Advertisements
Advertisements
प्रश्न
Prove that `1/sqrt (3)` is irrational.
उत्तर
Let `1/sqrt (3)` be rational.
∴ `1/sqrt (3) = a/b` , where a, b are positive integers having no common factor other than 1
∴` sqrt(3) = b/a` ….(1)
Since a, b are non-zero integers, `b/a`is rational.
Thus, equation (1) shows that `sqrt (3)` is rational.
This contradicts the fact that `sqrt(3)` is rational.
The contradiction arises by assuming `sqrt(3)` is rational.
Hence, `1/sqrt (3)` is irrational.
APPEARS IN
संबंधित प्रश्न
Show how `sqrt5` can be represented on the number line.
Prove that 3 + 2`sqrt5` is irrational.
Examine, whether the following number are rational or irrational:
`(sqrt2+sqrt3)^2`
In the following equation, find which variables x, y, z etc. represent rational or irrational number:
x2 = 5
Classify the numbers `root (3)(3)` as rational or irrational:
An irrational number between 2 and 2.5 is
State, whether the following numbers is rational or not : ( 3 - √3 )2
State whether the following number is rational or irrational
`((sqrt5)/(3sqrt(2)))^2`
Write the following in descending order:
`5sqrt(3), sqrt(15) and 3sqrt(5)`
Prove that `7 + 4sqrt(5)` is an irrational number, given that `sqrt(5)` is an irrational number.
