If A,B,C are three independent events of an experiment. Such that `P(AcapB^(C)capC^(C))=(1)/(4)`
`P(A^(C)capBcapC^(C))=(1)/(8),P(A^(C)capB^(C)capC^(C))=(1)/(4)`
then find P(A),P(B)and P( C).

If A,B,C are three independent events of an experiment such that P(A nn B^(C)nn C^(C))=(1)/(4), P(A^(C)nn B nn C^(C))=(1)/(8),P(A^(C)nn B^(C)nn C^(C))=(1)/(4) find P(A),P(B),P(C)

If A, B, C are three independent events of an experiment such that P(A nn B^(c)nn C^(c))=(1)/(4), P(A^(c)nn B nn C^(c))=(1)/(8), P(A^(c)nn B^(c) nn C^(c))=(1)/(8) then the increasing order of P(A),P(B) and P(C)

If A, B, C are three independent events such that P(AcapB) = 1/2,P(BcapC)=1/3 and P(Ccap A)=1/6," find " P(A), P(B) and P(C).

If A, B C are three events associated with a random experiment, prove that P(AcupBcupC)=P(A)+P(B)+P(C)-P(AcapB)-P(AcapC)- P(BcapC)+ P(AcapBcapC) .

If A,B,C are three events in a random experiment, Prove the following. P(A-B)=P(A)-P(AcapB)

For any two events A,B shows that P(AcapB)-P(A)P(B)=P(A^(C))P(B)-P(A^(C)capB) =P(A)P(B^(C))-P(AcapB^(C))

If A, B, C are any three events such that probability of B is twice as that of probability of A and probability of C is thrice as that of probability of A and if P(A cap B)=(1)/(6), P(B cap C)=(1)/(4), P(A cap C)=(1)/(8), P(A cup B cup C)=(9)/(10),P(A cap B cap C)=(1)/(15) , then find P(A), P(B) and P(C ) ?

If A, B, C are three independent events such that P(A) = 1/4, P(B) = 1/3, P(C ) = 2/5, then find P(A uu B uu C) .

If A, B, C are three events such that P(B)=(4)/(5), P(A nn B nn C^(c ))=(1)/(4) and P(A^(c )nnBnnC^(c ))=(1)/(3) , then P(BnnC) is equal to

If A, B, C are three events such that P(B)=(4)/(5), P(A nn B nn C^(c ))=(1)/(4) and P(A^(c )nnBnnC^(c ))=(1)/(3) , then P(BnnC) is equal to