Prove that E [ g (X) Y | X] = g (X) E [Y | X].

For map g:(x,y) --> ( e^x cos y, e^x sin y), find the image of g....

For map g:(x,y) --> ( e^x cos y, e^x sin y), find the image of g. Write a proof that this is the image of g. Then, prove that g is not bijective. make sure all of your proofs are complete.

Prove the following : (∃x)(F(x)⋀(G(x)⋁(H(x)))→(∃x)(∃y)(F(x)⋀(G(y)⋁H(y)))

Prove the following : (∃x)(F(x)⋀(G(x)⋁(H(x)))→(∃x)(∃y)(F(x)⋀(G(y)⋁H(y)))

8.4: Let f : X → Y and g : Y→ Z be maps. Prove that...

8.4: Let f : X → Y and g : Y→ Z be maps. Prove that if composition g o f is surjective then g is surjective. 8.5: Let f : X → Y and g : Y→ Z be bijections. Prove that if composition g o f is bijective then f is bijective. 8.6: Let f : X → Y and g : Y→ Z be maps. Prove that if composition g o f is bijective then f is...

Suppose X,Y are discrete random variables, each taking only two distinct values. Prove that if E(XY)=E(X)E(Y)...

Suppose X,Y are discrete random variables, each taking only two distinct values. Prove that if E(XY)=E(X)E(Y) then X,Y are independent (Be aware that you have to prove E(XY) =E(X)E(Y) -> X,Y independent and NOT the converse)

Let G be a graph with x, y, z є V(G). Prove that if G contains...

Let G be a graph with x, y, z є V(G). Prove that if G contains an x, y-path and a y, z-path, then it contains an x, z-path.

given x,y are independent random variable. i.e PxY(X,Y)=PX(X).PY(Y). Prove that (1) E(XK.YL)=E(XK).E(YL). Where K,L are integer(1,2,3-----)...

given x,y are independent random variable. i.e PxY(X,Y)=PX(X).PY(Y). Prove that (1) E(XK.YL)=E(XK).E(YL). Where K,L are integer(1,2,3-----) (2) Var(x.y)= var(x).var(y).

Prove that gradients of functions f(x, y) = 1/2 log(x^2+y^2) and g(x, y) = arctan(x) are...

Prove that gradients of functions f(x, y) = 1/2 log(x^2+y^2) and g(x, y) = arctan(x) are orthogonal and have the same magnitude at any point different from origin.

Let G be a group and D = {(x, x) | x ∈ G}. (a) Prove...

Let G be a group and D = {(x, x) | x ∈ G}. (a) Prove D is a subgroup of G. (b) Prove D ∼= G. (D is isomorphic to G)

Prove that if G = (V, E) is a tree and e ∈ E, then (V,...

Prove that if G = (V, E) is a tree and e ∈ E, then (V, E − {e}) is a forest of two trees.

let G be a group of order 18. x, y, and z are elements of G....

let G be a group of order 18. x, y, and z are elements of G. if | < x, y >| = 9 and o(z) = order of z = 9, prove that G = < x, y, z >