Advertisements
Advertisements
Question
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 irrational numbers
Solution
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}`
We need to find the set of irrational numbers.
Irrational numbers are numbers which are not rational.
From the above subpart, the set of rational
Numbers is Q,
and Q = `{-6, -5 3/4, -3/5, -3/8, 0, 4/5, 1, 1 2/3, 3.01, 8.47}`
Set of irrational numbers is the set of complement of the rational numbers over real numbers.
Here the set of irrational numbers is U - Q = {√8, π}
APPEARS IN
RELATED QUESTIONS
State, in each case, whether true or false :
√2 + √3 = √5
State, in each case, whether true or false :
2√4 + 2 = 6
State, in each case, whether true or false :
3√7 - 2√7 = √7
State, in each case, whether true or false :
All rational numbers are real numbers.
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 non-negative integers
Write in ascending order: 3√5 and 4√3
Write in ascending order : 6√5, 7√3 and 8√2
Write in ascending order : 6√5, 7√3, and 8√2
Compare: `root(6)(15) and root(4)(12)`
Simplify : (√3 - √2 )2
