Integers: 1, 2, 0, -3, ...
Fractions: 1/2, -2/3, 7/5, 1 2/5 (this is the same as 7/5), ...
Irrational Numbers: square root of 2, square root of 3, pi, e, e2, ...
some real life examples are a water bottle, pipes, cans
Some examples for parallel lines- railroad tracks, steps, buildings, paper, windows, ect. Some examples for perpendicular lines- stop sign, bridge, street intersection, driveway into a street, ect.
bee's hive
Scales or balances.
Kite
All rational numbers are examples of numbers which are both rational and real.
There are many examples of daily life applications of real numbers. Some of these examples include clocks and calendars.
The square roots of negative numbers.
please give me examples of roots of irratoinal numbers now!
No. Real numbers are equivalence classes of cauchy sequences of rational numbers, which in turn are equivalence classes of pairs of integers (or whole numbers). Examples of real numbers that are not rational and therefore not integer are sqrt(2) and pi. Examples of real numbers that are rational but not integer are 1/2 and 13/17.
sets
I would be greatly surprised if you will find any examples that ude real numbers - whether or not it is in real life!
Natural numbers or Counting numbers Integers Rational numbers Irrational numbers
There are a lot of numbers in between those two; so I will give you three examples. Examples: 0.5, 0.4, 0.3
2, 3 and 5
Give me answers
1,0,5,2,3,6,9,8 True. But the following are also Real numbers: 0.5, sqrt(2), π (the ratio of the circumference of a circle to its diameter), etc.