Can we show that $0.01001000100001 . . . . . .$ is an irrational number using the contradiction method?

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Solution

Any number which cannot be expressed in the form of a simple fraction is termed an irrational number.
The number cannot be expressed as $\frac{p}{q}$ where $p$ and $q$ are integers and $q \neq 0$ are known as irrational numbers.
If we try to express an irrational number in the decimal form then it is neither terminating nor recurring.
Examples of $\sqrt{2}, \sqrt{3}$ the value of $π = 3.14159265358979 \dots$
In the given number $0.01001000100001......$ the decimals are neither terminating nor recurring. Hence it is a contradiction of rational numbers.
Hence, it is an irrational number.

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