Question 1136120
you can use the normal distribution tables or you can use a normal distribution calculator that looks up the values for you and gives you a more accurate answer.


i would recommend using a calculator unless you absolutely have to use the tables.


one of the online calculators i use for this purpose can be found at <a href = "https://stattrek.com/online-calculator/normal.aspx" target ="_blank">https://stattrek.com/online-calculator/normal.aspx</a>


the fields in this calculator are shown below.


<img src = "http://theo.x10hosting.com/2019/030601.jpg" alt="$$$" >


i will refer to them, from top to bottom, as the x field, the p field, the m field, and the s field.


to solve your first problem, enter 900 in the x field and leave the p field blank and enter 1000 in the m field and 750 in the s field.


hit the calculate button and the calculator will tell you that the area to the left of 900 is equal to .447.


that's the probability that the life of a rndomly chosen bulb will be less than 900 if the mean is 1000 and the standard deviation is 750.


<img src = "http://theo.x10hosting.com/2019/030602.jpg" alt="$$$" >


to solve your second problem, you need to find the area to the left of 950 and the area to the left of 1000 and subtract the smaller area from the larger area to get the area in between.


to get the area to the left of 950, you set x to 950 and clear p and set m to 1000 and s to 750.


click on calculate and the calculator will tell you that the area to the left of 950 is equal to .473


<img src = "http://theo.x10hosting.com/2019/030603.jpg" alt="$$$" >


to get the area to the left of 1000, you set x to 1000 and clear p and m to 1000 and s to 750.


click on calculate and the calculator will tell you that the area to the left of 1000 is equal to .5.


subtract the smaller area from the larger area to get .5 minus .473 = ..027.


that's the probability that the life of a randomly chosen bulb will be between 950 and 1000 hours.


<img src = "http://theo.x10hosting.com/2019/030604.jpg" alt="$$$" >


to find the standard deviation that will tell you that the area to the left of 916 is .2, you set the x field to 916 and the p field to .2 and the m field to 1000 and clear the s field.


click on calculate and the calculator will tell you that the standard deviation needs to be 99.80736789.


when the mean is 1000 and the standard deviation is 99.80736789, the probability that the life or a randomly chosen bulb will be less than 916 hours is .20.


<img src = "http://theo.x10hosting.com/2019/030605.jpg" alt="$$$" >


to determine how many lamps are involved, you multiply the probability by the total number of bulbs.


the number of bulbs with a life less than 900 will be equal to .447 * 5000 = 2235.


the number of bulbs with a life between 950 and 1000 hours will be equal to .027 * 5000 = 135.


the number of bulbs with a life less than 916 when the standard deviation is equal to 99.80736789 will be .2 * 5000 = 1000.