Exhibit infinitely many irreducibles in F[x], none of which is a constant multiple of another.

1.) Do the following production functions exhibit decreasing, constant, or increasing returns to scale? (a) f(x...

1.) Do the following production functions exhibit decreasing, constant, or increasing returns to scale? (a) f(x ,x )=x2/3x1/2 1212 (b) f(x1,x2)=5x1 +3x2 (c) f(x1,x2)=5+x1 +x2

1) A 10-sided die is rolled infinitely many times. Let X be the number of rolls...

1) A 10-sided die is rolled infinitely many times. Let X be the number of rolls up to and including the first roll that comes up 2. What is Var(X)? Answer: 90.0 2) A 14-sided die is rolled infinitely many times. Let X be the sum of the first 75 rolls. What is Var(X)? Answer: 1218.75 3) A 17-sided die is rolled infinitely many times. Let X be the average of the first 61 die rolls. What is Var(X)? Answer:...

Varify: If a row is replaced by the Sum of a constant multiple another row and...

Varify: If a row is replaced by the Sum of a constant multiple another row and that row. varify if the determinate doesn’t change or no

Solve. (Enter your answers as a comma-separated list. If there are infinitely many solutions, enter a...

Solve. (Enter your answers as a comma-separated list. If there are infinitely many solutions, enter a parametric solution. If there is no solution, enter NONE.) 40x + 5y = 30 6x − 3y = 12 34x + 8y = 18 (x, y) = ( )

Do the following production functions exhibit constant, increasing or decreasing returns to scale? f = k2L^2...

Do the following production functions exhibit constant, increasing or decreasing returns to scale? f = k2L^2 f = k^0.5L^0.3 f = kL-0.8k^2-0.2L^2

Prove whether the following production functions exhibit increasing, decreasing or constant returns to scale: (a) Y...

Prove whether the following production functions exhibit increasing, decreasing or constant returns to scale: (a) Y = AKαL 1−α, (b) Y = 500 ∗ (x − F), where x in an input and F is a fixed cost.

Many types of cellular metabolic reactions at constant temperature and pressure are known to exhibit oscillations,...

Many types of cellular metabolic reactions at constant temperature and pressure are known to exhibit oscillations, in which the concentration of a given metabolite constantly changes but does not ever reach a steady-state, equilibrium value. We know that any set of chemical reactions will proceed while the free energy decreases. But in an oscillatory cycle, the change in free energy must be zero. How do you resolve this paradox?

Let f ∈ Z[x] be a nonconstant polynomial with the property that all the roots (in...

Let f ∈ Z[x] be a nonconstant polynomial with the property that all the roots (in comlex plane) for the equation f(x) = 0 are distinct. Prove that there exist infinitely many positive integers n such that f(n) is not a perfect square.

Consider: f(x)= ln(x)/x2 At which x-value(s) do the local maxima/minima occur? (Answers must be exact. Multiple...

Consider: f(x)= ln(x)/x2 At which x-value(s) do the local maxima/minima occur? (Answers must be exact. Multiple answers must be separated with a semi-colon.)

uppose a is a simple root of the polynomial f(x) and g(x) is another polynomial of...

uppose a is a simple root of the polynomial f(x) and g(x) is another polynomial of degree > degree of f(x). Then g(x)/f(x) = (A/x-a) + other terms. Prove that A= g(a)/f'(a) by not using L'Habitial's rule.