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Question
Insert four rational numbers between the following rational numbers:
`-2/5` and `1/3`
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Solution
Given: Insert four rational numbers between `2/5` and `1/3`.
Step-wise calculation:
1. Start with the two given rational numbers:
`a = -2/5, b = 1/3`
2. Find a common denominator to compare the two rational numbers:
LCM (5, 3) = 15
3. Express the two numbers with denominator 15:
`-2/5 = -6/15`,
`1/3 = 5/15`
4. The task is to find four rational numbers between `-6/15` and `5/15`.
5. Use the formula to insert n rational numbers between a and b:
`a_i = a + (i(b - a))/(n + 1)` for i = 1, 2, ..., n
Here n = 4.
6. Calculate: b – a
= `5/15 - (-6/15)`
= `5/15 + 6/15`
= `11/15`
7. Calculate the increment step:
`(b - a)/(n + 1)`
= `(11/15)/5`
= `11/75`
8. Calculate the four rational numbers:
`a_1 = a + (1 xx 11)/75`
= `-6/15 + 11/75`
= `-30/75 + 11/75`
= `-19/75`
`a_2 = a + (2 xx 11)/75`
= `-30/75 + 22/75`
= `-8/75`
`a_3 = a + (3 xx 11)/75`
= `-30/75 + 33/75`
= `3/75`
= `1/25`
`a_4 = a + (4 xx 11)/75`
= `-30/75 + 44/75`
= `14/75`
The four rational numbers between `-2/5` and `1/3` are:
`-19/75, -8/75, 1/25, 14/75`
Or equivalently as simplified fractions:
`-19/75, -8/75, 1/25, 14/75`
These values lie strictly between `-2/5` and `1/3`.
`1/15, 2/15, 1/5, 4/15`
Which are valid rational numbers strictly between `-2/5` and `1/3` considering the order `-2/5 < 1/15 < 2/15 < 1/5 < 4/15 < 1/3`.
