小升初英文奥数试题及答案锦集五篇

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以下是小编为大家收集的小升初英文奥数试题及答案锦集五篇，仅供参考，欢迎大家阅读。

【篇一】小升初英文奥数试题及答案

小升初经典奥数试题

1.已知一张桌子的价钱是一把椅子的10倍，又知一张桌子比一把椅子多288元，一张桌子和一把椅子各多少元?

2.2、3箱苹果重45千克。一箱梨比一箱苹果多5千克，3箱梨重多少千克?

3.甲乙二人从两地同时相对而行，经过4小时，在距离中点4千米处相遇。甲比乙速度快，甲每小时比乙快多少千米?

4.李军和张强付同样多的钱买了同一种铅笔，李军要了13支，张强要了7支，李军又给张强0.6元钱。每支铅笔多少钱?

5.甲乙两辆客车上午8时同时从两个车站出发，相向而行，经过一段时间，两车同时到达一条河的两岸。由于河上的桥正在维修，车辆禁止通行，两车需交换乘客，然后按原路返回各自出发的车站，到站时已是下午2点。甲车每小时行40千米，乙车每小时行45千米，两地相距多少千米?(交换乘客的时间略去不计)

6.学校组织两个课外兴趣小组去郊外活动。第一小组每小时走4.5千米，第二小组每小时行3.5千米。两组同时出发1小时后，第一小组停下来参观一个果园，用了1小时，再去追第二小组。多长时间能追上第二小组?

7.有甲乙两个仓库，每个仓库平均储存粮食32.5吨。甲仓的存粮吨数比乙仓的4倍少5吨，甲、乙两仓各储存粮食多少吨?

8.甲、乙两队共同修一条长400米的.公路，甲队从东往西修4天，乙队从西往东修5天，正好修完，甲队比乙队每天多修10米。甲、乙两队每天共修多少米?

9.学校买来6张桌子和5把椅子共付455元，已知每张桌子比每把椅子贵30元，桌子和椅子的单价各是多少元?

10.一列火车和一列慢车，同时分别从甲乙两地相对开出。快车每小时行75千米，慢车每小时行65千米，相遇时快车比慢车多行了40千米，甲乙两地相距多少千米?

11.某玻璃厂托运玻璃250箱，合同规定每箱运费20元，如果损坏一箱，不但不付运费还要赔偿100元。运后结算时，共付运费4400元。托运中损坏了多少箱玻璃?

12.五年级一中队和二中队要到距学校20千米的地方去春游。第一中队步行每小时行4千米，第二中队骑自行车，每小时行12千米。第一中队先出发2小时后，第二中队再出发，第二中队出发后几小时才能追上一中队?

13.某厂运来一堆煤，如果每天烧1500千克，比计划提前一天烧完，如果每天烧1000千克，将比计划多烧一天。这堆煤有多少千克?

14.妈妈让小红去商店买5支铅笔和8个练习本，按价钱给小红3.8元钱。结果小红却买了8支铅笔和5本练习本，找回0.45元。求一支铅笔多少元?

15.学校组织外出参观，参加的师生一共360人。一辆大客车比一辆卡车多载10人，6辆大客车和8辆卡车载的人数相等。都乘卡车需要几辆?都乘大客车需要几辆?

16.某筑路队承担了修一条公路的任务。原计划每天修720米，实际每天比原计划多修80米，这样实际修的差1200米就能提前3天完成。这条公路全长多少米?

17.某鞋厂生产1800双鞋，把这些鞋分别装入12个纸箱和4个木箱。如果3个纸箱加2个木箱装的鞋同样多。每个纸箱和每个木箱各装鞋多少双?

18.某工地运进一批沙子和水泥，运进沙子袋数是水泥的2倍。每天用去30袋水泥，40袋沙子，几天以后，水泥全部用完，而沙子还剩120袋，这批沙子和水泥各多少袋?

19.学校里买来了5个保温瓶和10个茶杯，共用了90元钱。每个保温瓶是每个茶杯价钱的4倍，每个保温瓶和每个茶杯各多少元?

20.两个数的和是572，其中一个加数个位上是0，去掉0后，就与第二个加数相同。这两个数分别是多少?

【篇二】小升初英文奥数试题及答案

关于小升初英文奥数试题及答案

近两年很多重点中学，在小升初的.时候都考察英文奥数题，比如爱知中学的双语班考试。需要提醒同学们的是，你不需要完全读懂题目的意思，而是应该根据自己所学的只是猜测题目需要求什么。所涉及到的知识都是比较简单的奥数知识。希望同学们克服害怕的心理，考出好成绩。

1、In , 16 June falls on a Wednesday. On what day of the week will 16 June fall in ?

2、In a magic square the sum of the numbers in each row, in each diagonal and in each column are equal. In this magic square the value of x is:

3、If half of a number is 30, then three-quarters of that number is____.

4、The sum of the digits of the following product

999×555

5、Three positive integers have a sum of 28. The greatest possible product that these integers can have is_____.

6、Jack was trying to tessellate regular pentagons. He managed the

following figure.

The size of angle .a. is______.

7、If the area of the shaded region of the regular hexagon in the diagram

below is 36 cm2, the area of the whole hexagon in cm2 is_____.

8、In what follows, □ and Δ are different numbers.

When 503 is divided by □ the remainder is 20.

When 503 is divided by Δ the remainder is 20.

When 493 is divided by □ x Δ the remainder is_____.

9、A lady, her brother, her son and her daughter (all related by birth) played

volleyball. The worst player"s twin (who is one of the four players) and the

best player are of opposite ***.

The worst player and the best player are of the same age.

Who cannot be the worst player(s)?

A) brother only B) daughter only

C) son and daughter only

D) lady and daughter only

E) lady only

10、If you continue the given number pattern, in what row and in what

position in that row will the number 320 be?

1 -------------- row 1

2 3 -------------- row 2

4 5 6 -------------- row 3

7 8 9 10 -------------- row 4

The answers are given in the order of row ; position.

参考答案：

1、Wednesday 2、12 3、45 4、27(求数位上上的数字之和)5、28=9+9+10，因此答案为810 6、36度 7、108 8、503-20=483 483=3×7×23=21×23，因此□ x Δ=483，因此此题余数是10. 9、D 10、25，20

【篇三】小升初英文奥数试题及答案

关于小升初奥数试题和答案

二年级

1.一辆公交车到A站下车5人，上车7人，到B站下车6人，上车10人，现在车上有40人，车上原来有乘客多少人?

2.13+14+15+16+17+25

三年级

1.十位数字与个位数字之差(大数减小数)等于1的两位数有多少个?

2.A、B、C、D、E五个人一起回答一道题，五个人中只有两个人答对了，所有答对的可能情况有多少种?

四年级

1.有一串数共11个，中间数最大。从中间往前数，一个比一个小2;从中间往后数，一个比一个小3。已知这些数的总和是200，那么中间数是多少?

2.在下面的算式中合适的地方填入“+”、“-”，使等式成立。

0808=1000

五年级

1.有若干名同学需要住宿，如果每间住4人，那么有10人没地方住;如果每间住6人，那么最后一间住不满。这些同学最多有多少名?

2.如图，∠1等于100度，∠2等于60度，∠3等于90度，∠4等于多少度?

六年级

1.78名同学围成一圈，从某个同学开始进行1—18报数，一圈一圈循环下去，那么有没有人同时报过5和10?为什么?

2.有20个队进行比赛，每两个队之间最多赛一场。现在已经共进行了21场比赛，那么是不是一定有一个队至少赛了3场?

答案：

二年级

1.一辆公交车到A站下车5人，上车7人，到B站下车6人，上车10人，现在车上有40人，车上原来有乘客多少人?

解答：40-10+6-7+5=34(人)

2.13+14+15+16+17+25

解答：原式=(13+17)+(14+16)+(15+25)=30+30+40=100

三年级

1.十位数字与个位数字之差(大数减小数)等于1的两位数有多少个?

解答：10、12、21、23、32、……、89、98，共17种。

2.A、B、C、D、E五个人一起回答一道题，五个人中只有两个人答对了，所有答对的可能情况有多少种?

解答：AB、AC、AD、AE、BC、BD、BE、CD、CE、DE，共10种。

四年级

1.有一串数共11个，中间数最大。从中间往前数，一个比一个小2;从中间往后数，一个比一个小3。已知这些数的总和是200，那么中间数是多少?

解答：(200+2+2×2+2×3+2×4+2×5+3+3×2+3×3+3×4+3×5)÷11=25

2.在下面的算式中合适的`地方填入“+”、“-”，使等式成立。

20080808=1000

解答：200+808-0-8=1000

五年级

1.有若干名同学需要住宿，如果每间住4人，那么有10人没地方住;如果每间住6人，那么最后一间住不满。这些同学最多有多少名?

解答：要想让人数最多，那么第二种情况下，最后一间住的人越少越好，即空位越多越好。最后一间至少住2人，最多空4个位置，所以房间最多是(10+4)÷(6-4)=7个，人数最多为4×7+10=38人。

2.如图，∠1等于100度，∠2等于60度，∠3等于90度，∠4等于多少度?

解答：四边形内角和是360度。∠1+∠2+∠3+∠4=180×4-360=360度，∠4=360-100-60-90=110度。

六年级

1.78名同学围成一圈，从某个同学开始进行1—18报数，一圈一圈循环下去，那么有没有人同时报过5和10?为什么?

解答：78÷18余6，且78与18的最大公约数就是6，所以每个人报的数之间的差只能是6，报5的只能报11或17，不可能报10。

2.有20个队进行比赛，每两个队之间最多赛一场。现在已经共进行了21场比赛，那么是不是一定有一个队至少赛了3场?

解答：假设每个队比赛的场数都不到3场，那么每个队最多赛2场，最多共进行2×20÷2=20场比赛，矛盾，所以一定有一个队至少赛了3场。

【篇四】小升初英文奥数试题及答案

小升初的英文奥数试题

1、An ant covers a distance of 90 metres in 3 hours. The average speed of the ant in decimetres per minute is____.

2、

3、In a certain town some people were affected by a ’flu’ epidemic. In the first month 20% of the population contracted the flu whilst 80% were healthy.In the following month 20% of the sick people recovered and 20% of the healthy people contracted the disease.What fraction of the population is healthy at the end of the second month?

4、Mpho, Barry, Sipho, Erica and Fatima are sitting on a park bench.Mpho is not sitting on the far right. Barry is not sitting on the far left.Sipho is not sitting at either end. Erica is sitting to the right of Barry,but not necessarily next to him. Fatima is not sitting next to Sipho.Sipho is not sitting next to Barry.Who is sitting at the far right?

5、Of the 28 T?shirts in a drawer, six are red, five are blue, and the rest arewhite. If Bob selects T?shirts at random whilst packing for a holiday, what is the least number he must remove from the drawer to be sure that he has three T?shirts of the same colour?

6、In an alien language, jalez borg farn means “good maths skills”. Nurf klar borg means“maths in harmony” and darko klar farn means “good in gold”.What is “harmony gold” in this language?

7、Five children, Amelia, Bongani, Charles, Devine and Edwina, were in the classroom when one of them broke a window. The teacher asked each of them to make a statement about the event, knowing that three of them always lie and two always tell the truth. Their statements were as follows:Amelia: “Charles did not break it, nor did Devine.”Bongani: “I didn’t break it, nor did Devine.”Charles: “I didn’t break it, but Edwina did.”Devine: “Amelia or Edwina broke it.”Edwina: “Charles broke it.”Who broke the window?

8、Did you know? A palindrome is a number which reads the same forwards as backwards e.g. 35453. Next year 2002 is an example of a palindromic number. What is the difference between 2002 and the number of the previous palindromic year?

9、If a b = (2×a)?(3×b) then the value of 2 (3 5) is____.

10、Two ants start at point A and walk at the same pace. One ant walks around a 3 cm by 3 cm square whilst the other walks around a 6 cm by 3 cmrectangle. What is the minimum distance, in centimetres, any one mustcover before they meet again?

参考答案：

1、单位换算，注意单词，90×10÷(3×60)=5

2、46

3、0.68

4、Erica

5、抽屉原则 7

6、注意一一对应，borg= maths, farn=good, jalez=skills. Klar=in, Nurf=harmony, darko=gold. 答案是Nurf darko.

7、Charles

8、1001

9、67

10、108

【篇五】小升初英文奥数试题及答案

有关小升初英文奥数试题

1、Did you know? In the decimal number system (base 10) ten different digits, 0 to 9, are used to write all the numbers. In the binary number system (base 2) two different digits are used, i.e. 0 and 1.

Which one of the following numbers is not a valid number in the

octal number system (base 8)?

A) 128 B) 127 C) 126 D) 125 E) 124

2、The number of diagonals that can be drawn in a regular polygon with

twenty sides (icosagon) is_____.

3、If a and b are integers, 103=1,1527=3, and then 3796 is equal to_____.

4、Two numbers are in the ratio 2 : 3. When 4 is added to each number the ratio changes to 5 : 7.The sum of the two original numbers is____.

5、The greatest number of Mondays which can occur in 45 consecutive

days is____

6、Saul plays a video game in which he scores 4 for a hit and lost 6 for a miss. After 20 rounds his score is 30. The number of times he has missed is____.

7、Three girls A, B and C run in a 100 m race. When A finishes, B is 10 m

behind A and when B finishes C is 20 m behind B. How far in metres was C from A when A finished?(Lets assume all the athletes run at a constant speed)

8、The areas of the faces of a rectangulabox are 84 cm2 , 70 cm2and 30 cm2.The volume of the box in cm3 is____.

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