Suppose the amount of milk sold daily at a milk booth is distributed with a minimum of 200 litres and a maximum of 600 litres with probability density function
`f(x)={{:(k, 200 le x le 600), (0, "otherwise"):}`
Find
the distribution function

Suppose the amount of milk sold daily at a milk booth is distributed with a minimum of 200 litres and a maximum of 600 litres with probability density function f(x)={{:(k, 200 le x le 600), (0, "otherwise"):} Find the value of k

Suppose the amount of milk sold daily at a milk booth is distributed with a minimum of 200 litres and a maximum of 600 litres with probability density function f(x)={{:(k, 200 le x le 600), (0, "otherwise"):} Find the probability that daily sales will fall between 300 litres and 500 litres?

Suppose the amount of milk sold daily at a ,mile booth is distributed with a minimum of 200 litres and a maximum of 600 litres with probability density function f(x)= {(k,200lt=xlt=600),(0, "otherwise"):} . Find (i) the value of k (ii) the distribution function (iii) the probability that daily sales will fall between 300 litres and 500 litres ?

The probability density function of X is given by f(x)={{:(ke^(-x/3), "for " x gt 0), (0, "for " x le 0):} Find the distribution function

If x is the random variable with probability mass function given by f(x)={{:(x+1,1lexlt2),(-x+1,2lexlt3),(0 , "otherwise"):} Find The distrubution function find also

Find the mean of a random variable X, whose probability density function is f(x)={{:(lambdae^(-lambdax), "for " x ge 0), (0, "otherwise"):} .

The random variable X has the probability density function f(x)={{:(ax+b, 0 lt x lt 1), (0, "otherwise"):} and E(X)=7/12 , then a and b are respectively