P ( X ≤ 1 )

Question

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Answer 1

Question

Chapter 9, Problem 1CRE

To determine

To compute: P(X≤1)

Expert Solution & Answer

Answer to Problem 1CRE

P(X≤1)=34

Explanation of Solution

Given information:

X is a continuous random variable with probability density p(x)=1π(x2+1) .

Formula used: P(X≤a)=∫−∞ap(x)dx

Calculation:

p(x)=1π(x2+1) (Given)

P(X≤1)=∫−∞1p(x)dx=∫−∞11π( x 2+1)dx=1π∫−∞11(x2+1)dx=1π[tan−1x]−∞1=1π[tan−11−tan−1(−∞)]=1π[π4−(−π2)]=1π[3π4]=34

Hence, P(X≤1)=34 .

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Answer 2

Question

Chapter 9, Problem 1CRE

To determine

To compute: P(X≤1)

Expert Solution & Answer

Answer to Problem 1CRE

P(X≤1)=34

Explanation of Solution

Given information:

X is a continuous random variable with probability density p(x)=1π(x2+1) .

Formula used: P(X≤a)=∫−∞ap(x)dx

Calculation:

p(x)=1π(x2+1) (Given)

P(X≤1)=∫−∞1p(x)dx=∫−∞11π( x 2+1)dx=1π∫−∞11(x2+1)dx=1π[tan−1x]−∞1=1π[tan−11−tan−1(−∞)]=1π[π4−(−π2)]=1π[3π4]=34

Hence, P(X≤1)=34 .

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Answer 3

Question

Chapter 9, Problem 1CRE

To determine

To compute: P(X≤1)

Expert Solution & Answer

Answer to Problem 1CRE

P(X≤1)=34

Explanation of Solution

Given information:

X is a continuous random variable with probability density p(x)=1π(x2+1) .

Formula used: P(X≤a)=∫−∞ap(x)dx

Calculation:

p(x)=1π(x2+1) (Given)

P(X≤1)=∫−∞1p(x)dx=∫−∞11π( x 2+1)dx=1π∫−∞11(x2+1)dx=1π[tan−1x]−∞1=1π[tan−11−tan−1(−∞)]=1π[π4−(−π2)]=1π[3π4]=34

Hence, P(X≤1)=34 .

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Answer 4

Question

Chapter 9, Problem 1CRE

To determine

To compute: P(X≤1)

Expert Solution & Answer

Answer to Problem 1CRE

P(X≤1)=34

Explanation of Solution

Given information:

X is a continuous random variable with probability density p(x)=1π(x2+1) .

Formula used: P(X≤a)=∫−∞ap(x)dx

Calculation:

p(x)=1π(x2+1) (Given)

P(X≤1)=∫−∞1p(x)dx=∫−∞11π( x 2+1)dx=1π∫−∞11(x2+1)dx=1π[tan−1x]−∞1=1π[tan−11−tan−1(−∞)]=1π[π4−(−π2)]=1π[3π4]=34

Hence, P(X≤1)=34 .

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Answer 5

Chapter 9, Problem 1CRE

To determine

To compute: P(X≤1)

Expert Solution & Answer

Answer to Problem 1CRE

P(X≤1)=34

Explanation of Solution

Given information:

X is a continuous random variable with probability density p(x)=1π(x2+1) .

Formula used: P(X≤a)=∫−∞ap(x)dx

Calculation:

p(x)=1π(x2+1) (Given)

P(X≤1)=∫−∞1p(x)dx=∫−∞11π( x 2+1)dx=1π∫−∞11(x2+1)dx=1π[tan−1x]−∞1=1π[tan−11−tan−1(−∞)]=1π[π4−(−π2)]=1π[3π4]=34

Hence, P(X≤1)=34 .

Answer 6

Chapter 9, Problem 1CRE

To determine

To compute: P(X≤1)

Expert Solution & Answer

Answer to Problem 1CRE

P(X≤1)=34

Explanation of Solution

Given information:

X is a continuous random variable with probability density p(x)=1π(x2+1) .

Formula used: P(X≤a)=∫−∞ap(x)dx

Calculation:

p(x)=1π(x2+1) (Given)

P(X≤1)=∫−∞1p(x)dx=∫−∞11π( x 2+1)dx=1π∫−∞11(x2+1)dx=1π[tan−1x]−∞1=1π[tan−11−tan−1(−∞)]=1π[π4−(−π2)]=1π[3π4]=34

Hence, P(X≤1)=34 .

Answer 7

Chapter 9, Problem 1CRE

To determine

To compute: P(X≤1)

Answer 8

Expert Solution & Answer

Answer to Problem 1CRE

P(X≤1)=34

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

Explanation of Solution

Given information:

X is a continuous random variable with probability density p(x)=1π(x2+1) .

Formula used: P(X≤a)=∫−∞ap(x)dx

Calculation:

p(x)=1π(x2+1) (Given)

P(X≤1)=∫−∞1p(x)dx=∫−∞11π( x 2+1)dx=1π∫−∞11(x2+1)dx=1π[tan−1x]−∞1=1π[tan−11−tan−1(−∞)]=1π[π4−(−π2)]=1π[3π4]=34

Hence, P(X≤1)=34 .

Answer 12

Ch. 9.1 - Prob. 1PQ Ch. 9.1 - Prob. 2PQ Ch. 9.1 - Prob. 3PQ Ch. 9.1 - Prob. 1E Ch. 9.1 - Prob. 2E Ch. 9.1 - Prob. 3E Ch. 9.1 - Prob. 4E Ch. 9.1 - Prob. 5E Ch. 9.1 - Prob. 6E Ch. 9.1 - Prob. 7E

P ( X ≤ 1 )

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To compute: P(X≤1)

Answer to Problem 1CRE

Explanation of Solution

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Chapter 9 Solutions