Question 1

Use the normal model n(11371137,9696) for the weights of steers. a) what weight represents the 3737thth percentile? b) what weight represents the 9999thth percentile? c) what's the iqr of the weights of these steers?

Question 2

Denote by

the

-th percentile of the distribution followed by

.

$\mathbb P(X\le x_(0.37))=\mathbb P\left((X-1137)/(96)\le(x_(0.37)-1137)/(96)\right)=\mathbb P(Z\le z_(0.37))\approx0.37$

$\implies z_(0.37)=(x_(0.37)-1137)/(96)\approx-0.3319\implies x_(0.37)\approx1105.14$

$\mathbb P(X\le x_(0.99))=\mathbb P\left((X-1137)/(96)\le(x_(0.99)-1137)/(96)\right)=\mathbb P(Z\le z_(0.99))\approx0.99$

$\implies z_(0.99)=(x_(0.99)-1137)/(96)\approx2.3264\implies x_(0.37)\approx1360.33$

$\mathrm{IQR}=x_(0.75)-x_(0.25)$

$z_(0.25)\approx-0.6745\implies x_(0.25)\approx1072.249$

$z_(0.75)\approx0.6745\implies x_(0.75)\approx1201.751$

$\implies\mathrm{IQR}\approx129.502$

0 Comments

Please log in or register to add a comment.

Please log in or register to answer this question.

1 Answer

0 Comments

Please log in or register to add a comment.

Other Questions