The z-score
IStatistica Pro 2.1.1 Description. IStatistica Pro lets you overview your battery statistics, realtime informations about CPU, RAM usage and much more.Network statistics includes external, gateway and local IPs, speed and data rates chart. IStatistica Pro offers web-access to track CPU, Memory, Disk and Sensors statistics over local area network. FIBERGLAS™ Pipe Insulation Dimensional data 1 Pipe Size 1/2' 1' 1-1/2' 2' 2-1/2' 3' 3-1/2' 4' 4-1/2' 5' 5/8 CT 0.63 1.12 1.44 — — — — — — — 7/8 CT 1/2 0.50 1.00 1.56 2.06 — — — — — —. IStatistica 是一款Mac上优秀的系统监控工具,可以监控系统的状态,包括CPU、磁盘使用、内存使用,网速、电池等信息,支持菜单栏显示和通知中心工具,很不错! iStatistica-1.2.2-MAS.dmg.torrent (407 Bytes, 下载次数: 7).
The Standard Normal Distribution
Definition of the Standard Normal Distribution The Standard Normaldistribution follows a normal distribution and has mean 0 and standard deviation 1 |
Notice that the distribution is perfectly symmetric about 0.
If a distribution is normal but not standard, we can convert a value to the Standard normal distribution table by first by finding how many standard deviations away the number is from the mean.
The z-score
The number of standard deviations from the mean is called the z-score and can be found by the formula
- Solve your math problems using our free math solver with step-by-step solutions. Our math solver supports basic math, pre-algebra, algebra, trigonometry, calculus and more.
- 1.2 Vector Components.docx - Google Docs.
x - m
z =
s
Example
Find the z-score corresponding to a raw score of 132 from a normal distribution with mean 100 and standard deviation 15.
Solution
We compute
132 - 100
z = = 2.133
15
Example
A z-score of 1.7 was found from an observation coming from a normal distribution with mean 14 and standard deviation 3. Find the raw score.
Solution
We have
Yoink 3 5 7 seater. x - 14
1.7 =
3
To solve this we just multiply both sides by the denominator 3,
(1.7)(3) = x - 14
5.1 = x - 14
x = 19.1
The z-score and Area
Often we want to find the probability that a z-score will be less than a given value, greater than a given value, or in between two values. To accomplish this, we use the table from the textbook and a few properties about the normal distribution.
Example
Find
P(z < 2.37)
Solution
We use the table. Notice the picture on the table has shaded region corresponding to the area to the left (below) a z-score. This is exactly what we want. Below are a few lines of the table.
| z | .00 | .01 | .02 | .03 | .04 | .05 | .06 | .07 | .08 | .09 |
| 2.2 | .9861 | .9864 | .9868 | .9871 | .9875 | .9878 | .9881 | .9884 | .9887 | .9890 |
| 2.3 | .9893 | .9896 | .9898 | .9901 | .9904 | .9906 | .9909 | .9911 | .9913 | .9916 |
| 2.4 | .9918 | .9920 | .9922 | .9925 | .9927 | .9929 | .9931 | .9932 | .9934 | .9936 |
The columns corresponds to the ones and tenths digits of the z-score and the rows correspond to the hundredths digits. For our problem we want the row 2.3 (from 2.37) and the row .07 (from 2.37). The number in the table that matches this is.9911.
Hence
P(z < 2.37) = .9911
Example Voice input.
Find
P(z > 1.82)
Solution
In this case, we want the area to the right of 1.82. This is not what is given in the table. We can use the identity
P(z > 1.82) = 1 - P(z < 1.82)
reading the table gives
P(z < 1.82) = .9656
Our answer is
P(z > 1.82) = 1 - .9656 = .0344
Example
Find
P(-1.18 < z < 2.1)
Solution
Once again, the table does not exactly handle this type of area. However, the area between -1.18 and 2.1 is equal to the area to the left of 2.1 minus the area to the left of -1.18. That is
P(-1.18 < z < 2.1) = P(z < 2.1) - P(z < -1.18)
To find P(z < 2.1) we rewrite it as P(z < 2.10) and use the table to get
P(z < 2.10) = .9821.
Estatistica 1 2 2 Rubix
The table also tells us that
P(z < -1.18) = .1190
Now subtract to get
P(-1.18 < z < 2.1) = .9821 - .1190 = .8631
e-mail Questions and Suggestions
Can you prove that #1^2+2^2+3^2+.+n^2=1/6n(n+1)(2n+1)#?
2 Answers
Explanation:
#'using the method of 'color(blue)'proof by induction'#
#'this involves the following steps '#
#• ' prove true for some value, say n = 1'#
#• ' assume the result is true for n = k'#
Estatistica 1 2 2 Player Games
#• ' prove true for n = k + 1'#
#n=1toLHS=1^2=1#
#'and RHS ' =1/6(1+1)(2+1)=1#
#rArrcolor(red)'result is true for n = 1'#
#'assume result is true for n = k'#
#color(magenta)'assume ' 1^2+2^2+ . +k^2=1/6k(k+1)(2k+1)#
#'prove true for n = k + 1'#
Tidy up 4 1 19 download free. #1^2+2^2+.+k^2+(k+1)^2=1/6k(k+1)(2k+1)+(k+1)^2#
#=1/6(k+1)[k(2k+1)+6(k+1)]# https://bestwload700.weebly.com/more-hearts-free-slots.html.
#=1/6(k+1)(2k^2+7k+6)#
#=1/6(k+1)(k+2)(2k+3)#
#=1/6n(n+1)(2n+1)to' with ' n=k+1#
#rArrcolor(red)'result is true for n = k + 1'#
#rArr1^2+2^2+3^2+.+n^2=1/6n(n+1)(2n+1)#
Explanation:
Let, #S_n=1^2+2^2+3^2+.+n^2, &, , f(n)=n^3, n in NNuu{0}.#
#:. f(n)-f(n-1)=n^3-(n-1)^3.#
#because, a^3-b^3=(a-b)(a^2+ab+b^2), f(n)-f(n-1),#
#={n-(n-1)}{n^2+n(n-1)+(n-1)^2},#
The table also tells us that
P(z < -1.18) = .1190
Now subtract to get
P(-1.18 < z < 2.1) = .9821 - .1190 = .8631
e-mail Questions and Suggestions
Can you prove that #1^2+2^2+3^2+.+n^2=1/6n(n+1)(2n+1)#?
2 Answers
Explanation:
#'using the method of 'color(blue)'proof by induction'#
#'this involves the following steps '#
#• ' prove true for some value, say n = 1'#
#• ' assume the result is true for n = k'#
Estatistica 1 2 2 Player Games
#• ' prove true for n = k + 1'#
#n=1toLHS=1^2=1#
#'and RHS ' =1/6(1+1)(2+1)=1#
#rArrcolor(red)'result is true for n = 1'#
#'assume result is true for n = k'#
#color(magenta)'assume ' 1^2+2^2+ . +k^2=1/6k(k+1)(2k+1)#
#'prove true for n = k + 1'#
Tidy up 4 1 19 download free. #1^2+2^2+.+k^2+(k+1)^2=1/6k(k+1)(2k+1)+(k+1)^2#
#=1/6(k+1)[k(2k+1)+6(k+1)]# https://bestwload700.weebly.com/more-hearts-free-slots.html.
#=1/6(k+1)(2k^2+7k+6)#
#=1/6(k+1)(k+2)(2k+3)#
#=1/6n(n+1)(2n+1)to' with ' n=k+1#
#rArrcolor(red)'result is true for n = k + 1'#
#rArr1^2+2^2+3^2+.+n^2=1/6n(n+1)(2n+1)#
Explanation:
Let, #S_n=1^2+2^2+3^2+.+n^2, &, , f(n)=n^3, n in NNuu{0}.#
#:. f(n)-f(n-1)=n^3-(n-1)^3.#
#because, a^3-b^3=(a-b)(a^2+ab+b^2), f(n)-f(n-1),#
#={n-(n-1)}{n^2+n(n-1)+(n-1)^2},#
#=(1)(n^2+n^2-n+n^2-2n+1),#
# rArr f(n)-f(n-1)=n^3-(n-1)^3=3n^2-3n+1;(n in NNuu{0}.#
#n=1 rArr 1^3-0^3=3(1)^2-3(1)+1;#
#n=2 rArr 2^3-1^3=3(2)^2-3(2)+1;#
#n=3 rArr 3^3-2^3=3(2)^2-3(2)+1;#
#vdots vdots vdots vdots vdots vdots vdots vdots vdots vdots#
#n=n rArr n^3-(n-1)^3=3(n)^2-3(n)+1;#
Reel king slots. #'Adding, 'n^3-0^3=3{1^2+2^2+3^2+.+n^2}-3{1+2+3+.+n}+n,#
# :. n^3=3S_n-3Sigman+n, or, #
# n^3=3S_n-3/2n(n+1)+n, i.e.,#
#2n^3=6S_n-3n(n+1)+2n=6S_n-3n^2-3n+2n,# Itubedownloader 6 4 for mac free download.
# :. 2n^3+3n^2+n=6S_n,#
# :. 6S_n=n(2n^2+3n+1)=n(n+1)(2n+1),#
# rArr S_n=n/6(n+1)(2n+1).#
Enjoy Maths.!
Related questions
