Answer:
Part 1: 1.5492
Part 2: 0.0035
Part 3: 0.0173
Part 4: 0.8358
Step-by-step explanation:
Number of cases, n = 15
Probability they can be resolved same day = 0.8 [p=0.8]
Part 1:
What is the Standard Deviation?
The formula is [tex]SD=\sqrt{np(1-p)}[/tex]
Plugging in we get:
[tex]SD=\sqrt{np(1-p)} \\SD=\sqrt{(15)(0.8)(1-0.8)}\\ SD=1.5492[/tex]
Standard Deviation is 1.5492
Part 2:
What is the probability 7 of the problems can be resolved today?
Since this is binomial probability, the formula is:
[tex]P(x=r)=nCr*p^{r}*(1-p)^{n-r}[/tex]
Here, r = 7, so we plug in what we know and get out answer:
[tex]P(x=r)=nCr*p^{r}*(1-p)^{n-r}\\P(x=7)=15C7*(0.8)^{7}*(1-0.8)^{15-7}\\P(x=7)=0.0035[/tex]
THe probability is 0.0035
Part 3:
"OR" in probability means "+", so we add
P(x=7) + P(x=8)
We already know P(x=7), we just find P(x=8) now.
Replacing r = 7 with r = 8 into the formula above, we get:
[tex]P(x=8)=15C8*(0.8)^{8}*(1-0.8)^{15-8}\\P(x=8)=0.0138[/tex]
The probability is 0.0138
Hence P(x=7) + P(x=8) = 0.0035 + 0.0138 = 0.0173
Part 4:
More than 10 problems means P(x=11) + P(x=12) +....P(x=15)
we have to plug in 11,12,13,14,15 into r of the formula individually and find each and sum them.
The same process.
Basically it is going to be:
P(x>10) = P(x=11) + P(x=12) + P(x=13) + P(x=14) + P(x=15)
The answer after substituting and summing would be 0.8358 [using binomial calculator and table for ease]
