You may use the same method to find the minimum. First, we obtain a lower bound for P: \begin{align} P&=x+y+z+xy+yz+zx\\ &=\frac12 [ (x+y+z+1)^2 - (x^2+y^2+z^2) - 1 ]\\ &\ge\frac12 (0 - 27 - 1)\tag{1}\\ &= -14. \end{align} ...

Well, f(x,y,z)=(1-x)(1-y)(1-z)+xyz so since both terms are positive (x,y,z\in(0,1) so all factors of both terms are positive), f(x,y,z)>0

1) You really should have simplified your conditions first by dividing out 2 and 4 before differentiating it. This does not change the result, but it is needless complication. 2) x, y and z are ...

By AM-GM inequality \sqrt{(p - a)(p - b)} = \frac 1 2 \sqrt{(b + c - a)\cdot (a + c - b)}\leq\\ \frac 1 2 \frac {(b + c - a) + (a + c - b)}{2} = \frac 1 2 c Hence (p - a)(p - b)(p - c) = \\ \sqrt{(p - a)(p - b)} \cdot \sqrt{(p - b)(p - c)} \cdot \sqrt{(p - c)(p - a)} \leq \frac 1 8 a b c ...

Consider the following sets: A be all triples (x,y,z) where x,y,z\neq 0. B_z be all triples that x,y\neq 0 and z=0. B_x be all triples that y,z\neq 0 and x=0. B_y be all triples ...

If the events (A_i) are independent, then P(A_1\cup A_2\cup\cdots\cup A_N)=1-P(A_1^c\cap A_2^c\cap\cdots\cap A_N^c)=1-\prod_{i=1}^NP(A_i^c), hence P(A_1\cup A_2\cup\cdots\cup A_N)=G(P(A_1),P(A_2),\ldots,P(A_N)), ...