Reggie had 70 more coins than Mark. Reggie gave 20% of his coins to Mark. Mark in return gave 50% of his coins to Reggie. In the end, Mark had 156 less coins than Reggie. How many coins did Reggie have at first?
|
Reggie |
Mark |
Comparing Reggie and Peter at first |
70 more |
|
Before |
5 u + 70 |
5 u |
Change 1 |
- 1 u - 14 |
+ 1 u + 14 |
After 1 |
4 u + 56 |
6 u + 14 |
Change 2 |
+ 3 u + 7 |
- 3 u - 7 |
After 2 |
7 u + 63 |
3 u + 7 |
20% =
20100 =
1520% x 70
=
20100 x 70
= 14
50% x 14
=
50100 x 14
= 7
50% x 6 u
=
50100 x 6 u
= 3 u
Mark had 156 less coins than Reggie in the end. If another 156 coins are given to Mark, both will have the same number of coins.
7 u + 63 = 3 u + 7 + 156
7 u - 3 u = 7 + 156 - 63
4 u = 100
1 u = 100 ÷ 4 = 25
Number of Mark's coins at first
= 5 u
= 5 x 25
= 125
Answer: 125