The sum of two numbers is 184. If one-third of the one exceeds one - seventh of the other by 8, find the smaller number?
Question
The sum of two numbers is 184. If one-third of the one exceeds one - seventh of the other by 8, find the smaller number?
Solution
Let's denote the two numbers as x and y.
From the problem, we know that:
-
x + y = 184 (because the sum of the two numbers is 184)
-
(1/3)x - (1/7)y = 8 (because one-third of the one exceeds one-seventh of the other by 8)
We can solve these two equations to find the values of x and y.
First, let's multiply the second equation by 21 to get rid of the fractions:
7x - 3y = 168
Now we have two new equations:
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x + y = 184
-
7x - 3y = 168
We can multiply the first equation by 3 and the second equation by 1:
3x + 3y = 552
7x - 3y = 168
Now, add these two equations together:
10x = 720
Divide by 10:
x = 72
Substitute x = 72 into the first equation:
72 + y = 184
Subtract 72 from both sides:
y = 184 - 72 = 112
So, the two numbers are 72 and 112. The smaller number is 72.
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