Do we know whether or not the following IVP has a unique solution? What theorem tells...

Show that the IVP dy/dx = xy^(3/2) y(2) = 0 has a solution but it may...

Show that the IVP dy/dx = xy^(3/2) y(2) = 0 has a solution but it may or may not be unique (i.e. the Existence and Uniqueness Theorem doesn’t imply uniqueness). (Remark: Make sure to draw an appropriate rectangular region.)

dy/dx = ysin(4x)/(y-4) a) Find region of xy plane where the d.e has a unique solution...

dy/dx = ysin(4x)/(y-4) a) Find region of xy plane where the d.e has a unique solution b) Solve the d.e by seperation of variables. Is there a lost solution? c) Find the solution of the ivp where the initial condition is y(-pi) = -1

In the following problems determine whether existence of at least one solution of the given initial...

In the following problems determine whether existence of at least one solution of the given initial value problem is thereby guaranteed and if so, whether the uniqueness of that solution is guaranteed. For each initial value problem determine all solutions and the intervals where they hold, if the case. (a) dy/dx = y^(1/3); y(1) = 1. (b) dy/dx = y^(1/3); y(1) = 0. (c) dy/dx =sqrt(x - y); y(2) = 1. Can you explain how can we approach these kind...

According to the Existence and Uniqueness Theorem, which of the following differential equations are guaranteed to...

According to the Existence and Uniqueness Theorem, which of the following differential equations are guaranteed to have a unique solution on the specified interval. Explain your reasoning (3x)(d^2y/dx^2)-5(dy/dx)+y=e^x y(0)=-1,, y(1)=2

1. The Central Limit Theorem tells us that as the sample size increases, the center of...

1. The Central Limit Theorem tells us that as the sample size increases, the center of the sampling distribution of x ̅ ____________. a. increases b. decreases c. stays the same 2. The Central Limit Theorem tells us that as the sample size increase, the spread of the sampling distribution of x ̅ ____________. a. increases b. decreases c. stays the same 3. What is the best way we know to generate data that give a fair and accurate picture...

Find a particular solution to each of the following differential equations with the given initial condition:...

Find a particular solution to each of the following differential equations with the given initial condition: A) dy/dx=ysinx/1+y^2, y(0)=1 B)dy/dx=xy ln x, y(1)=3 C)xy(1+x^2) dy/dx=(1+y^2), y(1)=0

1.If an LP problem has a unique optimal solution, can the optimal solution be an interior...

1.If an LP problem has a unique optimal solution, can the optimal solution be an interior point of the feasible region? Explain and prove. 2.How do we know from a simplex tableau of an LP problem if the current basic feasible solution is optimal? (consider a min problem) Explain.

In Problems 17-20 use determinants to decide whether the system has (a) a unique solution or...

In Problems 17-20 use determinants to decide whether the system has (a) a unique solution or (b) either no solution or infinitely many solutions. Do not solve the system. 17. 3x − 4y = 7 x + 2y = -4 20. 4u + 2v + 4w = 2 2u + v + 2w = 1 3u - 4v + w = -5

Are both of the following IVPs guaranteed a unique solution? Explain. (a) dy/dt =y^ 1/3sin(t), y(π/2)=0....

Are both of the following IVPs guaranteed a unique solution? Explain. (a) dy/dt =y^ 1/3sin(t), y(π/2)=0. (b) dy/dt =y^1/3 sin(t), y(π/2)=4.

State whether each of the following is true or false: a) Today we know that the...

State whether each of the following is true or false: a) Today we know that the Fermat number 225 + 1 is prime. b) The Fermat Primes are important in geometry. c) Fermat’s Last Theorem states that the nonlinear Diophantine equation xn + yn = zn has no nonzero integral solutions for n > 2. d) The nonlinear Diophantine equation x2+y2 = z2 has no integral solutions. e) As of 2010, a total of 243 Fermat Numbers are known to...