A stationery kiosk sells notebooks in packs of 4 and 6. At first, there were 4 times as many packs of 4 as packs of 6. After selling half of the packs of 4 and some packs of 6, Mr Ng packs 7 additional packs of 6. How many packs of 4 and 6 are sold if there are 6 times as many packs of 4 as packs of 6 and there is a total of 270 unsold notebooks?
| |
Packs of 4 |
Packs of 6 |
Comparing the number
of packs at first |
4x3 =
12 u |
1x3 =
3 u |
| Before |
2x6 =
12 u |
|
| Change 1 |
- 1x6 =
- 6 u |
- ? |
| Change 2 |
|
+ 7 |
| After |
1x6 =
6 u |
|
Comparing the number
of packs in the end |
6 u |
1 u |
The number of packs of 4 in the end is repeated. Make the number of packs of 4 in the end the same. LCM of 1 and 6 is 6.
The number of packs of 4 at first is repeated. Make the number of packs of 4 at first the same. LCM of 12 and 4 is 12.
Number of notebooks
left unsold |
Packs of 4
|
Packs of 6
|
Total
|
| Number |
6 u |
1 u |
|
| Value |
4 |
6 |
|
| Total value |
24 u |
6 u |
30 u |
Total number of notebooks left unsold
= (6 u x 4) + (1 u x 6)
= 24 u + 6 u
= 30 u
30 u = 270
1 u = 270 ÷ 30 = 9
Number of packs of 4 and 6 sold
= 6 u + (3 u - 1 u) + 7
= 6 u + 2 u + 7
= 8 u + 7
= 8 x 9 + 7
= 72 + 7
= 79
Answer(s): 79
