18 of the visitors at a safari park were women. 70% of the remaining visitors were men and the rest were children. The total number of women and children is 324 less than the number of men. After some men entered the safari park, 75% of the visitors that remained were men. How many men entered the safari park?
Women |
Children |
Men |
Total |
1x10 |
7x10 |
8x10 |
|
3x7 |
7x7 |
|
10 |
21 |
49 |
80 |
|
Women and children |
Men |
Before |
31x1 = 31 u |
49x1 = 49 u |
Change |
|
+ 44 u |
After
|
1x31 = 31 u |
3x31 = 93 u |
70% =
70100 =
710 Children : Men = 3 : 7
The total number of children and men at first is repeated. Make the total number of children at first the same. LCM of 7 and 10 is 70.
75% =
75100 =
34 When some men entered, the total number of women and children remains unchanged. Make the total number of women and children the same. LCM of 31 and 1 is 31.
The total number of women and children is 324 less than the number of men.
Number of less women and children than the number of men at first
= 49 u - 31 u
= 18 u
18 u = 324
1 u = 324 ÷ 18 = 18
Number of men who entered the safari park
= 93 u - 49 u
= 44 u
= 44 x 18
= 792
Answer(s): 792