Program Description: Purpose oftheproblem is to find the numerically value for α and obtain the limiting population of the tumor. Summary introduction: Problem will use P ( t ) = P 0 exp ( β 0 α ( 1 − e − α t ) ) for the solution of d P d t = β 0 e − α t P , P ( 0 ) = P 0 .

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Chapter 2.1, Problem 31P

Program Plan Intro

Program Description: Purpose oftheproblem is to find the numerically value for α and obtain the limiting population of the tumor.

Summary introduction: Problem will use P(t)=P0exp(β0α(1−e −αt)) for the solution of dPdt=β0e−αtP,P(0)=P0 .

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Given Data: x = [1, 3, 9, 13, 27] and y = [3, 12, 35, 19, 5] Examine the curve fit for a polynomial of degree 1, 2, 3 and 4. You must show all four cases, i.e., find the coefficients of the polynomial for the given data. Find coefficients of a polynomial that best fits the data and find roots of that polynomial only. In your solution explain why you chose the degree of the polynomial you did. Your solution in both Matlab and Excel should show all four cases. What is the predicted y value from your polynomial for x = 3? No user-defined fn required.

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An insulated, electrically-heated (100 kW) tank contains400 kg of water at 65°C when its power is lost. Water iswithdrawn at a steady rate of 0.4 kg/s and cold water (at12°C) enters the tank at the same rate. Assume the tankis well-mixed, and neglect heat gains or losses throughthe tank walls. For the water, c=cp=cv=4200 J/kg C(a) Create a script (m-file) in MATLAB to calculate howlong will it take for the tank’s temperature to fall to 25°C.(b) Display the entire program code used for your scriptcreated in MATLAB. Make sure that running the scriptprovides a numeric result and include your name as acomment.

Answer 2

Question

Chapter 2.1, Problem 31P

Program Plan Intro

Program Description: Purpose oftheproblem is to find the numerically value for α and obtain the limiting population of the tumor.

Summary introduction: Problem will use P(t)=P0exp(β0α(1−e −αt)) for the solution of dPdt=β0e−αtP,P(0)=P0 .

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Answer 3

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Chapter 2.1, Problem 31P

Program Plan Intro

Program Description: Purpose oftheproblem is to find the numerically value for α and obtain the limiting population of the tumor.

Summary introduction: Problem will use P(t)=P0exp(β0α(1−e −αt)) for the solution of dPdt=β0e−αtP,P(0)=P0 .

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Answer 4

Question

Chapter 2.1, Problem 31P

Program Plan Intro

Program Description: Purpose oftheproblem is to find the numerically value for α and obtain the limiting population of the tumor.

Summary introduction: Problem will use P(t)=P0exp(β0α(1−e −αt)) for the solution of dPdt=β0e−αtP,P(0)=P0 .

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Answer 5

Chapter 2.1, Problem 31P

Program Plan Intro

Program Description: Purpose oftheproblem is to find the numerically value for α and obtain the limiting population of the tumor.

Summary introduction: Problem will use P(t)=P0exp(β0α(1−e −αt)) for the solution of dPdt=β0e−αtP,P(0)=P0 .

Answer 6

Chapter 2.1, Problem 31P

Program Plan Intro

Program Description: Purpose oftheproblem is to find the numerically value for α and obtain the limiting population of the tumor.

Summary introduction: Problem will use P(t)=P0exp(β0α(1−e −αt)) for the solution of dPdt=β0e−αtP,P(0)=P0 .

Answer 7

Chapter 2.1, Problem 31P

Program Plan Intro

Program Description: Purpose oftheproblem is to find the numerically value for α and obtain the limiting population of the tumor.

Summary introduction: Problem will use P(t)=P0exp(β0α(1−e −αt)) for the solution of dPdt=β0e−αtP,P(0)=P0 .

Answer 8

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Answer 9

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Answer 11

Ch. 2.1 - Prob. 1P Ch. 2.1 - Prob. 2P Ch. 2.1 - Prob. 3P Ch. 2.1 - Prob. 4P Ch. 2.1 - Prob. 5P Ch. 2.1 - Prob. 6P Ch. 2.1 - Prob. 7P Ch. 2.1 - Prob. 8P Ch. 2.1 - Prob. 9P Ch. 2.1 - Prob. 10P

Program Description: Purpose oftheproblem is to find the numerically value for α and obtain the limiting population of the tumor. Summary introduction: Problem will use P ( t ) = P 0 exp ( β 0 α ( 1 − e − α t ) ) for the solution of d P d t = β 0 e − α t P , P ( 0 ) = P 0 .

Solution Summary: The author explains that the problem is to find the numerically value for alpha and obtain the limiting population of the tumor.

Concept explainers

Program Description: Purpose oftheproblem is to find the numerically value for α and obtain the limiting population of the tumor.

Summary introduction: Problem will use P(t)=P0exp(β0α(1−e −αt)) for the solution of dPdt=β0e−αtP,P(0)=P0 .

Want to see the full answer?

Chapter 2 Solutions

Program Description: Purpose oftheproblem is to find the numerically value for α and obtain the limiting population of the tumor. Summary introduction: Problem will use P ( t ) = P 0 exp ( β 0 α ( 1 − e − α t ) ) for the solution of d P d t = β 0 e − α t P , P ( 0 ) = P 0 .

Solution Summary: The author explains that the problem is to find the numerically value for alpha and obtain the limiting population of the tumor.

Concept explainers

Program Description: Purpose oftheproblem is to find the numerically value for α and obtain the limiting population of the tumor. Summary introduction: Problem will use P(t)=P0exp(β0α(1−e −αt)) for the solution of dPdt=β0e−αtP,P(0)=P0 .

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Chapter 2 Solutions

Program Description: Purpose oftheproblem is to find the numerically value for α and obtain the limiting population of the tumor.

Summary introduction: Problem will use P(t)=P0exp(β0α(1−e −αt)) for the solution of dPdt=β0e−αtP,P(0)=P0 .