• Congratulations to the Class of 2024 on your results!
    Let us know how you went here
    Got a question about your uni preferences? Ask us here

Help with these fractions..=S (2 Viewers)

Joined
Feb 21, 2008
Messages
31
Gender
Female
HSC
2008
I have just started a degree in primary teaching and we have to pass a maths test to get in and on the sample test papers this question had me stumped, it is probably very simple to do I just cannot remember how to do it.

So and so gave away 1/5, 1/3 and 1/6 of his apples, 18 apples remain. So how many apples were there initially?

Help on how to work that out would be much appreciated =]

[note: the use of calculators is not permitted.]
 
Last edited:

cutemouse

Account Closed
Joined
Apr 23, 2007
Messages
2,250
Gender
Undisclosed
HSC
N/A
I have just started a degree in primary teaching and we have to pass a maths test to get in and on the sample test papers this question had me stumped, it is probably very simple to do I just cannot remember how to do it.

So and so gave away 1/5, 1/3 and 1/6 of his apples, 18 apples remain. So how many apples were there initially?

Help on how to work that out would be much appreciated =]
Umm... I assume he gave away 1/5 then gave away 1/3 of that and then 1/6 of that....

If so, he's given away (1/5)*(1/3)*(1/6) of his apples. So he's given away 1/90 of his apples, from the amount that he initially had.

If you let X be the amount of apple the person initially had then X*(1/90)=18, X=1620... The person initially had 1620 apples.

I don't know if this is correct, so feel free to comment if I'm wrong :)
 

Kujah

Moderator
Joined
Oct 15, 2006
Messages
4,736
Gender
Undisclosed
HSC
N/A
Are the respective 1/5, 1/6 and 1/3 out of the original number of apples or as she gives them away individually? :confused:
 

lolokay

Active Member
Joined
Mar 21, 2008
Messages
1,015
Gender
Undisclosed
HSC
2009
kujah is correct (his post under this)

and as his method shows, it's usually best to set these up as algebra problems, letting the unknown quantity be x (for example)
 
Last edited:

Kujah

Moderator
Joined
Oct 15, 2006
Messages
4,736
Gender
Undisclosed
HSC
N/A
So this is right:

^There are too many apples :) Correct me if I'm wrong with this, I haven't done maths for ages!

Okay, let x = total number of apples.

x/5 + x/3 + x/6 = x - 18

Basically, the addition of 1/5, 1/3 and 1/6 of the total number of apples will equal the apples that have been given away.

So,

6x + 10x + 5x / 30 = x - 18 (through LCD and all that)

21x/ 30 = x -18

21x = 30x - 540

9x = 540

x = 60

Test it out to see if it works:
1/5 of 60 = 12
1/3 of 60 = 20
1/6 of 60 = 10

Answer = 42 apples have been given away from a total of 60 apples, meaning that 18 are left.
 

untouchablecuz

Active Member
Joined
Mar 25, 2008
Messages
1,693
Gender
Male
HSC
2009
Umm... I assume he gave away 1/5 then gave away 1/3 of that and then 1/6 of that....

If so, he's given away (1/5)*(1/3)*(1/6) of his apples. So he's given away 1/90 of his apples, from the amount that he initially had.

If you let X be the amount of apple the person initially had then X*(1/90)=18, X=1620... The person initially had 1620 apples.

I don't know if this is correct, so feel free to comment if I'm wrong :)
i THINK your wrong, correct me if i'm wrong

let the original amount of apples = x

so from the original amount of apples, 1/5, 1/3 and 1/6 apples were removed with 18 remaining

that is,

(the original amount) - (x/5 + x/3+x/6) = 18

x - (x/5 + x/3 + x/6) = 18

Solving for x we get 60 apples initially
 
Joined
Feb 21, 2008
Messages
31
Gender
Female
HSC
2008
Are the respective 1/5, 1/6 and 1/3 out of the original number of apples or as she gives them away individually? :confused:
I am assuming that they are given away from the original number of apples as the question states:
"Eric had a box of apples. He gave 1/5 to so and so, 1/3 to someone else and a 1/6 to another person. There were still 18 apples remaining in the box. How many apples were there originally?"


Thanks for everyone's help. I'll have to write it down and see if I can work it out. Although I'm not sure who was correct =s
 
Joined
Feb 21, 2008
Messages
31
Gender
Female
HSC
2008
So this is right:

^There are too many apples :) Correct me if I'm wrong with this, I haven't done maths for ages!

Okay, let x = total number of apples.

x/5 + x/3 + x/6 = x - 18

Basically, the addition of 1/5, 1/3 and 1/6 of the total number of apples will equal the apples that have been given away.

So,

6x + 10x + 5x / 30 = x - 18 (through LCD and all that)

21x/ 30 = x -18

21x = 30x - 540

9x = 540

x = 60

Test it out to see if it works:
1/5 of 60 = 12
1/3 of 60 = 20
1/6 of 60 = 10

Answer = 42 apples have been given away from a total of 60 apples, meaning that 18 are left.
Thanks heaps. But I'm not sure whether I understand the working out towards the answer. The answer seems right I just don't get how you got there.

In particular "6x + 10x + 5x / 30 = x - 18 (through LCD and all that)"
=S may have to elaborate a bit as I haven't done maths in a long time either.. sorry =[
 

Kujah

Moderator
Joined
Oct 15, 2006
Messages
4,736
Gender
Undisclosed
HSC
N/A
Okay, so we had x/5 + x/3 + x/6 = x-18.

For the left hand side, we want to find a common number for the denominators. 30 comes to mind, and is the closest option. We multiply the numerator and denominator by 6 to get 6x/30, x/3 by 10 to get 10x/30 and x/6 by 5 to get 5x/30.

Since we have 6x/30 + 10x/30 + 5x/30, its just simply a method of then adding the numerators together to get 21x/30.

After that, we cross-multiply.
 
Joined
Feb 21, 2008
Messages
31
Gender
Female
HSC
2008
Okay, so we had x/5 + x/3 + x/6 = x-18.

For the left hand side, we want to find a common number for the denominators. 30 comes to mind, and is the closest option. We multiply the numerator and denominator by 6 to get 6x/30, x/3 by 10 to get 10x/30 and x/6 by 5 to get 5x/30.

Since we have 6x/30 + 10x/30 + 5x/30, its just simply a method of then adding the numerators together to get 21x/30.

After that, we cross-multiply.
I get you =]
Thanks heaps.
 

PC

Member
Joined
Aug 19, 2004
Messages
639
Location
Sydney
Gender
Undisclosed
HSC
N/A
But if this is for PRIMARY school, will they be using algebra at all? Can we do it without algebra?

If so and so gave away 1/5, 1/3 and 1/6 of the original amount, then ...

1/5 + 1/3 + 1/6 = 6/30 + 10/30 + 5/30 = 21/30 have been given away.
That means that 9/30 of the original amount remain.
So 9/30 of original amount = 18 apples.
Divide by 9.
1/30 of original amount = 2 apples
Multiply by 30.
Original amount = 60 apples

If the fractions apply to the number of apples present at each stage, then it's much harder, but just work backwards.

1/6 of the total were given away, so 5/6 remain, and this is 18 apples.
Divide by 5.
1/6 of total = 18/5
Multiply by 6.
Total = 21 3/5

1/3 of total were given away, so 2/3 remain, and this is 21 3/5 apples.
Divide by 2.
1/3 of total = 10 4/5
Multiply by 3.
Total = 32 2/5

1/5 of total were given away, so 4/5 remain, and this is 32 2/5 apples.
Divide by 4.
1/5 of total = 8 1/10
Multiply by 5.
Total = 40 1/2

So we started with 40 1/2 apples.

That doesn't make sense, so I reckon it's the first way. :)
 

lolokay

Active Member
Joined
Mar 21, 2008
Messages
1,015
Gender
Undisclosed
HSC
2009
well you don't add/multiply fractions either in primary school

the question is just to test your mathematical ability. it doesn't necessarily need to be a primary school problem.
 

dux&src

just a star-crossed lover
Joined
May 27, 2008
Messages
1,370
Gender
Undisclosed
HSC
2010
^ the first way is right :p
Nice work guys.
 

LobbSACS

Member
Joined
Feb 14, 2009
Messages
31
Gender
Male
HSC
2009
well you don't add/multiply fractions either in primary school

the question is just to test your mathematical ability. it doesn't necessarily need to be a primary school problem.
i did, in from year 5 onwards rofl.
 

lolokay

Active Member
Joined
Mar 21, 2008
Messages
1,015
Gender
Undisclosed
HSC
2009
wtf we didnt learn that until high school
 

LobbSACS

Member
Joined
Feb 14, 2009
Messages
31
Gender
Male
HSC
2009
well, we were taught it in year 5 and 6, i didnt pay any attention to it untill about year 11

:p
 

Users Who Are Viewing This Thread (Users: 0, Guests: 2)

Top