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Question
Find three rational numbers between `1/4` and `1/5`
Solution 1
Let `x = 1/5` and `y = 1/4`
Here, x < y
Here, we have to find three rational numbers.
Consider, n = 3
∵ `d = (y - x)/(n + 1)`
= `(1/4 - 1/5)/(3 + 1)`
= `((5 - 4)/20)/4`
= `1/80`
Since, the three rational numbers between x and y are x + d, x + 2d and x + 3d.
Now, `x + d = 1/5 + 1/80`
= `(16 + 1)/80`
= `17/80`
`x + 2d = 1/5 + 2/80`
= `(16 + 2)/80`
= `18/80`
= `9/40`
And `x + 3d = 1/5 + 3/80`
= `(16 + 3)/80`
= `19/80`
Hence, three rational numbers between `1/4` and `1/5` are `17/80, 9/40, 19/80`
Solution 2
Let `x = 1/4` and `y = 1/5`
So, a rational number between x and y = `(x + y)/2`
∴ A rational number between `1/4` and `1/5`
= `(1/4 + 1/5)/2`
= `((5 + 4)/20)/2`
= `9/(2 xx 20)`
= `9/40`
Again, a rational number between `1/4` and `9/40`
= `(1/4 + 9/40)/2`
= `((10 + 9)/40)/2`
= `19/(2 xx 40)`
= `19/80`
Again, a rational number between `1/5` and `9/40`
= `(1/5 + 9/40)/2`
= `((8 + 9)/40)/2`
= `(17/40)/2`
= `17/(40 xx 2)`
= `17/80`
Hence, three rational numbers between `1/4` and `1/5` are `9/40, 19/80, 17/80`
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