Mathematics

Express 0.99999 …. in the form $\dfrac{p}{q}$ . Are you surprised by your answer? With your teacher and classmates discuss why the answer makes sense.

Number System

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Answer

Let x = 0.99999 …….. (1)

Here one digit 9 is repeating so we multiply both side by 10 in equation (1)

10 x = 9.99999………. (2)

By subtracting equation (2) - equation (1)

10 x -x = 9.99999…….. - 0.99999……..

9x = 9

x = $\dfrac{9}{9}$

x = 1

Therefore, (0.99999…) is equivalent to (1), which might seem surprising at first glance, but it makes sense mathematically. This result can be demonstrated by the fact that any number infinitesimally close to 1 but less than 1, when infinitely added to itself, equals 1.
For example, if we take (0.9) and add (0.09), we get (0.99), and if we add (0.009) to that, we get (0.999), and so on. As we keep adding these infinitesimal increments, we approach (1). So, in a way, (0.99999…) is just another way to represent the number (1).

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Mathematics

Express 0.99999 …. in the form $\dfrac{p}{q}$ . Are you surprised by your answer? With your teacher and classmates discuss why the answer makes sense.

Number System

Answer

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Express 0.99999 …. in the form pq\dfrac{p}{q}qp​. Are you surprised by your answer? With your teacher and classmates discuss why the answer makes sense.

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