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Given above process. Note that both transfer functions have different denominators. This process is looped into a P controller with gain Kc. Sensor and actuator are ideal. Question 2a: Determine the closed loop transfer functions for the servo and control problem as a function of Kc. Question 2b: Draw the step responses for the servo problem

Given above process. Note that both transfer functions have different denominators.
This process is looped into a P controller with gain Kc. Sensor and actuator are ideal.
Question 2a:
Determine the closed loop transfer functions for the servo and control problem as a function of Kc.
Question 2b:
Draw the step responses for the servo problem

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custom answer Part B please a. Consider the delta of a European option. i. Explain concisely what the delta measures, the bounds on its value and how it is linked to the construction of the replicating portfolio for the option. Illustrate your answer by discussing the sign of the delta of an at-the-money put option.

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a. Consider the delta of a European option. i. Explain concisely what the delta measures, the bounds on its value and how it is linked to the construction of the replicating portfolio for the option. Illustrate your answer by discussing the sign of the delta of an at-the-money put option. (10 marks) ii. Show how deltas of puts and calls (with the same

a. Consider the delta of a European option. i. Explain concisely what the delta measures, the bounds on its value and how it is linked to the construction of the replicating portfolio for the option. Illustrate your answer by discussing the sign of the delta of an at-the-money put option. (10 marks) ii. Show how deltas of puts and calls (with the same

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3. Using matrix notation, the general linear model is given by [ mathbf{y}=mathbf{X} boldsymbol{beta}+boldsymbol{epsilon} ] where ( mathbf{y} in mathbb{R}^{n}, mathbf{X} in mathbb{R}^{n times(p+1)}, boldsymbol{beta} in mathbb{R}^{p+1} ). Also, it holds that ( boldsymbol{epsilon} in mathbb{R}^{n} ) with zero mean and

3. Using matrix notation, the general linear model is given by [ mathbf{y}=mathbf{X} boldsymbol{beta}+boldsymbol{epsilon} ] where ( mathbf{y} in mathbb{R}^{n}, mathbf{X} in mathbb{R}^{n times(p+1)}, boldsymbol{beta} in mathbb{R}^{p+1} ). Also, it holds that ( boldsymbol{epsilon} in mathbb{R}^{n} ) with zero mean and

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System Product B is manufactured by the liquid phase batch reaction, whose complexity gives a range of byproducts. Fig. 1. This complex reaction can be altered to fit various situations. The batch reactor can be run in the temperature range 180 to ( 260 mathrm{C} ). Reactant ( mathrm{X} ) is in large excess, and ( mathrm{C}, mathrm{D} ), and (

System Product B is manufactured by the liquid phase batch reaction, whose complexity gives a range of byproducts. Fig. 1. This complex reaction can be altered to fit various situations. The batch reactor can be run in the temperature range 180 to ( 260 mathrm{C} ). Reactant ( mathrm{X} ) is in large excess, and ( mathrm{C}, mathrm{D} ), and (

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Let ( Y ) be a random variable with possible outcomes 0,1 , and ( p(Y=1)=1 / 2 ). Let ( X ) be a random variable with possible outcomes ( X=a, b, c ). Define [ begin{array}{c} mathbf{p}=(p(X=a mid Y=1), p(X=b mid Y=1), p(X=c mid Y=1)) \ mathbf{q}=(p(X=a mid Y=0), p(X=b mid Y=0), p(X=c mid Y=0)) . end{array} ] Suppose that [

Let ( Y ) be a random variable with possible outcomes 0,1 , and ( p(Y=1)=1 / 2 ). Let ( X ) be a random variable with possible outcomes ( X=a, b, c ). Define [ begin{array}{c} mathbf{p}=(p(X=a mid Y=1), p(X=b mid Y=1), p(X=c mid Y=1)) mathbf{q}=(p(X=a mid Y=0), p(X=b mid Y=0), p(X=c mid Y=0)) . end{array} ] Suppose that [

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Pg 440 Q6. Bright-Spark electronics employs process-workers to assemble fuses, power leads and electric switches, all workers assemble each component at the same rate. It takes one worker 1hr(i.e 60 minutes) to assemble four fuses, two power leads and two switches., another worker takes 3 hrs (i.e 180 minutes) to assemble 12 fuses, eight power leads and

Pg 440 Q6.
Bright-Spark electronics employs process-workers to assemble
fuses, power leads and electric switches, all workers assemble each
component at the same rate.
It takes one worker 1hr(i.e 60 minutes) to assemble four fuses,
two power leads and two switches., another worker takes 3 hrs (i.e
180 minutes) to assemble 12 fuses, eight power leads and

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(c) Consider [ x^{2} y^{prime prime}-cos left(x^{2}right) y=0 . ] State what kind of point ( x=0 ) is, find the indicial (or characteristic) equation, and use it to find all ( r ) for which a solution of the form ( x^{r} sum_{n=0}^{infty} a_{n} x^{n} ) with ( a_{0} neq 0 ) exists. You are not asked to find the power series explicitly. ( -4

(c) Consider [ x^{2} y^{prime prime}-cos left(x^{2}right) y=0 . ] State what kind of point ( x=0 ) is, find the indicial (or characteristic) equation, and use it to find all ( r ) for which a solution of the form ( x^{r} sum_{n=0}^{infty} a_{n} x^{n} ) with ( a_{0} neq 0 ) exists. You are not asked to find the power series explicitly. ( -4

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A channel ( -a leq x leq a ) is filled with an incompressible, viscous fluid, which is initially at rest with no body forces acting. At ( t=0 ), a uniform pressure gradient ( frac{mathrm{d} p}{mathrm{~d} y}=-G ) is suddenly applied and maintained thereafter. (a) Assuming two-dimensional flow, formulate the mathematical problem, writing down the

A channel ( -a leq x leq a ) is filled with an incompressible, viscous fluid, which is initially at rest with no body forces acting. At ( t=0 ), a uniform pressure gradient ( frac{mathrm{d} p}{mathrm{~d} y}=-G ) is suddenly applied and maintained thereafter. (a) Assuming two-dimensional flow, formulate the mathematical problem, writing down the

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custom answer Potential flow and derivation of Navier Stokes equations b) In index form using Einstein notation, Cauchy’s equation of motion for a continuum is ρDtDui​​ei​=∂xj​∂σij​​ei​+ρgi​ei​, and the constitutive equation for a Newtonian fluid is σij​=−pδij​+μ[∂xj​∂ui​​+∂xi​∂uj​​]. Use these results and the incompressibility condition to derive the Navier-Stokes equations for an incompressible, viscous, Newtonian fluid. Online

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custom answer show all workings plsexcel sheet attached 3. A university wants to know what proportion of students are regular bike riders so that they can install an appropriate number of bike racks. The spreadsheet bike. csv contains the result of survey conducted in 20 classes. Here N is a class size and n is

custom answer write a brief overview of a proposed theory. The proposal is on how management affects students performance in UGBS Online Class Handlers: Advanced Math, Advanced Math questions and answers, homework help, Math

custom answer please Help me Instructions: Below are some typical answers students have submitted in the past. Describe the mistake(s) in your own words. What grade (percentage) would you give a student making this mistake? In deciding the grade, consider the following: how ‘big’ is the mistake, how does the mistake compare to the others

An economist wants to determine whether average price/earnings (P/E) ratios differ for firms in three industries. Independent samples of five firms in each industry produced the following results after conducting a one-way ANOVA. SSB (sum of squares between groups) = 258.82 and SST (sum of squares total) = 424.04. Based on this information, what would be the

An economist wants to determine whether average price/earnings
(P/E) ratios differ for firms in three industries. Independent
samples of five firms in each industry produced the following
results after conducting a one-way ANOVA. SSB (sum of squares
between groups) = 258.82 and SST (sum of squares total) = 424.04.
Based on this information, what would be the

A financial security generates a cash flow of $25,000 every five years forever with the first cash flow occurring in 3 years’ time. The appropriate opportunity cost is 12% p.a. compounded annually. What should be the security’s price today?

A financial security generates a cash flow of $25,000 every five
years forever with the first cash flow occurring in 3 years’ time.
The appropriate opportunity cost is 12% p.a. compounded annually.
What should be the security’s price today?