![](/uploads/image/0097.jpg)
![](data:image/jpg;base64,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)
Company number:【WTUT-WT88Y-W8BBGB-BWYTT-19998】
四年级火车过桥问题及答案
一、填空题
1.一列火车长200米,它以每秒10米的速度穿过200米长的隧道,从车头进入隧道到车尾离开隧道共需要_______时间. 2.某人沿着铁路边的便道步行,一列客车从身后开来,在身旁通过的时间是15秒,客车长105米,每小时速度为千米,求步行人每小时行______千米
3.一人以每分钟60米的速度沿铁路步行,一列长144米的客车对面开来,从他身边通过用了8秒钟,列车的速度是______米/秒. 4.马路上有一辆车身为15米的公共汽车,由东向西行驶,车速为每小时18千米,马路一旁的人行道上有甲、乙两名年轻人正在练长跑,甲由东向西跑,乙由西向东跑.某一时刻,汽车追上甲,
6秒钟后汽车离开了甲;半分钟之后汽车遇到迎面跑来的乙;又过了2秒钟,汽车离开了乙.问再过_____秒后,甲、乙两人相遇.
5.一列火车长700米,以每分钟400米的速度通过一座长900米的大桥.从车头上桥到车尾离要_____分钟.
6.一支队伍1200米长,以每分钟80米的速度行进.队伍前面的联络员用6分钟的时间跑到队伍末尾传达命令.问联络员每分钟行_____米
7.一列火车通过530米的桥需40秒钟,以同样的速度穿过380米的山洞需30秒钟.求这列火车的速度是______米/秒,全长是_____米.
8.已知车长182米,每秒行20米,慢车长1034米,每秒行18米.两车同向而行,当快车车尾接慢车车头时,称快车穿过慢车,则快车穿过慢车的时间是_____秒.
9.一座铁路桥全长1200米,一列火车开过大桥需花费75秒;火车开过路旁电杆,只要花费15秒,那么火车全长是_______米.
10.铁路沿线的电杆间隔是40米,某旅客在运行的火车中,从看到第一根电线杆到看到第51根电线杆正好是2分钟,火车每小时行______千米.
二、解答题
11.一个人站在铁道旁,听见行近来的火车汽笛声后,再过57秒钟火车经过他面前.已知火车汽笛时离他1360米;(轨道是笔直的)声速是每秒钟340米,求火车的速度(得数保留整数)
12.某人沿着铁路边的便道步行,一列客车从身后开来,在身旁通过的时间是15秒钟,客车长105米,每小时速度为千米.求步行人每小时行多少千米
13.一人以每分钟60米的速度沿铁路边步行,一列长144米的客车对面而来,从他身边通过用了8秒钟,求列车的速度.
14.一条单线铁路上有A,B,C,D,E5个车站,它们之间的路程如图所示(单位:千米).两列火车同时从A,E两站相对开出,从A站开出的每小时行60千米,从E站开出的每小时行50千米.由于单线铁路上只有车站才铺有停车的轨道,要使对面开来的列车通过,必须在车站停车,才能让开行车轨道.因此,应安排哪个站相遇,才能使停车等候的时间最短.先到这一站的那一列火车至
少需要停车多少分钟
———————————————答 案——————————————————————
一、填空题
1. 火车过隧道,就是从车头进隧道到车尾离开隧道止.如图所示,火车通过隧道时所行的总距离为:隧道长+车长.
(200+200)÷10=40(秒)
答:从车头进入隧道到车尾离开共需40秒.
2. 根据题意,火车和人在同向前进,这是一个火车追人的“追及问题”.
由图示可知:
人步行15秒钟走的距离=车15秒钟走的距离-车身长.
所以,步行人速度×15=×1000÷(60×60)×15-105
步行人速度=[×1000÷ (60×60)-105]÷5=1(米/秒)
=(千米/小时)
答:步行人每小时行千米.
3. 客车与人是相向行程问题,可以把人看作是有速度而无长度的火车,利用火车相遇问题:两车身长÷两车速之和=时间,可知,
两车速之和=两车身长÷时间
=(144+0)÷8
=18.
人的速度=60米/分
=1米/秒.
车的速度=18-1
=17(米/秒).
答:客车速度是每秒17米.
4. (1)先把车速换算成每秒钟行多少米
18×1000÷3600=5(米).
(2)求甲的速度.汽车与甲同向而行,是追及问题.甲行6秒钟的距离=车行6秒钟的距离-车身长.