Explain Why 0.15015001500015……. is an Irrational Form. - Mathematics

Explain why 0.15015001500015……. is an irrational form.

Irrational numbers are non-terminating non-recurring decimals.
Thus, 0.15015001500015…. is an irrational number.

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पाठ 1: Real Numbers - Exercises 5

पाठ 1 Real Numbers
Exercises 5 | Q 20

Examine, whether the following number are rational or irrational:

`sqrt3+sqrt2`

In the following equation, find which variables x, y, z etc. represent rational or irrational number:

x² = 5

Find one irrational number between 0.2101 and 0.222... = `0.bar2`

Give an example of two irrational numbers whose:

sum is an irrational number.

Given universal set =
`{ -6, -5 3/4, -sqrt4, -3/5, -3/8, 0, 4/5, 1, 1 2/3, sqrt8, 3.01, π, 8.47 }`

From the given set, find: set of rational numbers

Write a pair of irrational numbers whose product is rational.

`sqrt(12)/sqrt(3)` is not a rational number as `sqrt(12)` and `sqrt(3)` are not integers.

Find whether the variable x represents a rational or an irrational number:

x² = 5

Insert a rational number and an irrational number between the following:

2 and 3

Given that `sqrt(3)` is irrational, prove that `5 + 2sqrt(3)` is irrational.