Advertisements
Advertisements
प्रश्न
Examine, whether the following number are rational or irrational:
`sqrt3+sqrt2`
उत्तर
Let `x=sqrt3+sqrt2` be the rational number
Squaring on both sides, we get
`rArrx^2=(sqrt3+sqrt2)^2`
`rArrx^2=3+2+2sqrt6`
`rArrx^2=5+2sqrt6`
`rArrx^2-5=2sqrt6`
`rArr(x^2-5)/2=sqrt6`
Since, x is rational number
⇒ x2 is rational
⇒ x2 - 5 is rational
`rArr(x^2-5)/2` is rational number
`rArr sqrt6` is rational number
But, `sqrt6` is an irrational number
So, we arrive at contradiction
Hence, `sqrt3+sqrt2` is an irrational number.
APPEARS IN
संबंधित प्रश्न
Give two rational numbers lying between 0.232332333233332... and 0.212112111211112.
Classify the numbers 3.121221222 as rational or irrational:
Give an example of two irrationals whose product is rational.
Show that `2sqrt(7)` is irrational.
Explain why 0.15015001500015……. is an irrational form.
Find the square of : 3 + 2√5
Write a pair of irrational numbers whose difference is rational.
Write a pair of irrational numbers whose sum is rational.
Write a pair of irrational numbers whose difference is irrational.
Insert a rational number and an irrational number between the following:
2 and 3
