Let ?(?) be convex in ??. Fix ?2, . . . , ?? and consider the...

About convex function: Please show that f(x) = 1/2·xTQx+aTx is a convex function if and only...

About convex function: Please show that f(x) = 1/2·xTQx+aTx is a convex function if and only if Q is positive semi-definite.

Prove that (Orbit-Stabilizer Theorem). Let G act on a finite set X and fix an x...

Prove that (Orbit-Stabilizer Theorem). Let G act on a finite set X and fix an x ∈ X. Then |Orb(x)| = [G : Gx] (the index of Gx).

Show that every increasing convex function of a convex function is convex.

Show that every increasing convex function of a convex function is convex.

Fix a positive real number c, and let S = (−c, c) ⊆ R. Consider the...

Fix a positive real number c, and let S = (−c, c) ⊆ R. Consider the formula x ∗ y :=(x + y)/(1 + xy/c^2). (a)Show that this formula gives a well-defined binary operation on S (I think it is equivalent to say that show the domain of x*y is in (-c,c), but i dont know how to prove that) (b)this operation makes (S, ∗) into an abelian group. (I have already solved this, you can just ignore) (c)Explain why...

let's fix a positive integer n. for a nonnegative integer k, let ak be the number...

let's fix a positive integer n. for a nonnegative integer k, let ak be the number of ways to distribute k indistinguishable balls into n distinguishable bins so that an even number of balls are placed in each bin (allowing empty bins). The generating function for sequence ak is given as 1/F(x). Find F(x).

Given two convex functions ( f(x) and g(x) ) and two parameters α and β satisfying...

Given two convex functions ( f(x) and g(x) ) and two parameters α and β satisfying α+β=1. (a) The function αf(x)+βg(x) is convex (b) The function αf(x)-βg(x) is convex (c) The function αf(x)-βg(x) is convex when g(x) is linear (d) None of the above statements is correct

About convex function: (1) Please show that f(x) = ax2 + bx + c is a...

About convex function: (1) Please show that f(x) = ax2 + bx + c is a convex function if and only if a ≥ 0. (2) Please show that f(x) = 1/2·xTQx+aTx is a convex function if and only if Q is positive semi-definite.

Let L = span{(2,1)} + {(4,0)}, and let S be the set of convex linear combinations...

Let L = span{(2,1)} + {(4,0)}, and let S be the set of convex linear combinations of (2,1) and (4,2). For vector v = (1,0), find (a) projLv (b) projSv

Consider the statement “If you break it, then you fix it”. Select which one of the...

Consider the statement “If you break it, then you fix it”. Select which one of the following statements is not logically equivalent to that conditional, or select All of these statements are equivalent to “If you break it, then you fix it”. Group of answer choices All of these statements are equivalent to “If you break it, then you fix it”. You fix it only if you break it. Fixing it is a necessary condition for having broken it. Breaking...

Let there be two goods; coco puffs and grits. Assume that the preferences satisfy basic axioms...

Let there be two goods; coco puffs and grits. Assume that the preferences satisfy basic axioms and assumptions and they can be represented by the utility function u(x1,x2)= x1x2. Consider two bundles X= (1,20) and Y=(10,2). Which one do you prefer? Use bundles X and Y to illustrate that these tastes are in fact convex. What is the MRS at bundles X and Y respectively? Now consider tastes that are instead defined by the function u(x1,x2) = x1^2 + x2^2...