If `(A_(1) cup A_(2))=1-P(A_(1)^(c))P(A_(2)^(c))` where C is the complementary then `A_(1) and A_(2)` are independent.

A_(1),A_(2) and A_(3) are three events.Show that the simultaneous occurrence of the events is P(A_(1)nn A_(2)nn A_(3))=P(A_(1))P((A_(2))/(A_(1)))P[((A_(3))/(A_(1)nn A_(2))] State under which condition P(A_(1)nn A_(2)nn A_(3))=(P(A_(1))P(A_(2))P(A_(3))

Statement-1: Let n le 3 " and " A_(1), A_(2),.., A_(n) be n independent events such that P(A_(k))=(1)/(k+1) " for " 1 le k le n , then P(overlineA_(1) cap overlineA_(2) cap overlineA_(3) cap.. cap overlineA_(n))=(1)/(n+1) Statement-2: Let A_(1), A_(2), A_(3),.., A_(n) " be " n(le 3) events associated to a random experiment . Then, A_(1), A_(2),.., A_(n) are independent iff P(A_(1) cap A_(2) cap .. cap A_(n))=P(A_(1))P(A_(2))..P(A_(n)) .

If A_(1);A_(2);....A_(n) are independent events associated with a random experiment; then P(A_(1)nA_(2)n......n_(n))=P(A_(1))P(A_(2))......P(A_(n))

If A_(1), A_(2), A_(3) ...., A_(8) are independent events such that P(A_(i)) = 1/(1+i) where 1 le I le 8 , then probability that none of them will occur is

If |(a_(1),b_(1),c_(1)),(a_(2),b_(2),c_(2)),(a_(3),b_(3),c_(3))| =5 , then the value of Delta = |(b_(2) c_(3) - b_(3) c_(2),a_(3) c_(2) - a_(2) c_(3),a_(2) b_(3) -a_(3) b_(2)),(b_(3) c_(1) - b_(1) c_(3),a_(1) c_(3) - a_(3) c_(1),a_(3) b_(1) - a_(1) b_(3)),(b_(1) c_(2) - b_(2) c_(1),a_(2) c_(1) - a_(1) c_(2),a_(1) b_(2) - a_(2) b_(1))| is

Let P(x)=1+a_(1)x+a_(2)x^(2)+a_(3)x^(3) where a_(1),a_(2),a_(3)in I and a_(1)+a_(2)+a_(3) is an even number,then

Let a_1, a_(2), a_(3),... ,be the terms of an A.P .If (a_(1)+a_(2)+....+a_(p))/(a_(1)+a_(2)+....+a_(q))=(p^(2))/(q^(2)) where p!=q then (a_(6))/(a_(21))=

If, in D={:[(a_(1),b_(1),c_(1)),(a_(2),b_(2),c_(2)),(a_(3),b_(3),c_(3))]:}, the co-factor of a_(r)" is "A_(r), then , c_(1)A_(1)+c_(2)A_(2)+c_(3)A_(3)=