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प्रश्न
The number of decimal place after which the decimal expansion of the rational number \[\frac{23}{2^2 \times 5}\] will terminate, is
विकल्प
1
2
3
4
उत्तर
We have,
`23/(2^2xx5^1)`
Theorem states:
Let `x= p/q` be a rational number, such that the prime factorization of q is of the form `2^mxx5^n`, where m andn are non-negative integers.
Then, x has a decimal expression which terminates after k places of decimals, where k is the larger of mand n.
This is given that the prime factorization of the denominator is of the form`2^mxx5^n`.
Hence, it has terminating decimal expansion which terminates after 2 places of decimal.
Hence, the correct choice is (b).
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