Rational and Irrational Numbers

1. a b 4 2 2 6 = 6 = 5 3 1 8 27 0.7 = 3 10 3456 2.7 34.56 1 5 1 3 7 = = 3 0.625 = - -3 100 = 8 10 7 11 3 = 0.142857 1 0.3 = = 0.27 Rational and Irrational Numbers Rational Numbers A rational number is any number that can be expressed as the ratio of two integers. All terminating and repeating decimals can be expressed in this way so they are irrational numbers. Examples

2. a Show that the terminating decimals below are rational. b 0.6 3.8 2.157 56.1 3.45 38 561 345 2157 10 10 100 1000 6 10 Rational and Irrational Numbers Rational Numbers A rational number is any number that can be expressed as the ratio of two integers. All terminating and repeating decimals can be expressed in this way so they are irrational numbers. Rational

3. a b 0.45 0.3 0.273 1234 273 0.1234 999 9999 3 45 9 99 Rational and Irrational Numbers Rational Numbers A rational number is any number that can be expressed as the ratio of two integers. All terminating and repeating decimals can be expressed in this way so they are irrational numbers. By looking at the previous examples can you spot a quick method of determining the rational number for any given repeating decimal.

4. The history of irrational numbers begins with a discovery by the Pythagorean School in ancient Greece. A member of the school discovered that the diagonal of a unit square could not be expressed as the ratio of any two whole numbers. The motto of the school was “All is Number” (by which they meant whole numbers). Pythagoras believed in the absoluteness of whole numbers and could not accept the discovery. The member of the group that made it was Hippasus and he was sentenced to death by drowning. (See slide 19/20 for more history) a b Pythagoras 1 1 Rational and Irrational Numbers Irrational Numbers An irrational number is any number that cannot be expressed as the ratio of two integers. Irrational

5. a b Pythagoras 1 1 Rational and Irrational Numbers Irrational Numbers An irrational number is any number that cannot be expressed as the ratio of two integers. Intuition alone may convince you that all points on the “Real Number” line can be constructed from just the infinite set of rational numbers, after all between any two rational numbers we can always find another. It took mathematicians hundreds of years to show that the majority of Real Numbers are in fact irrational. The rationals and irrationals are needed together in order to complete the continuum that is the set of “Real Numbers”.

6. For example: and for example and Rational and Irrational Numbers Multiplication and division of surds. also

7. is rational Show that rational Show that is rational rational Rational and Irrational Numbers Example questions a b

8. Rational and Irrational Numbers Questions State whether each of the following are rational or irrational. a c b d irrational rational irrational rational h g f e irrational rational rational rational

9. Rational and Irrational Numbers Combining Rationals and Irrationals Determine whether the following are rational or irrational. (a) 0.73 (b) (c) 0.666…. (d) 3.142 (e) irrational rational rational rational irrational (f) (g) (h) (i) (j) irrational rational rational irrational irrational (j) (k) (l) rational rational irrational