Match the roster form with set builder form.
(i) {1,2,3,6} (a) {x : x is prime number and a divisior of 6}
(ii) {2,3} (b) {x : x is an odd natural number smaller than 10}
(iii) {m,a,t,h,e,I,c,s} (c) {x : x is a natural number and divisor of 6}
(iv) {1,3,5,7,9} (d) {x : x is a letter of the word MATHEMATICS}

Match roster forms with the set builder form. (i) {p,r,I,n,c,a,l} (a) {x : x is a positive integer and is a divisor of 18} (ii) {0} (b) {x : x is an integer and x^(2)-9=0} (iii) {1,2,3,6,9,18} (c) {x : x is an integer and x+1=1} (iv) {3,-3} (d) {x : x is a letter of the word PRINCIPAL}

Match each of the set on the left described in the roster form with the same set on the right described in the set-builder form : (i) {P, R, I, N, C, A, L} (a) { x : x is a positive integer and is a divisor of 18} (ii) { 0 } (b) { x : x is an integer and x^(2) – 9 = 0 } (iii) {1, 2, 3, 6, 9, 18} (c) {x : x is an integer and x + 1= 1 } (iv) {3, –3} (d) {x : x is a letter of the word PRINCIPAL}

Write the following sets in roster form: D = {x : x is a prime number which is divisor of 60}

Write the following sets in roster form: B = {x : x is a natural number less than 6}

Find the union of each of the following pairs of sets : A = { x : x is a natural number and multiple of 3} B = { x : x is a natural number less than 6}

Find the union of each of the following pairs of sets : A = { x : x is a natural number and 1 B = { x : x is a natural number and 6 < x < 10 }

Write the following set in roster form A = { x is a natural number less than 6}

Examine whether the following statements are true or false: { x : x is an even natural number less than 6} ⊂ { x : x is a natural number which divides 36}

Which of the following pairs of sets are disjoint {1, 2, 3, 4} and { x : x is a natural number and 4 ≤ x ≤ 6 }

Write the following sets in roster form (i) B= {x:x is a natural number smaller than 6} C= {x:x is a two-digit natural number such that the sum of its digits is 8). (iii) D= {x : x is a prime mimber which is a divisor of 60}. E= {x:x is an alphabet in BETTER}.