Tank E contained 2 times as many guppies as Tank F. When 10% of the guppies in Tank E and 40% of the guppies in Tank F were transferred to Tank G, Tank G had 36 guppies, which was 20% more guppies than before. How many less guppies were there in Tank F than Tank E in the end?
|
Tank E |
Tank F |
Tank G |
Before |
2 u |
1 u |
5x0.6 = 3 u |
Change |
- 0.2 u |
- 0.4 u |
+ 1x0.6 = + 0.6 u |
After |
1.8 u |
0.6 u |
6x0.6 = 3.6 u |
Number of guppies that were transferred from Tank E to Tank G
= 10% x 2 u
=
10100 x 2 u
= 0.2 u
Number of guppies that were transferred from Tank F to Tank G
= 40% x 1 u
=
40100 x 1 u
= 0.4 u
20% =
20100 =
15Some guppies from Tank E and Tank F were transferred to Tank G. The total number of guppies transferred from Tank E and Tank F into Tank G is the same.
Total number of guppies transferred from Tank E and Tank F into Tank G
= 0.2 u + 0.4 u
= 0.6 u
3.6 u = 36
1 u = 36 ÷ 3.6 = 10
Number of less guppies in Tank F than Tank E
= 1.8 u - 0.6 u
= 1.2 u
= 1.2 x 10
= 12
Answer(s): 12