C_3 does not pass the complex zero, (why?) so the question is what's the angle between C_1 and C_2. They are images of L_1 and L_2, respectively, and these two intersect at an angle \pi/2 ...

X and X are not independent. Hence you cannot apply result (a). In fact, you have shown that 2X is not a poisson random variable as Var(2X)\neq E(2X) as \lambda>0.

[I have the 2nd edition, not the 1st, but there don't seem to be any differences important for this question.] First, an important correction. You write "the existence of the multiplicative inverse ...

When god created the world there were three independent quantities x, y, z changing with time, say. Then a physicist came and said: These three quantities are related by a so-and-so equation F(x,y,z)=0\ .\tag{1} ...

If (l_1, l_2) is for the intersection I of l_1 and l_2; If (m_1, m_2) is for the intersection J of m_1 and m_2; Notation p = (l_1, l_2)(m_1, m_2 ) which is is not classical, should ...

Write L_1 in the form \underline x = \underline a + t \underline u and L_2 in the form \underline x = \underline b + t \underline v. Denoting by \underline z the point of intersection of L_1 ...