The decimal representation of a irrational number is
Answers
Answer:
Decimal Representation of Irrational Number.
When an irrational number is changed into a decimal, the resulting number is a nonterminating, nonrecurring decimal. For example, consider the decimal representation of √2: ... Actually, π is a non-terminating, nonrecurring decimal number and so π is also an irrational number.
non terminating non repeating.
Step-by-step explanation:
Decimal representation of an irrational number is always non terminating non repeating.
For example,
√2 =1.41421356237309504880168872420969807856967187537694807317667973799...
When an irrational number is changed into a decimal, the resulting number is a non terminating, nonrecurring decimal.
A decimal representation of a non-negative real number r is an expression in the form of a series, traditionally written as a sum
#Learn more:
A number is irrational if and only its decimal representation is
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