Prove or give a counter example for "If E1 and E2 are independent, then they are...

There are two error terms e1 and e2. - E[e1]=E[e2]=0 - e1 and e2 are independent...

There are two error terms e1 and e2. - E[e1]=E[e2]=0 - e1 and e2 are independent - E[e2-e1 | e2 -e1 < a ] and E[e2-e1 | e2 - e1 > a] are not 0. Q: Can we say E[e1 | e2-e1 < a ] = E[ e2 | e2-e1 > a ] = 0? Why? ( a is just a constant )

Prove or give a counter example: If f is continuous on R and differentiable on R...

Prove or give a counter example: If f is continuous on R and differentiable on R ∖ { 0 } with lim x → 0 f ′ ( x ) = L , then f is differentiable on R .

In this question, as usual, e1, e2, e3 are the standard basis vectors for R 3...

In this question, as usual, e1, e2, e3 are the standard basis vectors for R 3 (that is, ej has a 1 in the jth position, and has 0 everywhere else). (a) Suppose that D is a 3 × 3 diagonal matrix. Show that e1, e2, e3 are eigenvectors of D. (b) Suppose that A is a 3 × 3 matrix, and that e1, e2, and e3 are eigenvectors of A. Is it true that A must be a diagonal...

Let T be a tree of order at least 4, and let e1, e2, e3 ∈...

Let T be a tree of order at least 4, and let e1, e2, e3 ∈ E(T¯) (compliment of T). Prove that T + e1 + e2 + e3 is planar.

Are any of the following implications always true? Prove or give a counter-example. a) f(n) =...

Are any of the following implications always true? Prove or give a counter-example. a) f(n) = Θ(g(n)) -> f(n) = cg(n) + o(g(n)), for some real constant c > 0. *(little o in here) b) f(n) = Θ(g(n)) -> f(n) = cg(n) + O(g(n)), for some real constant c > 0. *(big O in here)

1. a) Give an example of two events that are independent. Prove that your example is...

1. a) Give an example of two events that are independent. Prove that your example is correct computationally. b). Explain why being a dog and being a cat are mutually exclusive. c) Give an example of two characteristics that are not mutually exclusive and explain why they are not.

Prove or give a counter-example: (a) if R ⊂ S and T ⊂ U then T\...

Prove or give a counter-example: (a) if R ⊂ S and T ⊂ U then T\ S ⊂ U \R. (b) if R∪S⊂T∪U, R∩S= Ø and T⊂ R, then S ⊂ U. (c) if R ∩ S⊂T ∩ S then R⊂T. (d) R\ (S\T)=(R\S) \ T

Give an counter example or explain why those are false a) every linearly independent subset of...

Give an counter example or explain why those are false a) every linearly independent subset of a vector space V is a basis for V b) If S is a finite set of vectors of a vector space V and v ⊄span{S}, then S U{v} is linearly independent c) Given two sets of vectors S1 and S2, if span(S1) =Span(S2), then S1=S2 d) Every linearly dependent set contains the zero vector

In a gum can have two food colors: food color E1 and food color E2. The...

In a gum can have two food colors: food color E1 and food color E2. The chance of having type E1 edible paint gum is 0.8. The chance of having a type E2 edible color gum is 0.7. Food colors of both types are known to be independent of each other. Randomly selected gum. What is the probability of having exactly one food color (of the two types)? A. 0.404 B. 0.38 C. 0.94 D. 0.595 ?

True or False, explain. If false, give counter example. a) if events A and B disjoint...

True or False, explain. If false, give counter example. a) if events A and B disjoint then A and B independent. b) if events A and B independent then A and B disjoint. c) It is impossible for events A and B to be both mutually exclusive and independent.