Gillian had $465 more than Yoko. Gillian gave
23 of her money to Yoko. Yoko then gave 20% of her money to Gillian. In the end, Gillian had $237 less than Yoko. How much did Gillian have at first?
|
Gillian |
Yoko |
Comparing Gillian and Yoko at first |
465 more |
|
Before |
3 u |
+ 465 |
3 u |
|
Change 1 |
- 2 u |
- 310 |
+ 2 u |
+ 310 |
After 1 |
1 u |
+ 155 |
5 u |
+ 310 |
Change 2 |
+ 1 u |
+ 62 |
- 1 u |
- 62 |
After 2 |
2 u |
+ 217 |
4 u |
+ 248 |
23 x 465= 310
465 - 310 = 155
20% x 5 u
=
20100 x 5 u
= 1 u
20% x 310
=
20100 x 310
= 62
310 - 62 = 248
155 + 62 = 217
If Gillian received another $237 in the end, Gillian and Yoko would have the same amount of money.
4 u + 248 = 2 u + 217 + 237
4 u - 2 u = 217 + 237 - 248
2 u = 206
1 u = 206 ÷ 2 = 103
Amount that Gillian had at first
= 3 u + 465
= 3 x 103 + 465
= 309 + 465
= $774
Answer(s): $774