|
|
|
|
|
| Author |
Message |
![[Post New]](/templates/default/images/icon_minipost_new.gif) 23 Mar 2008 15:44:00 IST
Accepted Answer [?]
![[Up]](/templates/default/images/icon_up.gif "[Up]")
|
|
|
@ means intersection
p(A) = a
p(barA @ barB @ barC) = b
p (barA) p(barB) p(barC) = b
{1 - p(A)}{1 - p(B)}{1 - p(C)} = b
p bar(A @ B @ C) = c
1 - p(A @ B @ C) = c
1 - p(A)p(B)p(C) = c
p(barA) *p(barB)p(C)=p
{1 - p(A)}{1 - p(B)} p(C) = p
let p(A) = x , p(B) =y p(C) = z
so all the equations become
x = a
(1 - x)(1 - y)(1 - z) = b
1 - xyz = c
z(1 - x)(1 - y) = p
(1 - x)(1 - y)(1 - z)/z (1 - x)(1 - y) = b/p
1 - z / z = b/p
1 / z = (b + p) / p
z = p / (b+p)
z (1-x)(1-y) = p
1 - y = p/z(1-x)
y = 1 - p(b+p)/p(1-a)..........as x = a
y = 1 - a - b - p / (1 - a)
put the values of x , y , z in 1 - xyz = c
u will get the relation (1st one)
for the second part ,
since roots of the =n is real and atleast 1 must lie b/w 0 and 1
so
ab - (1 - a)(a + c - 1) < 0
ab + (1 - a)^2 - c ( 1-a) < 0
c > ab + (1-a)^2 / (1-a)
hence proved
|
I always like to walk in rain as no one can see me crying there :(
frnds are like diamonds , if u hit them , they don't break but they slip frm ur hands
-----It is better to be hated for what you are than to be loved for what you are not.----
*****wen love and skill work together--expect a masterpiece*****
|
this reply: 5 points
(with 1 
in 1 votes ) [?]
|
|
You have to be logged on to rate
|
|
|
|
|
|
|
|
|
|
Moderation Team
