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If z is a standard normal variable, find the probability that z lies between -2.41 and 0
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If z is a standard normal variable, find the probability that z lies between -2.41 and 0

User Jared Anderton
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It is about 0.49202 or 49.2%.
If z is a standard normal variable, find the probability that z lies between -2.41 and-example-1
User PaulTheCyclist
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4 votes

Answer: 0.4920238

Explanation:

Given: z is a standard normal variable.

We know that probability of z lies lies between two values a and b is given by :-


P(a<z<b)=P(z<b)-P(z<a)

Now, the probability that z lies between -2.41 and 0 is given by :-


P(-2.41<z<0)=P(z<0)-P(z<-2.41)\\\\\Rightarrow\ P(-2.41<z<0)=0.5-0.0079762=0.4920238 [By using z-table for standard normal distribution]

Hence, the probability that z lies between -2.41 and 0 = 0.4920238

User Hammer
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