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For the following question

Mary's income is 60% more than Tim's income , and Tim's income is 40% less than Juan's income. What percent of Juan's income is Mary's income? (Ans=96%)

I am attempting to solve this using the following two equations, but I can't figure out what to do next. Suggestions would be appreciated

Mary = Mary + $\frac{60}{100}Tim$

Tim= Tim - $\frac{40}{100}Juan$

2 Answers 2

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Example: $A$ is 10% bigger than $B$ means that $A = (1 + 0.10)B = 1.10B$. And: $A$ is 10% less than $B$ means $A = 1 - 0.10 = 0.90B$.

Example: If I have $200$ apples and you have $300$ apples, then $300/200 = 1.50 = 1 + 0.50$, so you have $50$% more apples that I do. So that is $300 = 200 + 0.50\cdot 200$.

Let $M$ be Mary's income, $T$ be Tim's income, and $J$ be Juan's income. Then you have $M = 1.6T$ and $T = 0.6J$, so $M = 1.6\cdot 0.6J = ...$

As a sidenote: the equations that you wrote down don't really make sense. The first one, for example, would imply that Tim's income is zero (subtract Mary on both sides).

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    @Henry: oops. I edited2012-08-30
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"Mary = Mary + $\frac{60}{100}$Tim" is clearly wrong unless Tim = $0$. Similarly with "Tim = Tim - $\frac{40}{100}$Juan" unless Juan = $0$.

It should be "Mary = Tim + $\frac{60}{100}$Tim" and "Tim = Juan - $\frac{40}{100}$Juan" which [as Thomas says] leads to "Mary $= \left(1+\frac{60}{100}\right)\left(1-\frac{40}{100}\right)$Juan" and thus the result you want.