At first, the ratio of the number of boys to the number of girls at a stadium was 4 : 5. When 46 girls and some boys entered the stadium, the number of girls increased by 10% and the total number of children at the stadium increased by 25%.
- How many boys were there at first?
- What percentage of the children at the stadium were boys in the end? Express your answer as a mixed number.
(a)
Boys |
Girls |
Total |
4 u |
5 u |
9 u |
(+ 161) |
+ 0.5 u (+ 46) |
+ 2.25 u (+ 207) |
4 u + 161 |
5.5 u |
11.25 u |
Number of girls that entered the stadium
= 10% x 5 u
=
10100 x 5 u
= 0.5 u
0.5 u = 46
1 u = 46 ÷ 0.5 = 92
Number of boys at first
= 4 u
= 4 x 92
= 368
(b)
Increase in the number of children
= 25% x 9 u
=
25100 x 9 u
= 2.25 u
Total number of children at the stadium in the end
= 9 u + 2.25 u
= 11.25 u
= 11.25 x 92
= 1035
Increase in the number of boys
= 207 - 46
= 161
Total number of boys in the end
= 4 u + 161
= 4 x 92 + 161
= 529
Percentage of children who were boys
=
5291035 x 100
= 51
19%
Answer(s): (a) 368; (b) 51
19%