Respuesta :
Answer:
a)P(exactly 2 bulb from watt)= 0.11
b)P=0.097
c)P=0.233
d)P=0.235
Explanation:
Total bulb = 22
13 watt bulb = 8
18 watt = 9
23 watt = 5
We have to select 3 bulb out of 22 bulb
We know that probability is the ratio of favor condition to the total condtion.
The total number of way to select 3 bulb out of 22 =N
[tex]N=_{3}^{22}\textrm{c}[/tex]
a)
[tex]P(exactly\ 2\ bulb\ from\ 23\ watt)= \dfrac{_{2}^{5}\textrm{c}._{1}^{17}\textrm{c}}{_{3}^{22}\textrm{c}}[/tex]
[tex]P(exactly\ 2\ bulb\ from\ 23\ watt)= \dfrac{170}{1540}[/tex]
P(exactly 2 bulb from watt)= 0.11
b)
The probability that all three of the bulbs have the same rating =P
[tex]P=\dfrac{_{3}^{5}\textrm{c}+_{3}^{8}\textrm{c}+_{3}^{9}\textrm{c}}{_{3}^{22}\textrm{c}}[/tex]
[tex]P= \dfrac{150}{1540}[/tex]
P=0.097
c)
The probability that one bulb of each type is selected=P
[tex]P=\dfrac{_{1}^{5}\textrm{c}._{1}^{8}\textrm{c}._{1}^{9}\textrm{c}}{_{3}^{22}\textrm{c}}[/tex]
[tex]P= \dfrac{360}{1540}[/tex]
P=0.233
d)
The probability that it is necessary to examine at least 6 bulbs =P
[tex]P=\dfrac{_{5}^{17}\textrm{c}}{_{5}^{22}\textrm{c}}[/tex]
[tex]P= \dfrac{6188}{26334}[/tex]
P=0.235
