Prove that {5k | k ∈ Z} ∩ {7l | l ∈ Z} = {35m |...

Prove directly that the group 2Z = {2k | k ∈ Z} and the group 5Z...

Prove directly that the group 2Z = {2k | k ∈ Z} and the group 5Z = {5k | k ∈ Z} are isomorphic.

Given the production function z = F(K, L) = (K^0.6 + L^0.8)^2 and K>0 and L>0....

Given the production function z = F(K, L) = (K^0.6 + L^0.8)^2 and K>0 and L>0. Prove that the function is strictly increasing in capital K and in labor L. Provide an economic implication.

Consider a production function for an economy: Y = 20(L.5K.4N.1)where L is labor, K is capital,...

Consider a production function for an economy: Y = 20(L.5K.4N.1)where L is labor, K is capital, and N is land. In this economy the factors of production are in fixed supply with L = 100, K = 100, and N = 100. a) What is the level of output in this country? b) Does this production function exhibit constant returns to scale? Demonstrate by an example. c) If the economy is competitive so that factors of production are paid the...

1. Prove that {2k+1: k ∈ Z}={2k+3 : k ∈ Z} 2. Prove/disprove: if p and...

1. Prove that {2k+1: k ∈ Z}={2k+3 : k ∈ Z} 2. Prove/disprove: if p and q are prime numbers and p < q, then 2p + q^2 is odd (Hint: all prime numbers greater than 2 are odd)

(16) Prove that {3 k | k ∈ Z} is a subgroup of Q∗

(16) Prove that {3 k | k ∈ Z} is a subgroup of Q∗

Prove that for all n ∈ Z, there exists a k ∈ Z such that n^3...

Prove that for all n ∈ Z, there exists a k ∈ Z such that n^3 = 9k, n^3 = 9k + 1, or n^3 = 9k − 1.

Which function represents a production function with constant returns to scale? (Select each correct answer.) q=sqrt(k+l)...

Which function represents a production function with constant returns to scale? (Select each correct answer.) q=sqrt(k+l) q=sqrt(k) +sqrt(l) q=sqrt(k*l) q=5k + l q=5k +5l q=min{k,l)

3. a) For any group G and any a∈G, prove that given any k∈Z+, C(a) ⊆...

3. a) For any group G and any a∈G, prove that given any k∈Z+, C(a) ⊆ C(ak). (HINT: You are being asked to show that C(a) is a subset of C(ak). You can prove this by proving that if x ∈ C(a), then x must also be an element of C(ak) for any positive integer k.) b) Is it necessarily true that C(a) = C(ak) for any k ∈ Z+? Either prove or disprove this claim.

suppose we have the following productions functions: Q=LaK1-a .............1 Z= a log L+ ( 1-a) log...

suppose we have the following productions functions: Q=LaK1-a .............1 Z= a log L+ ( 1-a) log K...........2 where Q is output, L is labour , K is capital , Z is a log transformation of Q and a is a positive constant . prove that equation 1 is homogenous while equation 2 is not; but both equations are homothetic, implying that a non-homogeneous function can still be homothetic,

Assume an atom has K, L, and M electrons and the energies for K, L, and...

Assume an atom has K, L, and M electrons and the energies for K, L, and M shells are -5000, -500, and -50 eV. Please give all possible energies of Auger electrons and characteristic X-rays