The ratio of the number of biscuits in Container L to the number of biscuits in Container M was 9 : 5. 40% of the biscuits in Container L and 0.8 of those in Container M were matcha. After transferring the biscuits between the 2 boxes, the number of peach biscuits in both boxes are the same. Likewise, the number of matcha biscuits in both boxes are the same. If a total of 156 biscuits were moved, how many more biscuits were there in Container L than Container M at first?
Container L |
Container M |
9 u |
5 u |
Matcha |
Peach |
Matcha |
Peach |
3.6 u |
5.4 u |
4 u |
1 u |
+ 0.2 u |
- 2.2 u |
- 0.2 u |
+ 2.2 u |
3.8 u |
3.2 u |
3.8 u |
3.2 u |
Number of matcha biscuits in Container L
= 40% x 9 u
=
40100 x 9 u
= 3.6 u
Number of peach biscuits in Container L
= 9 u - 3.6 u
= 5.4 u
Number of matcha biscuits in Container M
= 0.8 x 5 u
= 4 u
Number of peach biscuits in Container M
= 5 u - 4 u
= 1 u
Number of matcha biscuits in each box in the end
= (3.6 u + 4 u) ÷ 2
= 7.6 u ÷ 2
= 3.8 u
Number of peach biscuits in each box in the end
= (5.4 u + 1 u) ÷ 2
= 6.4 u ÷ 2
= 3.2 u
Number of biscuits moved
= 0.2 u + 2.2 u
= 2.4 u
2.4 u = 156
1 u = 156 ÷ 2.4 = 65
Number of more biscuits in Container L than Container M at first
= 9 u - 5 u
= 4 u
= 4 x 65
= 260
Answer(s): 260