I guess it is time for some more problem solving, since someone sent this question in.
Two numbers are in the ratio of 1:2. If 7 be added to both, their ratio changes to 3:5. What is the greater number?
We can model the two original numbers with blocks. 1 block and 2 blocks makes the ratio to be 1:2.
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|-------|-------|
Now add the same thing to both (the 7):
7The way I just happened to draw these suggests that I could just split the original block in two, and the problem is solved:
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|-------|-------|---|
7
7Here, each little block is 7. The original larger blocks are 14 each.
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7
So the original bigger number, which had two larger blocks, is 28, and the smaller ! number is 14.
Check:
Their ratio is 28:14 = 2:1. If you add 7 to both, you have 35 and 21, and their ratio is 35:21 = 5:3.
Solving the same problem using algebra
The two numbers in the ratio of 1:2 are x and 2x.
Once 7 is added to both, we have x + 7 and 2x + 7. Their ratio is 3:5, and we can write a proportion using fractions:
x + 7 3
------- = ----
2x + 7 5
Cross-multiply to get
5(x + 7) = 3(2x + 7)
5x + 35 = 6x + 21
35 - 21 = x
x = 14
The larger number was 2x or 28. We already checked this earlier.
Solving math ratios
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