From a sack of fruit containing 2 apples, 3 oranges, and 2 bananas, a random sample of 4 pieces of fruit is selected. Suppose X is the number of apples and Y is the number of oranges in the sample. (a) Find the joint probability distribution of X and Y. (b) Find P[(X,Y)EA], where A is the region that is given by {(x,y) |x+y<2}. (a) Complete the joint probability distribution below. (Type integers or simplified fractions.) 0 0 f(x,y) y 0 1 1 X 2 1 35 3 0 4
From a sack of fruit containing 2 apples, 3 oranges, and 2 bananas, a random sample of 4 pieces of fruit is selected. Suppose X is the number of apples and Y is the number of oranges in the sample. (a) Find the joint probability distribution of X and Y. (b) Find P[(X,Y)EA], where A is the region that is given by {(x,y) |x+y<2}. (a) Complete the joint probability distribution below. (Type integers or simplified fractions.) 0 0 f(x,y) y 0 1 1 X 2 1 35 3 0 4
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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I need help with this part a and b please
![From a sack of fruit containing 2 apples, 3 oranges, and 2 bananas, a random sample of 4 pieces of fruit is selected.
Suppose X is the number of apples and Y is the number of oranges in the sample.
(a) Find the joint probability distribution of X and Y.
(b) Find P[(X,Y)EA], where A is the region that is given by {(x,y) |x+y<2}.
(a) Complete the joint probability distribution below.
(Type integers or simplified fractions.)
0
0
f(x,y)
y 0
1
1
X
2
1
35
3
0
4](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F4557d22b-afc6-4ddb-814d-8b815e534bc0%2Fc96f704b-f737-4380-8fa2-f358cc54e6cb%2Fmerco1u_processed.png&w=3840&q=75)
Transcribed Image Text:From a sack of fruit containing 2 apples, 3 oranges, and 2 bananas, a random sample of 4 pieces of fruit is selected.
Suppose X is the number of apples and Y is the number of oranges in the sample.
(a) Find the joint probability distribution of X and Y.
(b) Find P[(X,Y)EA], where A is the region that is given by {(x,y) |x+y<2}.
(a) Complete the joint probability distribution below.
(Type integers or simplified fractions.)
0
0
f(x,y)
y 0
1
1
X
2
1
35
3
0
4
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VIEWStep 6: The joint probability distribution
VIEWStep 7: Finding the probability using the given condition
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