Tutor MathsGuru: Ask me for your burning Maths questions!
-
clblinym:
Source: Singapore Mathematical Olympiad for Primary Schools 2005 - Q24.Hi, Parents
Can anyone help solve the following math question. Many thanks.
The answer given is 5:2.
Amy
http://www.postimage.org/image.php?v=aVi95Tr -
Bommu99:
Source: Singapore Mathematical Olympiad for Primary Schools 2007 - First round - Q1 and Q3.Hi Mathsguru,
Would greatly appreciate your help to solve these 2 questions which are among the SMOPS sample questions.
Thanks,
Bommu99
http://www.postimage.org/image.php?v=gx11D_jS -
Hi guys, do you have a quick way of doing this???
Thanks!
Grandma sent Johnny some money for his birthday. Johnny spent all of it in five stores. In each store, he spent $1.00 more than half of what he had when he came in. How much money did he get from grandma? -
Muffins:
Can be done backwards way..Hi guys, do you have a quick way of doing this???
Thanks!
Grandma sent Johnny some money for his birthday. Johnny spent all of it in five stores. In each store, he spent $1.00 more than half of what he had when he came in. How much money did he get from grandma?
Amount he had when he came into 5th store = $2 (since 1 dollar more than half is all he has)
Amount he had when he came into 4th store = (2+1)2 = 6 (as he spent $1 more than half in 4th store leaving $1 less than half for 5th store)
Amount he had when he came into 3th store = (6+1)2 = 14
Amount he had when he came into 2th store = (14+1)2 = 30
Amount he had when he came into 1th store = (30+1)2 = 62
Money he got from grandma = $62
HTH -
Q1
Teams X and Y work separately on two different projects.
On sunny days, team X can complete the work in 12 days while team Y needs 15 days.
On rainy days, team X's efficiency decreases by 50% while team Y's efficiency decreases by 25%.
Given that the two teams started and ended the the projects at the same time, how many rainy days are there?
Q2
2004 students arrange themselves in a row.
In the first round of counting, they number themselves
1,2,3,1,2,3,1,2,3,........ from left to right.
In the second round of counting, they number themselves
1,2,3,4,5,1,2,3,4,5,1,2,3,4,5........ from right to left.
Find the number of students whose sum of numbers in the first and second rounds of counting is 5.
Q3
Tom walks up a staircase.
Each time he can either take one step or two steps.
How many ways are there for Tom to walk up a ten-step staircase?
Q4
Two points A and B are 1100 m apart.
Alice and Ben leave point A at the same time and travel to and fro along a straight road between A and B at uniform speeds. Alice and Ben travel at 60 m/min and 160 m/min respectively. They both stop after 40 minutes.
(i) At which meeting are they nearest to point B?
(ii) Find the nearest distance in metre.
Source: Asia Pacific Mathematical Olympiad for Primary Schools 2004.
Sorry, I could not find the given answers for the above questions. Your effort and time to provide worked solutions for them are appreciated.
-
iFruit:
Thanks iFruit, I had gotten it via this method as well, but just wanted to find whether there was a quicker way of doing this
Can be done backwards way..Muffins:
Hi guys, do you have a quick way of doing this???
Thanks!
Grandma sent Johnny some money for his birthday. Johnny spent all of it in five stores. In each store, he spent $1.00 more than half of what he had when he came in. How much money did he get from grandma?
Amount he had when he came into 5th store = $2 (since 1 dollar more than half is all he has)
Amount he had when he came into 4th store = (2+1)2 = 6 (as he spent $1 more than half in 4th store leaving $1 less than half for 5th store)
Amount he had when he came into 3th store = (6+1)2 = 14
Amount he had when he came into 2th store = (14+1)2 = 30
Amount he had when he came into 1th store = (30+1)2 = 62
Money he got from grandma = $62
HTH
-
Vanilla Cake:
Amount of work done by Team X on sunny day = 1/12Q1
Teams X and Y work separately on two different projects.
On sunny days, team X can complete the work in 12 days while team Y needs 15 days.
On rainy days, team X's efficiency decreases by 50% while team Y's efficiency decreases by 25%.
Given that the two teams started and ended the the projects at the same time, how many rainy days are there?
Amount of work done by Team X on rainy day = 1/2 x 1/12 = 1/24
Amount of work done by Team X on sunny day = 1/15
Amount of work done by Team X on rainy day = 3/4 x 1/15 = 1/20
Suppose it took s sunny days and r rainy days to finish project.
Then
s/12 + r/24 = s/15 + r/20
(2s+r)/24 = (4s+3r)/60 -----> (2s+r)/2 = (4s+3r)/5 --> 10s + 5r = 8s + 6r ---> 2s = r
we also know s/12 + r/24 = 1 (total work)
so s/12 + 2s/24 = 1 --> s= 6
so rainy days = 12 -
Vanilla Cake:
because 2004 is divisible by 3, there are 2004/3 = 668 groups three students each.Q1
Q2
2004 students arrange themselves in a row.
In the first round of counting, they number themselves
1,2,3,1,2,3,1,2,3,........ from left to right.
In the second round of counting, they number themselves
1,2,3,4,5,1,2,3,4,5,1,2,3,4,5........ from right to left.
Find the number of students whose sum of numbers in the first and second rounds of counting is 5.
if you take (5x3) = 15 groups of students ( starting from right most side) the arrangement from left to right and right to left will be as below, with students in bold get a sum count of 5
123123123123123----> left to right
543215432154321----> right to left
because 668 = 133x5 + 3, we will have 133 groups of 15 students in above manner and there will be three students left out with
123
321
so the number of students with sum count of 5 = 133 x 3 = 399 -
Hi iFruit,
Thank you very much for your quick response and helpful solutions.
The questions are from http://www.hci.sg/aphelion/apmops/2007/pdf/English/2004%20English%20IR.pdf but no answer keys are given. -
Vanilla Cake:
This is a fibonacci series. It is explained in the math hub olympiad challenge thread.Q1
Q3
Tom walks up a staircase.
Each time he can either take one step or two steps.
How many ways are there for Tom to walk up a ten-step staircase?
so the number ways for n steps taken will be in this form.
1 2 3 5 8 13 21 34 55 89 144...
so for 10 steps = 89 ways
Hello! It looks like you're interested in this conversation, but you don't have an account yet.
Getting fed up of having to scroll through the same posts each visit? When you register for an account, you'll always come back to exactly where you were before, and choose to be notified of new replies (either via email, or push notification). You'll also be able to save bookmarks and upvote posts to show your appreciation to other community members.
With your input, this post could be even better π
Register Login