Roshel's school organized a trip to Haiti. At first, the ratio of the number of boys to the number of girls who planned to participate in the trip was 7 : 5. On the day of registration, 144 girls decided to withdraw and 144 more boys decided to join in. In the end, the number of girls who participated became 15% of the total children for the trip. How many less girls than boys would visit Haiti in the end?
|
Boys |
Girls |
Total |
Before |
7x5 = 35 u |
5x5 = 25 u |
12x5 = 60 u |
Change |
+ 16 u |
- 16 u |
|
After |
17x3 = 51 u |
3x3 = 9 u |
20x3 = 60 u |
15% =
15100 =
320Since 144 girls withdrew and another 144 boys joined, the total number of children at first and in the end remains unchanged. Make the total number of children the same. LCM of 12 and 20 is 60.
Number of girls who decided to withdraw
= 25 u - 9 u
= 16 u
16 u = 144
1 u = 144 ÷ 16 = 9
Number of less girls than boys in the end
= 51 u - 9 u
= 42 u
= 42 x 9
= 378
Answer(s): 378