Uuc: cUU : : lip:? (A) uip (B) uuc (C) pii (D) pll

If a,b,c,d,e are in H.P., then a/(b+c+d+e), b/(a+c+d+e),c/(a+b+d+e), d/(a+b+c+e), e/(a+b+c+d) are in (A) A.P. (B) G.P. (C) H.P. (D) none of these

If A = {x: x in W, x lt 2}, B= {x: x in N, 1 lt x lt 5}, C= {3,5} , find: (i) A xx (B nn C) (ii) A xx (B uuC)

Let A=" "{1," "2," "3} , B" "=" "{3," "4} and C" "=" "{4," "5," "6} . Find (i) A xx(B nnC) (ii) (A xxB) nn(A xxC) (iii) A xx(B uuC) (iv) (A xxB) uu(A xxC)

(a) LetA= {1,2,3,4} ,B = {4,6,7,8,9} and C= {2,3,4,6,8} . Verify the following indentities : (i) (AuuB)uuC=Auu(BuuC) (ii) (AcapB)capC=Acap(BcapC)

If in two triangles A B C and D E F , (A B)/(D E)=(B C)/(F E)=(C A)/(F D) , then F D E C A B (b) F D E A B C (c) C B A F D E (d) B C A F D E

Q. If a, b,c and d are distinct positive no in AP. then (A) ad

Prove that : (i) (AuuBuuC)^(c)=A^(c)capB^(c)capC^(c) (ii) (AcapBcapC)^(c)=A^(c)uuB^(c)uuC^(c) .

Prove that : (i) (AuuBuuC)^(c)=A^(c)capB^(c)capC^(c) (ii) (AcapBcapC)^(c)=A^(c)uuB^(c)uuC^(c) (iii) (AuuB)=(A-B)uu(B-A)uu(AcapB) .