. Write each of the following sets (i) in set builder form (ii) in listing its elements.
(1) The set N of natural numbers.
(2) The set J of all positive integers.
(3) The set P of all prime numbers.
(4) The set A of all positive integers that lie between 1 and 13.
(5) The set B of real numbers which satisfy the equation 3x2 + 5x – 2 = 0.
- Choose a suitable description (a) of (b) or (c) in set builder form for the following sets.
(1) E ={ 2, 4, 6, 8}
(a) E = { x/ x is an even integer less than 10 }
(b) E = { x/ x is an even positive integer less than 10 }
(c) E = { x / x is positive integer, x< 10 and x is a multiple of 2}
(2) F = { 3, 6,9, 12, 15 , …}
(a) F = {x/ x is appositive integer that is divisible by 3}
(b) F = {x/x is a multiple of 3}
(c) F = {x/x is a natural number that is divisible by 3} - A = {x/x2 + x – 6 } and B = { -3,2}. Is A = B?
- A = {x/x is prime number which is less than 10} and B = {x/x2 – 8x + 15 = 0}
(a) Is A = B (b) Is B⊂ A? - P = {x/x is an integer and -1 < x<3/5 }and Q = {x/x3 -3x2 + 2x = 0} . Is P = Q?
6.L= {(x,y)/ x and y are positive integers and x + y = 7}.Write L by listing its elements.
Exercise 1.2
1.Draw the following intervals.
(a) {x/x > 2} (b) {x/x ≥ 3} (c) {x/x x ≤ -1} (d) {x/x>-1}
(e){x/-2≤ x≤ 2} (f) {x/0≤x≤ 5} (g) {x/x≤0 or x.2}
- Draw a graph to show the solution set of each of the following.
(a) x-1<4 (b) x-1≤ 0 (c) 2x≤5 (d) 2x-1>7
(e) 5-x≥1 (f) 1/3(x-1)<1
3.Draw the graph of the following number lines below one another.
(a) P = {x/x≥3, x∈R} (b) Q = {x/x≤-2, x∈R}
(c) P∩Q (d) P∪Q - O
Exercise 1.3 - M = {x/x is an integer , and -3<x<6} , N = the set of positive integers that are less than 8.
Find M∩N. (3 marks)
Congratulations @kothawpu! You have completed the following achievement on the Steem blockchain and have been rewarded with new badge(s) :
Award for the number of upvotes received
Click on the badge to view your Board of Honor.
If you no longer want to receive notifications, reply to this comment with the word
STOP