(2)①证明:连结MF,NE. …………………4分
设点M的坐标为(x1,y1),点N的坐标为(x2,y2).
k∵ 点M,N在反比例函数y?(k>0)的图象上,
x∴ x1y1?k,x2y2?k.
∵ ME⊥y轴,NF⊥x轴, ∴ OE=y1,OF=x2.
11∴ S△EFM=x1?y1?k, ………………5分
2211S△EFN=x2?y2?k. ………………6分
22D F y E M O x N 图 3
∴S△EFM =S△EFN. ……
由(1)中的结论可知:MN∥EF. ………8分 ② MN∥EF. …………………10分
(若学生使用其他方法,只要解法正确,皆给分.
22. 解:11?x 整理得:2×
11?1 x?111-=1 x?11?x21+=1 x?1x?1解之得:x = 4
3. 解:(1)解法1:根据题意可得:A(-1,0),B(3,0);
则设抛物线的解析式为y?a(x?1)(x?3)(a≠0)
又点D(0,-3)在抛物线上,∴a(0+1)(0-3)=-3,解之得:a=1 ∴y=x-2x-3
自变量范围:-1≤x≤3
解法2:设抛物线的解析式为y?ax2?bx?c(a≠0)
根据题意可知,A(-1,0),B(3,0),D(0,-3)三点都在抛物线上
?a?b?c?0?a?1?? ∴?9a?3b?c?0,解之得:?b??2
?c??3?c??3??2
∴y=x-2x-3
自变量范围:-1≤x≤3
(2)设经过点C“蛋圆”的切线CE交x轴于点E,连结CM, 在Rt△MOC中,∵OM=1,CM=2,∴∠CMO=60°,OC=3 在Rt△MCE中,∵OC=2,∠CMO=60°,∴ME=4
∴点C、E的坐标分别为(0,3),(-3,0)
2
∴切线CE的解析式为y?3x?3 3y
C
A B x M O E
D
(3)设过点D(0,-3),“蛋圆”切线的解析式为:y=kx-3(k≠0)
??y?kx?3 由题意可知方程组?只有一组解 2?y?x?2x?3? 即kx?3?x2?2x?3有两个相等实根,∴k=-2
∴过点D“蛋圆”切线的解析式y=-2x-3
4. 解:y=20+2x (12≥x≥1)
(2)当5≥x≥1时,W=(1200-800)×(2x+20)
=800x+8000
此时w随x的增大而增大,当x=5时,W最大=12000 当12≥x>5时,W=
(2x?20?30)(?1200?800?20?2x?20)
5=-80(X2-5X-150)=-80(X-2)2+12500
此时函数图象开口向下,在对称轴右侧,W随x的增大而减小。 所以,当x=6时,W最大=11520
5. (1) 对应关系连接如下: --- 4分
(2) 当容器中的水恰好达到一半高度时, 函数关系图上t的位置如上: --- 2分
6. 解:(1)BM?DN?MN成立. ·························································· (2分) 如图,把△AND绕点A顺时针90,得到△ABE,
A 则可证得E,B,M三点共线(图形画正确) ···· (3分)
D
证明过程中,
证得:?EAM??NAM ···························· (4分)
N 证得:△AEM≌△ANM ························ (5分)
?ME?MN C E B M ?ME?BE?BM?DN?BM ?DN?BM?MN ········································································· (6分) (2)DN?BM?MN ············································································· (8分)
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