a man shares $100 between his son and daughter in the ratio 9:7 how much more money does his son receive than his daughter?
a man shares $100 between his son and daughter in the ratio 9:7 how much more money does his son receive than his daughter?
Answer: To determine how much more money the son receives than the daughter, we need to calculate the amounts each of them receives based on the given ratio.
The total ratio is 9 + 7 = 16.
Let's find out the share of the son and daughter:
Son's share = (9/16) * $100
Daughter's share = (7/16) * $100
Calculating these amounts:
Son's share = (9/16) * $100 = $56.25
Daughter's share = (7/16) * $100 = $43.75
The son receives $56.25, and the daughter receives $43.75. To find out how much more money the son receives than the daughter, we subtract the daughter's share from the son's share:
Son's share - Daughter's share = $56.25 - $43.75 = $12.50
Therefore, the son receives $12.50 more than the daughter.
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