Mathman23
Jun25-07, 12:10 PM
1. The problem statement, all variables and given/known data
Given D a a closed convex in R4 which consists of points (1,x_2,x_3,x_4) which satisfies that that 0\leq x_2,0 \leq x_3 and that x_2^2 - x_3 \leq 0
3. The attempt at a solution
Then to show that either the point a: = (1,-1,0,1) or b:=(1,0,0,-1) is part of the convex set D.
They must satisfy the equation l = b \cdot t + (1-t) \cdot b and
l = a \cdot t + (1-t) \cdot a which proves that either of the two points lies on a line segment l which belongs to the convex set.
Am I on the right track?
Given D a a closed convex in R4 which consists of points (1,x_2,x_3,x_4) which satisfies that that 0\leq x_2,0 \leq x_3 and that x_2^2 - x_3 \leq 0
3. The attempt at a solution
Then to show that either the point a: = (1,-1,0,1) or b:=(1,0,0,-1) is part of the convex set D.
They must satisfy the equation l = b \cdot t + (1-t) \cdot b and
l = a \cdot t + (1-t) \cdot a which proves that either of the two points lies on a line segment l which belongs to the convex set.
Am I on the right track?