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3. We know that when Ir < 1 Suppose r is a specific positive value between when |r < 1 Suppose 1-...
Let k 21 be a positive integer, and let r R be a non-zero real number. For any real number e, we ...
Let k 21 be a positive integer, and let r R be a non-zero real number. For any real number e, we would like to show that for all 0 SjSk-, the function satisfies the advancement operator equation (A -r)f0 (a) Show that this is true whenever J-0. You can use the fact that f(n) = crn satisfies (A-r)f = 0. (b) Suppose fm n) satisfies the equation when m s k-2 for every choice of c. Show that )...
5) Suppose -1 an is a conditionally convergent series and let L E IR be arbitrary. Give an inform...
5) Suppose -1 an is a conditionally convergent series and let L E IR be arbitrary. Give an informal justification for each of the following. a. We can add up positive terms first, until the first time the sum is greater than L. Then we can add negative terms until the first time the resulting sum is less than L again. Moreover, we can always repeat this process. In repeating the process described in part a, at some point, each...
10) (4 pts.) If we approximate the sum of the series E 74+1 by adding the...
10) (4 pts.) If we approximate the sum of the series E 74+1 by adding the first 3 terms, what do we (-1)"n² know about how close the approximation is to the exact sum of the series? N-
1. 2. (1 point) Consider the following convergent series: Suppose that you want to approximate the...
1.
2.
(1 point) Consider the following convergent series: Suppose that you want to approximate the value of this series by computing a partial sum, then bounding the error using the integral remainder estimate. In order to bound the value of the series between two numbers which are no more than 10 apart, what is the fewest number of terms of the series you would need? Fewest number of terms is 585 (1 point) Consider the following series: le(n Use...
6. We want to use the Integral Test to show that the positive series a converges....
6. We want to use the Integral Test to show that the positive series a converges. All of the following need to be done except one. Which is the one we don't need to do? (a) Find a function f(x) defined on [1,00) such that f(x) > 0, f(x) is decreasing, and f(n) = a, for all n. (b) Show that ſ f(z) dr converges. (e) Show that lim Ss6 f(x) dx exists. (d) Show that lim sexists. 7. Suppose...
If the net present value (NPV) is positive when an investment is discounted at 12%, we...
If the net present value (NPV) is positive when an investment is discounted at 12%, we know that the internal rate of return (IRR) is: 1. Less than 12% 2. Equal to 12% 3. Greater than 12% 4. Greater than 0%
Suppose that 01, ..., In are independent realizations from N (u,02). We know that X ~...
Suppose that 01, ..., In are independent realizations from N (u,02). We know that X ~ N(N ). Suppose we are interested in minimizing the objective function h with respect to a where h is defined as h(a) = (Eſa X – ])? + Var(aĚ) Specifically we are interested in finding the global minimizer â, i.e., a = argmin h(a), CER where R+ denote the set of positive real numbers. (a) (7 points) Find Vh(a) and v2h(a). (b) (7 points)...
x'=r (1 - 2 / 2 x where r and K are positive constants, is called...
x'=r (1 - 2 / 2 x where r and K are positive constants, is called the logistic equation. It is used in a number of scientific disciplines, but primarily (and historically) in population dynamics where z(t) is the size (numbers or density) of individuals in a biological population. For application to population dynamics ä(t) cannot be negative. If the solution (t) vanishes at some time, then we interpret this biologically as population extinction. (a) Draw the phase line portrait...
NO Question # 3. (3 marks) Consider the power series, f(x) = Žan(x+1)". Suppose we know...
NO Question # 3. (3 marks) Consider the power series, f(x) = Žan(x+1)". Suppose we know that f(-4), as a series, diverges, while f(2) converges. Determine the radius of convergence of the power series for f'(). Precisely name the results we learned in Week 3 that you use, and where you are using them.
(1 point) We will determine whether the series n3 + 2n an - is convergent or...
(1 point) We will determine whether the series n3 + 2n an - is convergent or divergent using the Limit Comparison Test (note that the Comparison Test is difficult to apply in this case). The given series has positive terms, which is a requirement for applying the Limit Comparison Test. First we must find an appropriate series bn for comparison (this series must also have positive terms). The most reasonable choice is ba - (choose something of the form 1/mp...
Let k 21 be a positive integer, and let r R be a non-zero real number. For any real number e, we would like to show that for all 0 SjSk-, the function satisfies the advancement operator equation (A -r)f0 (a) Show that this is true whenever J-0. You can use the fact that f(n) = crn satisfies (A-r)f = 0. (b) Suppose fm n) satisfies the equation when m s k-2 for every choice of c. Show that )...
5) Suppose -1 an is a conditionally convergent series and let L E IR be arbitrary. Give an informal justification for each of the following. a. We can add up positive terms first, until the first time the sum is greater than L. Then we can add negative terms until the first time the resulting sum is less than L again. Moreover, we can always repeat this process. In repeating the process described in part a, at some point, each...
10) (4 pts.) If we approximate the sum of the series E 74+1 by adding the first 3 terms, what do we (-1)"n² know about how close the approximation is to the exact sum of the series? N-
1.
2.
(1 point) Consider the following convergent series: Suppose that you want to approximate the value of this series by computing a partial sum, then bounding the error using the integral remainder estimate. In order to bound the value of the series between two numbers which are no more than 10 apart, what is the fewest number of terms of the series you would need? Fewest number of terms is 585 (1 point) Consider the following series: le(n Use...
6. We want to use the Integral Test to show that the positive series a converges. All of the following need to be done except one. Which is the one we don't need to do? (a) Find a function f(x) defined on [1,00) such that f(x) > 0, f(x) is decreasing, and f(n) = a, for all n. (b) Show that ſ f(z) dr converges. (e) Show that lim Ss6 f(x) dx exists. (d) Show that lim sexists. 7. Suppose...
Suppose that 01, ..., In are independent realizations from N (u,02). We know that X ~ N(N ). Suppose we are interested in minimizing the objective function h with respect to a where h is defined as h(a) = (Eſa X – ])? + Var(aĚ) Specifically we are interested in finding the global minimizer â, i.e., a = argmin h(a), CER where R+ denote the set of positive real numbers. (a) (7 points) Find Vh(a) and v2h(a). (b) (7 points)...
x'=r (1 - 2 / 2 x where r and K are positive constants, is called the logistic equation. It is used in a number of scientific disciplines, but primarily (and historically) in population dynamics where z(t) is the size (numbers or density) of individuals in a biological population. For application to population dynamics ä(t) cannot be negative. If the solution (t) vanishes at some time, then we interpret this biologically as population extinction. (a) Draw the phase line portrait...
NO Question # 3. (3 marks) Consider the power series, f(x) = Žan(x+1)". Suppose we know that f(-4), as a series, diverges, while f(2) converges. Determine the radius of convergence of the power series for f'(). Precisely name the results we learned in Week 3 that you use, and where you are using them.
(1 point) We will determine whether the series n3 + 2n an - is convergent or divergent using the Limit Comparison Test (note that the Comparison Test is difficult to apply in this case). The given series has positive terms, which is a requirement for applying the Limit Comparison Test. First we must find an appropriate series bn for comparison (this series must also have positive terms). The most reasonable choice is ba - (choose something of the form 1/mp...
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