Show that the joint density of ( U 1 , U 2 ) is f U 1 , U 2 ( u 1 , u 2 ) = f Y 1 , Y 2 ( u 1 − u 2 , u 2 ) .

Question

Want to see the full answer?

Answer 1

Question

Chapter 6.6, Problem 66E

a.

To determine

Show that the joint density of (U1,U2) is fU1,U2(u1,u2)=fY1,Y2(u1−u2,u2).

b.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1,Y2(u1−u2,u2)du2.

c.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1(u1−u2)fY2(u2)du2.

Expert Solution & Answer

Want to see the full answer?

Check out a sample textbook solution

See solution

Students have asked these similar questions

Find the gradient fields of the functions g(x, y, z) = xy + yz + xz

2. Let U be a vector function of position in R³ with continuous second partial deriva- tives. We write (U₁, U2, U3) for the components of U. (a) Show that V (U • U) – Ü × (▼ × Ü) = (U · ▼) Ū, (V where ((UV) U), = U₁ (b) We define the vector function of position, by setting = V × . If the condition V U = 0 holds true, show that ▼ × ((Ū · V) Ű) = (Ũ · V) Ñ - (Ñ· ▼) ū. (Hint: The representation of (UV) U from the first part might be useful.)

Let X,Y be jointly Gaussian, standard, and Cov (X, Y) = y. Find pdf of Z = X +Y.

Answer 2

Question

Chapter 6.6, Problem 66E

a.

To determine

Show that the joint density of (U1,U2) is fU1,U2(u1,u2)=fY1,Y2(u1−u2,u2).

b.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1,Y2(u1−u2,u2)du2.

c.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1(u1−u2)fY2(u2)du2.

Expert Solution & Answer

Want to see the full answer?

Check out a sample textbook solution

See solution

Answer 3

Question

Chapter 6.6, Problem 66E

a.

To determine

Show that the joint density of (U1,U2) is fU1,U2(u1,u2)=fY1,Y2(u1−u2,u2).

b.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1,Y2(u1−u2,u2)du2.

c.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1(u1−u2)fY2(u2)du2.

Expert Solution & Answer

Want to see the full answer?

Check out a sample textbook solution

See solution

Answer 4

Question

Chapter 6.6, Problem 66E

a.

To determine

Show that the joint density of (U1,U2) is fU1,U2(u1,u2)=fY1,Y2(u1−u2,u2).

b.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1,Y2(u1−u2,u2)du2.

c.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1(u1−u2)fY2(u2)du2.

Expert Solution & Answer

Want to see the full answer?

Check out a sample textbook solution

See solution

Answer 5

Chapter 6.6, Problem 66E

a.

To determine

Show that the joint density of (U1,U2) is fU1,U2(u1,u2)=fY1,Y2(u1−u2,u2).

b.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1,Y2(u1−u2,u2)du2.

c.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1(u1−u2)fY2(u2)du2.

Answer 6

Chapter 6.6, Problem 66E

a.

To determine

Show that the joint density of (U1,U2) is fU1,U2(u1,u2)=fY1,Y2(u1−u2,u2).

Answer 7

Chapter 6.6, Problem 66E

a.

To determine

Show that the joint density of (U1,U2) is fU1,U2(u1,u2)=fY1,Y2(u1−u2,u2).

Answer 8

b.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1,Y2(u1−u2,u2)du2.

Answer 9

b.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1,Y2(u1−u2,u2)du2.

Answer 10

c.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1(u1−u2)fY2(u2)du2.

Answer 11

c.

To determine

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1(u1−u2)fY2(u2)du2.

Answer 12

Expert Solution & Answer

Answer 13

Expert Solution & Answer

Answer 14

Want to see the full answer?

Check out a sample textbook solution

See solution

Answer 15

Ch. 6.3 - Let Y be a random variable with probability...Ch. 6.3 - Prob. 2E Ch. 6.3 - Prob. 3E Ch. 6.3 - The amount of flour used per day by a bakery is a...Ch. 6.3 - Prob. 5E Ch. 6.3 - The joint distribution of amount of pollutant...Ch. 6.3 - Suppose that Z has a standard normal distribution....Ch. 6.3 - Assume that Y has a beta distribution with...Ch. 6.3 - Prob. 9E Ch. 6.3 - The total time from arrival to completion of...

Show that the joint density of ( U 1 , U 2 ) is f U 1 , U 2 ( u 1 , u 2 ) = f Y 1 , Y 2 ( u 1 − u 2 , u 2 ) .

Videos

Show that the joint density of (U1,U2) is fU1,U2(u1,u2)=fY1,Y2(u1−u2,u2).

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1,Y2(u1−u2,u2)du2.

Show that the marginal density function for U1 is fU1(u1)=∫−∞∞fY1(u1−u2)fY2(u2)du2.

Want to see the full answer?

Chapter 6 Solutions