平面直角坐标系中,四边形OABC是矩形,点B的坐标(4,3).平行于对角线AC的直线m从原点O出发,沿看图吧,双击打开,
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平面直角坐标系中,四边形OABC是矩形,点B的坐标(4,3).平行于对角线AC的直线m从原点O出发,沿看图吧,双击打开,
平面直角坐标系中,四边形OABC是矩形,点B的坐标(4,3).平行于对角线AC的直线m从原点O出发,沿
看图吧,双击打开,
平面直角坐标系中,四边形OABC是矩形,点B的坐标(4,3).平行于对角线AC的直线m从原点O出发,沿看图吧,双击打开,
(1)A(4,0) C(0,3) (2)当t=2秒或6秒时,MN=1/2AC(理由是,此时MN是AC的中位线)
(3)S=1/2×t×(3/4t)=3/8t平方(t4)
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就是这样
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(1)(4,0),(0,3); ·················································································· 2分
(2) 2,6; ···················································································...
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(1)(4,0),(0,3); ·················································································· 2分
(2) 2,6; ········································································································· 4分
(3) 当0<t≤4时,OM=t.
由△OMN∽△OAC,得,
∴ ON=,S=. ···································· 6分
当4<t<8时,
如图,∵ OD=t,∴ AD= t-4.
方法一:
由△DAM∽△AOC,可得AM=,∴ BM=6-. ··························· 7分
由△BMN∽△BAC,可得BN==8-t,∴ CN=t-4. ·································· 8分
S=矩形OABC的面积-Rt△OAM的面积- Rt△MBN的面积- Rt△NCO的面积
=12--(8-t)(6-)-
=. ··························································································· 10分
方法二:
易知四边形ADNC是平行四边形,∴ CN=AD=t-4,BN=8-t.·································· 7分
由△BMN∽△BAC,可得BM==6-,∴ AM=.······ 8分
以下同方法一.
(4) 有最大值.
方法一:
当0<t≤4时,
∵ 抛物线S=的开口向上,在对称轴t=0的右边, S随t的增大而增大,
∴ 当t=4时,S可取到最大值=6; ················ 11分
当4<t<8时,
∵ 抛物线S=的开口向下,它的顶点是(4,6),∴ S<6.
综上,当t=4时,S有最大值6. ······································································· 12分
方法二:
∵ S=
∴ 当0<t<8时,画出S与t的函数关系图像,如图所示. ······························ 11分
显然,当t=4时,S有最大值6
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