The simplest way to show that a system has "a unique solution" is to actually find that solution! Here the system is -m_1x_1+ x_2= b_1 -m_2x_1+ x_2= b_2 We can eliminate x_2 by subtracting ...

Let us first relax the integrality constraints and optimize over the reals. Note that the only 2nd order term in the objective function f (x, y) := x y + (38-x)(32-y) is the bilinear term 2 x y ...

The subspace is a plane ax+by+cz=0 therefore a-2b-c=0 2a+b+c=0 and adding up 3a=b a=-\frac15 c therefore x+3y-5z=0 As an alternative by cross product \vec n=\begin{vmatrix}\vec i&\vec j&\vec k\\1&-2&-1\\2&1&1\end{vmatrix}=(-1,-3,5)

Your system does not have any solutions. The second equation says x_s+x_r=-2, whereas the last equation says x_s+x_r=2. This is not possible, hence inconsistent system.

Note that the system will always have at-least one solution since (0,0,1) satisfies the linear system irrespective of the value of \lambda. Hence, the question is whether the system has a unique ...

Let's consider the corresponding statement for the unit circle in \mathbb{R}^2. Namely if the set C=\{(x,y)\in\mathbb{R}^2:x^2+y^2=1\} is partitioned into two sets A and B, then at least one ...