Find the joint density function of Y ( j ) and Y ( k ) , where j and k are integers 1 ≤ j ≤ k ≤ n

Question

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Answer 1

Question

Chapter 6, Problem 77SE

a.

To determine

Find the joint density function of Y(j) and Y(k), where j and k are integers 1≤j≤k≤n

a.

Expert Solution

Answer to Problem 77SE

The joint density function of Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2},0≤yj≤θ .

Explanation of Solution

Calculation:

From Theorem 6.5, the joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}

From Exercise 6-74, the density function is f(y)=1θ,0≤y≤θ and the distribution function is F(y)=yθ.

The joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1×[ykθ−yjθ]k−1−j×[1−ykθ]n−k1θ×1θ=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2,0≤yj≤θ

b.

To determine

Find Cov(Y(j),Y(k)), where j and k are integers 1≤j≤k≤n.

b.

Expert Solution

Answer to Problem 77SE

The value of Cov(Y(j),Y(k)) is n−k+1(n+1)2(n+2)θ2.

Explanation of Solution

Calculation:

Consider,

E(Y(j)Y(k))=∫∫yjykg(j)(k)(yj,yk)dyjdyk=∫∫yjyk{n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}dyjdyk=n!(j−1)!(k−1−j)!(n−k)!θ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [Let, yjθ=uykθ=v]=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [c=n!(j−1)!(k−1−j)!(n−k)!]

Let us consider,

w=uvu=wvdu=vdw

Then, the integral becomes,

E(Y(j)Y(k))=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv=cθ2[∫01uk+1(1−u)n−kdu][∫01wj(1−w)k−1−jdw]=(k+1)j(n+1)(n+2)θ2

From Exercise 6-76, E(Y(j))=jn+1θ and E(Y(k))=kn+1θ.

Therefore,

Cov(Y(j),Y(k))=E(Y(j)Y(k))−E(Y(j))E(Y(k))=(k+1)j(n+1)(n+2)θ2−(jn+1θ)(kn+1θ)=(k+1)j(n+1)(n+2)θ2−jk(n+1)2θ2=n−k+1(n+1)2(n+2)θ2

c.

To determine

Find the value of V(Y(k)−Y(j)).

c.

Expert Solution

Answer to Problem 77SE

The value of V(Y(k)−Y(j)) is (n−k+j+1)(k−j)(n+1)2(n+2)θ2.

Explanation of Solution

Calculation:

From Exercise 6-76, V(Y(k))=k(n−k+1)(n+1)2(n+2)θ2 and V(Y(j))=j(n−j+1)(n+1)2(n+2)θ2.

Consider,

V(Y(k)−Y(j))=V(Y(k))+V(Y(j))−2Cov(Y(k),Y(j))=k(n−k+1)(n+1)2(n+2)θ2+j(n−j+1)(n+1)2(n+2)θ2−2n−k+1(n+1)2(n+2)θ2=(n−k+1)(k−2)+j(n−j+1)(n+1)2(n+2)θ2=(n−k+j+1)(k−j)(n+1)2(n+2)θ2

=k(k+1)(n+1)(n+2)θ2

Therefore,

V(Y(k))=E(Y(k)2)−[E(Y(k))]2=k(k+1)(n+1)(n+2)θ2−(kn+1θ)2=k(n−k+1)(n+1)2(n+2)θ2

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Answer 2

Question

Chapter 6, Problem 77SE

a.

To determine

Find the joint density function of Y(j) and Y(k), where j and k are integers 1≤j≤k≤n

a.

Expert Solution

Answer to Problem 77SE

The joint density function of Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2},0≤yj≤θ .

Explanation of Solution

Calculation:

From Theorem 6.5, the joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}

From Exercise 6-74, the density function is f(y)=1θ,0≤y≤θ and the distribution function is F(y)=yθ.

The joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1×[ykθ−yjθ]k−1−j×[1−ykθ]n−k1θ×1θ=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2,0≤yj≤θ

b.

To determine

Find Cov(Y(j),Y(k)), where j and k are integers 1≤j≤k≤n.

b.

Expert Solution

Answer to Problem 77SE

The value of Cov(Y(j),Y(k)) is n−k+1(n+1)2(n+2)θ2.

Explanation of Solution

Calculation:

Consider,

E(Y(j)Y(k))=∫∫yjykg(j)(k)(yj,yk)dyjdyk=∫∫yjyk{n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}dyjdyk=n!(j−1)!(k−1−j)!(n−k)!θ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [Let, yjθ=uykθ=v]=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [c=n!(j−1)!(k−1−j)!(n−k)!]

Let us consider,

w=uvu=wvdu=vdw

Then, the integral becomes,

E(Y(j)Y(k))=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv=cθ2[∫01uk+1(1−u)n−kdu][∫01wj(1−w)k−1−jdw]=(k+1)j(n+1)(n+2)θ2

From Exercise 6-76, E(Y(j))=jn+1θ and E(Y(k))=kn+1θ.

Therefore,

Cov(Y(j),Y(k))=E(Y(j)Y(k))−E(Y(j))E(Y(k))=(k+1)j(n+1)(n+2)θ2−(jn+1θ)(kn+1θ)=(k+1)j(n+1)(n+2)θ2−jk(n+1)2θ2=n−k+1(n+1)2(n+2)θ2

c.

To determine

Find the value of V(Y(k)−Y(j)).

c.

Expert Solution

Answer to Problem 77SE

The value of V(Y(k)−Y(j)) is (n−k+j+1)(k−j)(n+1)2(n+2)θ2.

Explanation of Solution

Calculation:

From Exercise 6-76, V(Y(k))=k(n−k+1)(n+1)2(n+2)θ2 and V(Y(j))=j(n−j+1)(n+1)2(n+2)θ2.

Consider,

V(Y(k)−Y(j))=V(Y(k))+V(Y(j))−2Cov(Y(k),Y(j))=k(n−k+1)(n+1)2(n+2)θ2+j(n−j+1)(n+1)2(n+2)θ2−2n−k+1(n+1)2(n+2)θ2=(n−k+1)(k−2)+j(n−j+1)(n+1)2(n+2)θ2=(n−k+j+1)(k−j)(n+1)2(n+2)θ2

=k(k+1)(n+1)(n+2)θ2

Therefore,

V(Y(k))=E(Y(k)2)−[E(Y(k))]2=k(k+1)(n+1)(n+2)θ2−(kn+1θ)2=k(n−k+1)(n+1)2(n+2)θ2

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Answer 3

Question

Chapter 6, Problem 77SE

a.

To determine

Find the joint density function of Y(j) and Y(k), where j and k are integers 1≤j≤k≤n

a.

Expert Solution

Answer to Problem 77SE

The joint density function of Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2},0≤yj≤θ .

Explanation of Solution

Calculation:

From Theorem 6.5, the joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}

From Exercise 6-74, the density function is f(y)=1θ,0≤y≤θ and the distribution function is F(y)=yθ.

The joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1×[ykθ−yjθ]k−1−j×[1−ykθ]n−k1θ×1θ=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2,0≤yj≤θ

b.

To determine

Find Cov(Y(j),Y(k)), where j and k are integers 1≤j≤k≤n.

b.

Expert Solution

Answer to Problem 77SE

The value of Cov(Y(j),Y(k)) is n−k+1(n+1)2(n+2)θ2.

Explanation of Solution

Calculation:

Consider,

E(Y(j)Y(k))=∫∫yjykg(j)(k)(yj,yk)dyjdyk=∫∫yjyk{n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}dyjdyk=n!(j−1)!(k−1−j)!(n−k)!θ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [Let, yjθ=uykθ=v]=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [c=n!(j−1)!(k−1−j)!(n−k)!]

Let us consider,

w=uvu=wvdu=vdw

Then, the integral becomes,

E(Y(j)Y(k))=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv=cθ2[∫01uk+1(1−u)n−kdu][∫01wj(1−w)k−1−jdw]=(k+1)j(n+1)(n+2)θ2

From Exercise 6-76, E(Y(j))=jn+1θ and E(Y(k))=kn+1θ.

Therefore,

Cov(Y(j),Y(k))=E(Y(j)Y(k))−E(Y(j))E(Y(k))=(k+1)j(n+1)(n+2)θ2−(jn+1θ)(kn+1θ)=(k+1)j(n+1)(n+2)θ2−jk(n+1)2θ2=n−k+1(n+1)2(n+2)θ2

c.

To determine

Find the value of V(Y(k)−Y(j)).

c.

Expert Solution

Answer to Problem 77SE

The value of V(Y(k)−Y(j)) is (n−k+j+1)(k−j)(n+1)2(n+2)θ2.

Explanation of Solution

Calculation:

From Exercise 6-76, V(Y(k))=k(n−k+1)(n+1)2(n+2)θ2 and V(Y(j))=j(n−j+1)(n+1)2(n+2)θ2.

Consider,

V(Y(k)−Y(j))=V(Y(k))+V(Y(j))−2Cov(Y(k),Y(j))=k(n−k+1)(n+1)2(n+2)θ2+j(n−j+1)(n+1)2(n+2)θ2−2n−k+1(n+1)2(n+2)θ2=(n−k+1)(k−2)+j(n−j+1)(n+1)2(n+2)θ2=(n−k+j+1)(k−j)(n+1)2(n+2)θ2

=k(k+1)(n+1)(n+2)θ2

Therefore,

V(Y(k))=E(Y(k)2)−[E(Y(k))]2=k(k+1)(n+1)(n+2)θ2−(kn+1θ)2=k(n−k+1)(n+1)2(n+2)θ2

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Answer 4

Question

Chapter 6, Problem 77SE

a.

To determine

Find the joint density function of Y(j) and Y(k), where j and k are integers 1≤j≤k≤n

a.

Expert Solution

Answer to Problem 77SE

The joint density function of Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2},0≤yj≤θ .

Explanation of Solution

Calculation:

From Theorem 6.5, the joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}

From Exercise 6-74, the density function is f(y)=1θ,0≤y≤θ and the distribution function is F(y)=yθ.

The joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1×[ykθ−yjθ]k−1−j×[1−ykθ]n−k1θ×1θ=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2,0≤yj≤θ

b.

To determine

Find Cov(Y(j),Y(k)), where j and k are integers 1≤j≤k≤n.

b.

Expert Solution

Answer to Problem 77SE

The value of Cov(Y(j),Y(k)) is n−k+1(n+1)2(n+2)θ2.

Explanation of Solution

Calculation:

Consider,

E(Y(j)Y(k))=∫∫yjykg(j)(k)(yj,yk)dyjdyk=∫∫yjyk{n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}dyjdyk=n!(j−1)!(k−1−j)!(n−k)!θ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [Let, yjθ=uykθ=v]=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [c=n!(j−1)!(k−1−j)!(n−k)!]

Let us consider,

w=uvu=wvdu=vdw

Then, the integral becomes,

E(Y(j)Y(k))=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv=cθ2[∫01uk+1(1−u)n−kdu][∫01wj(1−w)k−1−jdw]=(k+1)j(n+1)(n+2)θ2

From Exercise 6-76, E(Y(j))=jn+1θ and E(Y(k))=kn+1θ.

Therefore,

Cov(Y(j),Y(k))=E(Y(j)Y(k))−E(Y(j))E(Y(k))=(k+1)j(n+1)(n+2)θ2−(jn+1θ)(kn+1θ)=(k+1)j(n+1)(n+2)θ2−jk(n+1)2θ2=n−k+1(n+1)2(n+2)θ2

c.

To determine

Find the value of V(Y(k)−Y(j)).

c.

Expert Solution

Answer to Problem 77SE

The value of V(Y(k)−Y(j)) is (n−k+j+1)(k−j)(n+1)2(n+2)θ2.

Explanation of Solution

Calculation:

From Exercise 6-76, V(Y(k))=k(n−k+1)(n+1)2(n+2)θ2 and V(Y(j))=j(n−j+1)(n+1)2(n+2)θ2.

Consider,

V(Y(k)−Y(j))=V(Y(k))+V(Y(j))−2Cov(Y(k),Y(j))=k(n−k+1)(n+1)2(n+2)θ2+j(n−j+1)(n+1)2(n+2)θ2−2n−k+1(n+1)2(n+2)θ2=(n−k+1)(k−2)+j(n−j+1)(n+1)2(n+2)θ2=(n−k+j+1)(k−j)(n+1)2(n+2)θ2

=k(k+1)(n+1)(n+2)θ2

Therefore,

V(Y(k))=E(Y(k)2)−[E(Y(k))]2=k(k+1)(n+1)(n+2)θ2−(kn+1θ)2=k(n−k+1)(n+1)2(n+2)θ2

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Answer 5

Chapter 6, Problem 77SE

a.

To determine

Find the joint density function of Y(j) and Y(k), where j and k are integers 1≤j≤k≤n

a.

Expert Solution

Answer to Problem 77SE

The joint density function of Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2},0≤yj≤θ .

Explanation of Solution

Calculation:

From Theorem 6.5, the joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}

From Exercise 6-74, the density function is f(y)=1θ,0≤y≤θ and the distribution function is F(y)=yθ.

The joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1×[ykθ−yjθ]k−1−j×[1−ykθ]n−k1θ×1θ=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2,0≤yj≤θ

b.

To determine

Find Cov(Y(j),Y(k)), where j and k are integers 1≤j≤k≤n.

b.

Expert Solution

Answer to Problem 77SE

The value of Cov(Y(j),Y(k)) is n−k+1(n+1)2(n+2)θ2.

Explanation of Solution

Calculation:

Consider,

E(Y(j)Y(k))=∫∫yjykg(j)(k)(yj,yk)dyjdyk=∫∫yjyk{n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}dyjdyk=n!(j−1)!(k−1−j)!(n−k)!θ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [Let, yjθ=uykθ=v]=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [c=n!(j−1)!(k−1−j)!(n−k)!]

Let us consider,

w=uvu=wvdu=vdw

Then, the integral becomes,

E(Y(j)Y(k))=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv=cθ2[∫01uk+1(1−u)n−kdu][∫01wj(1−w)k−1−jdw]=(k+1)j(n+1)(n+2)θ2

From Exercise 6-76, E(Y(j))=jn+1θ and E(Y(k))=kn+1θ.

Therefore,

Cov(Y(j),Y(k))=E(Y(j)Y(k))−E(Y(j))E(Y(k))=(k+1)j(n+1)(n+2)θ2−(jn+1θ)(kn+1θ)=(k+1)j(n+1)(n+2)θ2−jk(n+1)2θ2=n−k+1(n+1)2(n+2)θ2

c.

To determine

Find the value of V(Y(k)−Y(j)).

c.

Expert Solution

Answer to Problem 77SE

The value of V(Y(k)−Y(j)) is (n−k+j+1)(k−j)(n+1)2(n+2)θ2.

Explanation of Solution

Calculation:

From Exercise 6-76, V(Y(k))=k(n−k+1)(n+1)2(n+2)θ2 and V(Y(j))=j(n−j+1)(n+1)2(n+2)θ2.

Consider,

V(Y(k)−Y(j))=V(Y(k))+V(Y(j))−2Cov(Y(k),Y(j))=k(n−k+1)(n+1)2(n+2)θ2+j(n−j+1)(n+1)2(n+2)θ2−2n−k+1(n+1)2(n+2)θ2=(n−k+1)(k−2)+j(n−j+1)(n+1)2(n+2)θ2=(n−k+j+1)(k−j)(n+1)2(n+2)θ2

=k(k+1)(n+1)(n+2)θ2

Therefore,

V(Y(k))=E(Y(k)2)−[E(Y(k))]2=k(k+1)(n+1)(n+2)θ2−(kn+1θ)2=k(n−k+1)(n+1)2(n+2)θ2

Answer 6

Chapter 6, Problem 77SE

a.

To determine

Find the joint density function of Y(j) and Y(k), where j and k are integers 1≤j≤k≤n

a.

Expert Solution

Answer to Problem 77SE

The joint density function of Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2},0≤yj≤θ .

Explanation of Solution

Calculation:

From Theorem 6.5, the joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}

From Exercise 6-74, the density function is f(y)=1θ,0≤y≤θ and the distribution function is F(y)=yθ.

The joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1×[ykθ−yjθ]k−1−j×[1−ykθ]n−k1θ×1θ=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2,0≤yj≤θ

Answer 7

Chapter 6, Problem 77SE

a.

To determine

Find the joint density function of Y(j) and Y(k), where j and k are integers 1≤j≤k≤n

Answer 8

a.

Expert Solution

Answer to Problem 77SE

The joint density function of Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2},0≤yj≤θ .

Answer 9

a.

Expert Solution

Answer 10

a.

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

Calculation:

From Theorem 6.5, the joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)={n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}

From Exercise 6-74, the density function is f(y)=1θ,0≤y≤θ and the distribution function is F(y)=yθ.

The joint density function for Y(j) and Y(k) is,

g(j)(k)(yj,yk)=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1×[ykθ−yjθ]k−1−j×[1−ykθ]n−k1θ×1θ=n!(j−1)!(k−1−j)!(n−k)![yjθ]j−1[ykθ−yjθ]k−1−j[1−ykθ]n−k1θ2,0≤yj≤θ

Answer 13

b.

To determine

Find Cov(Y(j),Y(k)), where j and k are integers 1≤j≤k≤n.

b.

Expert Solution

Answer to Problem 77SE

The value of Cov(Y(j),Y(k)) is n−k+1(n+1)2(n+2)θ2.

Explanation of Solution

Calculation:

Consider,

E(Y(j)Y(k))=∫∫yjykg(j)(k)(yj,yk)dyjdyk=∫∫yjyk{n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}dyjdyk=n!(j−1)!(k−1−j)!(n−k)!θ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [Let, yjθ=uykθ=v]=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [c=n!(j−1)!(k−1−j)!(n−k)!]

Let us consider,

w=uvu=wvdu=vdw

Then, the integral becomes,

E(Y(j)Y(k))=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv=cθ2[∫01uk+1(1−u)n−kdu][∫01wj(1−w)k−1−jdw]=(k+1)j(n+1)(n+2)θ2

From Exercise 6-76, E(Y(j))=jn+1θ and E(Y(k))=kn+1θ.

Therefore,

Cov(Y(j),Y(k))=E(Y(j)Y(k))−E(Y(j))E(Y(k))=(k+1)j(n+1)(n+2)θ2−(jn+1θ)(kn+1θ)=(k+1)j(n+1)(n+2)θ2−jk(n+1)2θ2=n−k+1(n+1)2(n+2)θ2

Answer 14

b.

To determine

Find Cov(Y(j),Y(k)), where j and k are integers 1≤j≤k≤n.

Answer 15

b.

Expert Solution

Answer to Problem 77SE

The value of Cov(Y(j),Y(k)) is n−k+1(n+1)2(n+2)θ2.

Answer 16

b.

Expert Solution

Answer 17

b.

Expert Solution

Answer 18

Expert Solution

Answer 19

Explanation of Solution

Calculation:

Consider,

E(Y(j)Y(k))=∫∫yjykg(j)(k)(yj,yk)dyjdyk=∫∫yjyk{n!(j−1)!(k−1−j)!(n−k)![F(yj)]j−1×[F(yk)−F(yj)]k−1−j×[1−F(yk)]n−kf(yj)f(yk)}dyjdyk=n!(j−1)!(k−1−j)!(n−k)!θ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [Let, yjθ=uykθ=v]=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv [c=n!(j−1)!(k−1−j)!(n−k)!]

Let us consider,

w=uvu=wvdu=vdw

Then, the integral becomes,

E(Y(j)Y(k))=cθ∫01∫0vuj[v−u]k−1−jv[1−v]n−kdudv=cθ2[∫01uk+1(1−u)n−kdu][∫01wj(1−w)k−1−jdw]=(k+1)j(n+1)(n+2)θ2

From Exercise 6-76, E(Y(j))=jn+1θ and E(Y(k))=kn+1θ.

Therefore,

Cov(Y(j),Y(k))=E(Y(j)Y(k))−E(Y(j))E(Y(k))=(k+1)j(n+1)(n+2)θ2−(jn+1θ)(kn+1θ)=(k+1)j(n+1)(n+2)θ2−jk(n+1)2θ2=n−k+1(n+1)2(n+2)θ2

Answer 20

c.

To determine

Find the value of V(Y(k)−Y(j)).

c.

Expert Solution

Answer to Problem 77SE

The value of V(Y(k)−Y(j)) is (n−k+j+1)(k−j)(n+1)2(n+2)θ2.

Explanation of Solution

Calculation:

From Exercise 6-76, V(Y(k))=k(n−k+1)(n+1)2(n+2)θ2 and V(Y(j))=j(n−j+1)(n+1)2(n+2)θ2.

Consider,

V(Y(k)−Y(j))=V(Y(k))+V(Y(j))−2Cov(Y(k),Y(j))=k(n−k+1)(n+1)2(n+2)θ2+j(n−j+1)(n+1)2(n+2)θ2−2n−k+1(n+1)2(n+2)θ2=(n−k+1)(k−2)+j(n−j+1)(n+1)2(n+2)θ2=(n−k+j+1)(k−j)(n+1)2(n+2)θ2

=k(k+1)(n+1)(n+2)θ2

Therefore,

V(Y(k))=E(Y(k)2)−[E(Y(k))]2=k(k+1)(n+1)(n+2)θ2−(kn+1θ)2=k(n−k+1)(n+1)2(n+2)θ2

Answer 21

c.

To determine

Find the value of V(Y(k)−Y(j)).

Answer 22

c.

Expert Solution

Answer to Problem 77SE

The value of V(Y(k)−Y(j)) is (n−k+j+1)(k−j)(n+1)2(n+2)θ2.

Answer 23

c.

Expert Solution

Answer 24

c.

Expert Solution

Answer 25

Expert Solution

Answer 26

Explanation of Solution

Calculation:

From Exercise 6-76, V(Y(k))=k(n−k+1)(n+1)2(n+2)θ2 and V(Y(j))=j(n−j+1)(n+1)2(n+2)θ2.

Consider,

V(Y(k)−Y(j))=V(Y(k))+V(Y(j))−2Cov(Y(k),Y(j))=k(n−k+1)(n+1)2(n+2)θ2+j(n−j+1)(n+1)2(n+2)θ2−2n−k+1(n+1)2(n+2)θ2=(n−k+1)(k−2)+j(n−j+1)(n+1)2(n+2)θ2=(n−k+j+1)(k−j)(n+1)2(n+2)θ2

=k(k+1)(n+1)(n+2)θ2

Therefore,

V(Y(k))=E(Y(k)2)−[E(Y(k))]2=k(k+1)(n+1)(n+2)θ2−(kn+1θ)2=k(n−k+1)(n+1)2(n+2)θ2

Answer 27

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Find the joint density function of Y ( j ) and Y ( k ) , where j and k are integers 1 ≤ j ≤ k ≤ n

Find the joint density function of Y(j) and Y(k), where j and k are integers 1≤j≤k≤n

Answer to Problem 77SE

Explanation of Solution

Find Cov(Y(j),Y(k)), where j and k are integers 1≤j≤k≤n.

Answer to Problem 77SE

Explanation of Solution

Find the value of V(Y(k)−Y(j)).

Answer to Problem 77SE

Explanation of Solution

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