The ratio of the number of tarts in Container T to the number of tarts in Container U was 7 : 3. 10% of the tarts in Container T and 0.9 of those in Container U were vanilla. After transferring the tarts between the 2 boxes, the number of butter cream tarts in both boxes are the same. Likewise, the number of vanilla tarts in both boxes are the same. If a total of 200 tarts were moved, how many more tarts were there in Container T than Container U at first?
Container T |
Container U |
7 u |
3 u |
Vanilla |
Butter Cream |
Vanilla |
Butter Cream |
0.7 u |
6.3 u |
2.7 u |
0.3 u |
+ 1 u |
- 3 u |
- 1 u |
+ 3 u |
1.7 u |
3.3 u |
1.7 u |
3.3 u |
Number of vanilla tarts in Container T
= 10% x 7 u
=
10100 x 7 u
= 0.7 u
Number of butter cream tarts in Container T
= 7 u - 0.7 u
= 6.3 u
Number of vanilla tarts in Container U
= 0.9 x 3 u
= 2.7 u
Number of butter cream tarts in Container U
= 3 u - 2.7 u
= 0.3 u
Number of vanilla tarts in each box in the end
= (0.7 u + 2.7 u) ÷ 2
= 3.4 u ÷ 2
= 1.7 u
Number of butter cream tarts in each box in the end
= (6.3 u + 0.3 u) ÷ 2
= 6.6 u ÷ 2
= 3.3 u
Number of tarts moved
= 1 u + 3 u
= 4 u
4 u = 200
1 u = 200 ÷ 4 = 50
Number of more tarts in Container T than Container U at first
= 7 u - 3 u
= 4 u
= 4 x 50
= 200
Answer(s): 200