Question

How can i find t (candle factory statistics question - a bit difficult, need it to prepare for an exam)?

in some candle factory, the length disturbance (cm) of each candle is normal with the parameters 15 and `t^2`
. knowing that the probability that the shortest candle in a random package is longer than 14.6 cm (out of 45 candles) is 0.354206. how can i find t?

Answer 1

The standard deviation is `sigma = 0.2001`.

Explanation:

Let `X_i` be the length of any candle in the box. Then `X_i" ~ N"(15, sigma^2)",  for " i=1,...,45.`

Let the CDF of each `X_i` be denoted `F_X(x)="P"(X_i < x)`.

The CDF of the minimum of all `X"'s"` is then

`"P"[min(X_i) < x]=1-[1-F_X(x)]^45`.

From the given information, we know `"P"(min(X_i) > 14.6)=0.354206,` which means

`"P"[min(X_i) < 14.6]=1-"P"[min(X_i) > 14.6]`

Substituting in known values gives

`1-[1-F_X(14.6)]^45=1-0.354206`

`=>"      "[1-F_X(14.6)]^45="       "0.354206`

`=>"       "1-F_X(14.6)"    "="    "root45(0.354206)`

`=>"           "1-F_X(14.6)=0.9772`

`=>"                  "F_X(14.6)=0.0228`

`=>"          P"(X_i < 14.6)=0.0228`

`=>"P"(Z < (14.6-15)/sigma)=0.0228`

`=> (–0.4)/sigma = –1.999` (from table lookup)

`=> sigma = (–0.4)/(–1.999)= 0.2001 ~~ 0.2`