If `barE` and `barF` are the complementary events of E and F respectively and if `0 < P(F)<1`, then

If bar(E) and bar(F) are the complementary events of E and F respectively and if 0

If E and F are the complementary events of events E and F, respectively,and if 01, then P((E)/(F))+P((E)/(F))=(1)/(2)bP((E)/(F))+P((E)/(F))=1cP((E)/(F))+P((E)/(F))=(1)/(2)dP((E)/(F))+P((E)/(F))=1

(E) and (F) , respectively, are :

If bar(E) & bar(F) are complementary events of events E&F respectively then P(E/F)+P(bar(E)/F)

If A and B are two complementary events, then what is the relation between P(A) and P(B).

If F_(0) and F_(e) are the focal lengths of the objective and eye-piece respectively for a Galilean telescope, its magnifying power is about

If A' , B' are complementary events of two independent events A, B, then P(Acup B) =

If E and F are two independent events then prove that E and F' are also independent events.

Units of van der Waal's constants a and bare respectively

If E and F are two independent events then prove that E' and F' are also independent.