We know that,
0≤P(Ei)≤1for i=1,2,3
0≤P(E1)≤1
⇒0≤62+3P≤1
⇒P∈[−32,34]........(i)
Now for 0≤P(E2)≤1
⇒0≤82−P≤1
⇒P∈[−6,2]........(ii)
Now for 0≤P(E3)≤1
⇒0≤21−P≤1
⇒P∈[−1,1].......(iii)
Also, E1 and E2 and E3 are mutually exclusive
P(E1)+P(E2)+P(E3)≤1
⇒0≤1213−8P≤1
⇒P∈[32,326]...........(iv)
Now taking intersection of all we get,
32≤P≤1
So maximum value p1=1 and minimum value p2=32
So, p1+p2=35