Please just answer problem 12. Problem 11 is attached to help you. (11) When the conditional density of X given Y = y E (0, 1) is2xfx\Y=y (x) =y < x < 1.1 – y2 ’Compute E(X|Y = 0.25).0.70.250.75None of the aboveN/A(Select One)(12) For the last problem obtain E(X|Y).2Y23(1+Y)2(1+Y+Y?)3(1+Y)2(1-Y+Y²)3(1+Y)2None of the aboveN/A3(1+Y)(Select One)

We have to solve given problem:

(11) When the conditional density of X given Y = y E (0, 1) is 2x fx|Y=y(x) = y < x < 1. 1- y2 Compute E(X|Y = 0.25). 0.7 0.25 0.75 2 None of the above N/A (Select One) (12) For the last problem obtain E(X|Y). 2Y2 3(1+Y) 2(1+Y+Y²) 3(1+Y) 2(1-Y+Y²) 3(1+Y) 3(1+Y) None of the above N/A (Select One)

(11) When the conditional density of X given Y = y E (0, 1) is 2x fx|Y=y(x) = y < x < 1. 1- y2 Compute E(X|Y = 0.25). 0.7 0.25 0.75 2 None of the above N/A (Select One) (12) For the last problem obtain E(X|Y). 2Y2 3(1+Y) 2(1+Y+Y²) 3(1+Y) 2(1-Y+Y²) 3(1+Y) 3(1+Y) None of the above N/A (Select One)

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Counting Principles

In statistics, the counting principle can be said to be the concept in which the quantity of an item is determined. There can be a single item, or a group of items, or items that are related to each other. In every possible set of items, the quantity of the possible item groups or their sorting measures can be determined with counting principles.

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Please just answer problem 12. Problem 11 is attached to help you.

(11) When the conditional density of X given Y = y E (0, 1) is
2x
fx\Y=y (x) =
y < x < 1.
1 – y2 ’
Compute E(X|Y = 0.25).
0.7
0.25
0.75
None of the above
N/A
(Select One)
(12) For the last problem obtain E(X|Y).
2Y2
3(1+Y)
2(1+Y+Y?)
3(1+Y)
2(1-Y+Y²)
3(1+Y)
2
None of the above
N/A
3(1+Y)
(Select One)

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ISBN:

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