxicj7igKbvvIw8YnI+5L6d5q2k57G75o6o77yM5q2j5pa55b2iQzxzdWI+MjAxMDwvc3ViPkE8c3ViPjIwMTE8L3N1Yj5DPHN1Yj4yMDExPC9zdWI+QjxzdWI+MjAxMTwvc3ViPueahOi+uemVv0M8c3ViPjIwMTA8L3N1Yj5CPHN1Yj4yMDExPC9zdWI+PTIwMTE8aW1nIHdpZHRoPTE5IGhlaWdodD00MiBzcmM9Imh0dHBzOi8vcDIucWluZ2d1by5jb20vRzEvTTAwL0IzLzREL3JCQUNFMVBrYjc2akNkbXpBQUFCZTNfVFp2ZzU4OS5wbmciPjx0YWJsZSBjbGFzcz1Nc29Ob3JtYWxUYWJsZSBib3JkZXI9MCBjZWxsc3BhY2luZz0wIGNlbGxwYWRkaW5nPTAgc3R5bGU9J2JvcmRlci1jb2xsYXBzZTpjb2xsYXBzZSc+IDx0cj4gIDx0ZCBzdHlsZT0ncGFkZGluZzotLjc1cHQgLS43NXB0IC0uNzVwdCAtLjc1cHQnPjwvdGQ+IDwvdHI+PC90YWJsZT7mlYXpgIlE44CC

3/5单选题

难度：

3.二次函数y＝

x²的图象如图所示，点A₀位于坐标原点，点A₁，A₂，A₃，…，A₂₀₀₈在y轴的正半轴上，点B₁，B₂，B₃，…，B₂₀₀₈在二次函数y＝

x²位于第一象限的图象上，若△A₀B₁A₁，△A₁B₂A₂，△A₂B₃A₃，…，△A₂₀₀₉B₂₀₁₀A₂₀₁₀都为等边三角形，则△A₂₀₀₉B₂₀₁₀A₂₀₁₀的周长为（　　）

A	2009
B	2010
C	6024
D	6030

正确答案：RA==

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

4/5单选题

难度：

4.如图，记抛物线y=-x²+1的图象与x正半轴的交点为A，将线段OA分成n等份，设分点分别为P₁，P₂，…P_n-1，过每个分点作x轴的垂线，分别与抛物线交于点Q₁，Q₂，…，Q_n-1，再记直角三角形OP₁Q₁，P₁P₂Q₂，…，P_n-2P_n-1Q_n-1的面积分别为S₁，S₂，…，这样就有S₁=

，S₂=

，…；记W=S₁+S₂+…+S_n-1，当n越来越大时，你猜想W最接近的常数是（　　）

A
B
C
D

正确答案：Qw==

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

5/5单选题

难度：

5.如图已知A₁，A₂，A₃，…A_n是x轴上的点，且OA₁=A₁A₂=A₂A₃=A₃A₄=…=A_n-1A_n=1，分别过点A₁，A₂，A₃，…A_n′作x轴的垂线交二次函数y=

x²（x＞0）的图象于点P₁，P₂，P₃，…Pn，若记△OA₁P₁的面积为S₁，过点P₁作P₁B₁⊥A₂P₂于点B₁，记△P₁B₁P₂的面积为S₂，过点P₂作P₂B₂⊥A₃P₃于点B₂，记△P₂B₂P₃的面积为S₃，…依次进行下去，最后记△P_n-1B_n-1P_n（n＞1）的面积为S_n，则S_n=（　　）

A
B
C
D

正确答案：QQ==

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