. In a binary eutectic system, what is phase “α” and phase “β”? How are they...

Given the following information, construct the phase diagram for the hypothetical Binary Alloy System: Label this...

Given the following information, construct the phase diagram for the hypothetical Binary Alloy System: Label this diagram with the appropriate:         Temperature, Compositions, Phase         Melting temp. A = 1200°C,   Melting temp. B = 450°C         Maximum solubility of B in µ = 10.5 wt% B         Maximum solubility of A in b = 9.86 wt% A         Eutectic temp. = 300°C, Eutectic composition = 48.2 wt% B         Solubility of B in µ at room temp. = 2.5 wt%B...

How would the electrical resistivity of metallic materials vary with composition for a simple eutectic system?...

How would the electrical resistivity of metallic materials vary with composition for a simple eutectic system? [Hint: Sketch a diagram of simple eutectic phase diagram, and show below it the expected variation of the electrical resistivity].

Let α and β be possible quantum states of a quantum system, while Aˆ is an...

Let α and β be possible quantum states of a quantum system, while Aˆ is an operator in its Hilbert space. Which of the following expressions are allowed in the bra-ket formalism? (a) <α>; (b) <α|β>^2; (c) |α><β|; (d) <Aˆ>; (e) <α|Aˆ; (f) |α>|β>; (g) |α>^2 ; (h) A^ˆ2 ; (i) Trace (|α><β|). For each meaningful expression, state whether it is a vector, an operator, or a scalar. If (i) is meaningful, evaluate it (using matrix representation).

The lifespan of a system component follows a Weibull distribution with α (unknown) and β=1. (hint:...

The lifespan of a system component follows a Weibull distribution with α (unknown) and β=1. (hint: start with confidence interval for μ) f(x)=αβX^(β-1) exp(-αX^β) a. Derive 92% large sample confidence interval for α. b. Find maximum likelihood estimator of α.

What is the relationship between α , β , n ?

What is the relationship between α , β , n ?

The lifespan of a system component follows a Weibull distribution with α (unknown) and β=1. (hint:...

The lifespan of a system component follows a Weibull distribution with α (unknown) and β=1. (hint: start with confidence interval for μ) f(x)=αβXβ-1 exp(-αXβ) a.      Derive 92% large sample confidence interval for α. b.      Find maximum likelihood estimator of α.

The lifespan of a system component follows a Weibull distribution with α (unknown) and β=1. (hint:...

The lifespan of a system component follows a Weibull distribution with α (unknown) and β=1. (hint: start with confidence interval for μ) f(x)=αβXβ-1 exp(-αXβ) a.      Derive 92% large sample confidence interval for α. b.      Find maximum likelihood estimator of α.

Let X ∼ Beta(α, β). (a) Show that EX 2 = (α + 1)α (α +...

Let X ∼ Beta(α, β). (a) Show that EX 2 = (α + 1)α (α + β + 1)(α + β) . (b) Use the fact that EX = α/(α + β) and your answer to the previous part to show that Var X = αβ (α + β) 2 (α + β + 1). (c) Suppose X is the proportion of free-throws made over the lifetime of a randomly sampled kid, and assume that X ∼ Beta(2, 8) ....

A firm’s production function is ? = ?Lα ?β where A, α, and β are positive...

A firm’s production function is ? = ?Lα ?β where A, α, and β are positive constants. The firm currently uses 500 units of labor and 40 units of capital. If the firm adds 1 more unit of labor, what happens to productivity of capital? PLEASE Explain.

A continuously operating coherent Binary Phase Shift Keying (BPSK) system is made by an engineer. He...

A continuously operating coherent Binary Phase Shift Keying (BPSK) system is made by an engineer. He claims that it is having an average error probability of 10-5. The system produced 1000 errors in a day when tested with a data rate of 500 bits/s and the single-sided noise power spectral density is No=10-10 W/Hz. He also claim that the system is capable of maintaining the error rate even if the received power is as low as 10-6 W. Do you...