Kuswanto 2011. Ukuran keragaman Dari tiga ukuran pemusatan, belum dapat memberikan deskripsi yang lengkap bagi suatu data. Dari tiga ukuran pemusatan,

Slides:



Advertisements
Presentasi serupa
Kuswanto, Sebaran Peluang kontinyu  Sebagian besar kegiatan di alam ini mengikuti sebaran kontinyu  Salah satu sebaran kontinyu adalah sebaran.
Advertisements

Kuswanto Ukuran Pemusatan Data Kuswanto-2007.
Sebaran peluang kontinyu
Learning Medium School : SMPN 1 Gotham City Subject : English
KUSWANTO, SUB POKOK BAHASAN Mata kuliah dan SKS Manfaat Deskripsi Tujuan instruksional umum Pokok bahasan.
Common Effect Model.
5. Ukuran Sebaran (keragaman)
Korelasi Linier KUSWANTO Korelasi Keeratan hubungan antara 2 variabel yang saling bebas Walaupun dilambangkan dengan X dan Y namun keduanya diasumsikan.
© 2002 Prentice-Hall, Inc.Chap 3-1 Bab 3 Pengukuran.
Pertemuan 02 Ukuran Numerik Deskriptif
Kuswanto Segugus data Gugus data  Tidak ada informasi ??? Perlu ada karakteristik yang mencirikan gugus data tsb - Ukuran pemusatan – sebuah nilai.
1 Pertemuan 02 Ukuran Pemusatan dan Lokasi Matakuliah: I Statistika Tahun: 2008 Versi: Revisi.
Kuswanto Ukuran Pemusatan Data.
Ruang Contoh dan Peluang Pertemuan 05
Pendugaan Parameter Proporsi dan Varians (Ragam) Pertemuan 14 Matakuliah: L0104 / Statistika Psikologi Tahun : 2008.
1 Pertemuan 03 dan 04 Ukuran Variasi Matakuliah: I Statistika Tahun: 2008 Versi: Revisi.
UKURAN PENYEBARAN DATA
Appropriate Measures of Central Tendency Nominal variables Mode Ordinal variables Median Interval level variables Mean - If the distribution is normal.
Population and sample. Population is complete actual/theoretical collection of numerical values (scores) that are of interest to the researcher. Simbol.
1 Pertemuan 10 Fungsi Kepekatan Khusus Matakuliah: I0134 – Metode Statistika Tahun: 2007.
Pertemuan 03 Ukuran Penyimpangan (Variasi)
PENDUGAAN PARAMETER Pertemuan 7
Pertemuan 07 Peluang Beberapa Sebaran Khusus Peubah Acak Kontinu
HAMPIRAN NUMERIK SOLUSI PERSAMAAN NIRLANJAR Pertemuan 3
MULTIPLE REGRESSION ANALYSIS THE THREE VARIABLE MODEL: NOTATION AND ASSUMPTION 08/06/2015Ika Barokah S.
DISTRIBUSI PROBABILITA KONTINU
1 HAMPIRAN NUMERIK SOLUSI PERSAMAAN LANJAR Pertemuan 5 Matakuliah: K0342 / Metode Numerik I Tahun: 2006 TIK:Mahasiswa dapat meghitung nilai hampiran numerik.
Sebaran Peluang Kontinu (II) Pertemuan 8 Matakuliah: I0014 / Biostatistika Tahun: 2008.
9.3 Geometric Sequences and Series. Objective To find specified terms and the common ratio in a geometric sequence. To find the partial sum of a geometric.
Ukuran Pemusatan dan Lokasi Pertemuan 03 Matakuliah: L0104 / Statistika Psikologi Tahun : 2008.
Smoothing. Basic Smoothing Models Moving average, weighted moving average, exponential smoothing Single and Double Smoothing First order exponential smoothing.
Ukuran Penyimpangan atau Disversi Pertemuan 04
PROBABILITY DISTRIBUTION
STATISTIKA CHATPER 4 (Perhitungan Dispersi (Sebaran))
07/11/2017 BARISAN DAN DERET KONSEP BARISAN DAN DERET 1.
Cartesian coordinates in two dimensions
Cartesian coordinates in two dimensions
Matakuliah : I0014 / Biostatistika Tahun : 2005 Versi : V1 / R1
Pengujian Hipotesis (I) Pertemuan 11
Matakuliah : I0014 / Biostatistika Tahun : 2005 Versi : V1 / R1
Regresi.
Presentasi Statistika Dasar
BY EKA ANDRIANI NOVALIA RIZKANISA VELA DESTINA
VECTOR VECTOR IN PLANE.
PENDUGAAN PARAMETER Pertemuan 8
DISTRIBUSI PROBABILITA
Two-and Three-Dimentional Motion (Kinematic)
Pendugaan Parameter (II) Pertemuan 10
REAL NUMBERS EKSPONENT NUMBERS.
STATISTIK 1 Pertemuan 5,6: Ukuran Pemusatan dan Penyebaran
VARIABEL ACAK (RANDOM VARIABLES)
CENTRAL TENDENCY Hartanto, SIP, MA Ilmu Hubungan Internasional
Fungsi Kepekatan Peluang Khusus Pertemuan 10
Manajemen Proyek Perangkat Lunak (MPPL)
Pertemuan 05 Ukuran Deskriptif Lain
Master data Management
Magnitude and Vector Physics 1 By : Farev Mochamad Ihromi / 010
Pertemuan 21 dan 22 Analisis Regresi dan Korelasi Sederhana
Ukuran Akurasi Model Deret Waktu Manajemen Informasi Kesehatan
STATISTIK “Hypothesis Testing”
How You Can Make Your Fleet Insurance London Claims Letter.
How Can I Be A Driver of The Month as I Am Working for Uber?
How the Challenges Make You A Perfect Event Organiser.
Don’t Forget to Avail the Timely Offers with Uber
Take a look at these photos.... Also, in case you're wondering where this hotel is, it isn't a hotel at all. It is a house! It's owned by the family of.
THE INFORMATION ABOUT HEALTH INSURANCE IN AUSTRALIA.
Lesson 2-1 Conditional Statements 1 Lesson 2-1 Conditional Statements.
Right, indonesia is a wonderful country who rich in power energy not only in term of number but also diversity. Energy needs in indonesia are increasingly.
Website: Website Technologies.
Draw a picture that shows where the knife, fork, spoon, and napkin are placed in a table setting.
Transcript presentasi:

Kuswanto 2011

Ukuran keragaman Dari tiga ukuran pemusatan, belum dapat memberikan deskripsi yang lengkap bagi suatu data. Dari tiga ukuran pemusatan, belum dapat memberikan deskripsi yang lengkap bagi suatu data. Perlu juga diketahui seberapa jauh pengamatan- pengamatan tersebut menyebar dari rata-ratanya. Perlu juga diketahui seberapa jauh pengamatan- pengamatan tersebut menyebar dari rata-ratanya. Ada kemungkinan diperoleh rata-rata dan median yang sama, namun berbeda keragamannya. Ada kemungkinan diperoleh rata-rata dan median yang sama, namun berbeda keragamannya. Beberapa ukuran keragaman yang sering kita temui adalah range (rentang=kisaran=wilayah), simpangan (deviasi), varian (ragam), simpangan baku (standar deviasi) dan koefisien keragaman. Beberapa ukuran keragaman yang sering kita temui adalah range (rentang=kisaran=wilayah), simpangan (deviasi), varian (ragam), simpangan baku (standar deviasi) dan koefisien keragaman.

Measures of Dispersion and Variability These are measurements of how spread the data is around the center of the distribution f X f X

2. DEVIATION  DEVIASI = SIMPANGAN You could express dispersion in terms of deviation from the mean, however, a sum of deviations from the mean will always = 0. i.e.  (X i - X) = 0 So, take an absolute value to avoid this Problem – the more numbers in the data set, the higher the SS

1.Range  Kisaran = Rentang difference between lowest and highest numbers Place numbers in order of magnitude, then range = X n - X 1. Range = = = X 1 = X 2 = X 3 = X 4 = X 5 Problem - no information about how clustered the data is

Sample mean deviation =  | X i - X | n Essentially the average deviation from the mean 3. Mean Deviation = Simpangan Rerata 4. Variance = Ragam Sample SS =  (X i - X) 2 = SS is much more common than mean deviation Another way to get around the problem of zero sums is to square the deviations. Known as sum of squares or SS  Xi 2 - (  Xi) 2 /n

Example = X 1 = X 2 = X 3 = X 4 = X 5 X = 3.2 Sample SS =  (X i - X) 2 SS = ( ) 2 + ( ) 2 + ( ) 2 + ( ) 2 + (5 -3.2) 2 = = 6.8 Problem – the more numbers in the data set, the higher the SS

The mean SS is known as the variance Population Variance (  2 ):  2 =  (X i -  ) 2 N This is just SS N Problem - units end up squared Our best estimate of  2 is sample variance (s 2 ): S 2 =  (X i - X) 2 n - 1 Note : divide by n-1 known as degrees of freedom  Xi 2 - (  Xi) 2 /n n - 1 =

5. Standard Deviation (Standar Deviasi) => square root of variance  =  (X i -  ) 2 N For a population: For a sample: s =  (X i - X ) 2 n - 1  =  2 s = s 2

Example = X 1 = X 2 = X 3 = X 4 = X 5 X = 3.2 s =  (X i - X ) 2 n - 1 s = ( ) 2 + ( ) 2 + ( ) 2 + ( ) 2 + (5 -3.2) = =

6. Coefficient of Variation = Koefisien Keragaman = KK (V or sometimes CV ): CV = s X Variance (s 2 ) and standard deviation (s) have magnitudes that are dependent on the magnitudes of the data. The coefficient of variation is a relative measure, so variability of different sets of data may be compared (stdev relative to the mean) Note that there are no units – emphasizes that it is a relative measure Sometimes expressed as a % X 100%

Example: = X 1 = X 2 = X 3 = X 4 = X 5 s = g CV = s X X = 3.2 g CV = g 3.2 g CV = or CV = 40.75% (X 100%) Attention  there is not any UNIT, or %

8. The Normal Distribution (Distribusi Normal) : There is an equation which describes the height of the normal curve in relation to its standard dev (  ) X  22 33 22 33 68.27% 95.44% 99.73% f

ƒ μ = 0 Normal distribution with σ = 1, with varying means μ = 1 μ = 2 5 If you get difficulties to keep this term, read statistics books

ƒ σ = 1 σ = 1.5 σ = 2 Normal distribution with μ = 0, with varying standard deviations

9. Symmetry and Kurtosis Symmetry means that the population is equally distributed around the mean i.e. the curve to the right side of the mean is a mirror image of the curve to the left side ƒ Mean, median and mode

Data may be positively skewed (skewed to the right) Symmetry ƒ ƒ Or negatively skewed (skewed to the left) So direction of skew refers to the direction of longer tail

Symmetry ƒ mode median mean

ƒ Kurtosis refers to how flat or peaked a curve is (sometimes referred to as peakedness or tailedness) The normal curve is known as mesokurtic ƒ A more peaked curve is known as leptokurtic A flatter curve is known as platykurtic

Latihan dan diskusi 1. Banyaknya buah pisang yang tersengat hama dari 16 tanaman adalah 4, 9, 0, 1, 3, 24, 12, 3, 30, 12, 7, 13, 18, 4, 5, dan 15. Dengan menganggap data tersebut sebagai contoh, hitunglah varian, simpangan baku dan koefisien keragamannya. Statistik mana yang paling tepat untuk menggambarkan keragaman data tersebut? 2. To study how first-grade students utilize their time when assigned to a math task, researcher observes 24 student and records their time off task out of 20 minutes. Times off task (minutes) : 4, 0, 2, 2, 4, 1, 4, 6, 9, 7, 2, 7, 5, 4,13, 7, 7, 10, 10, 0, 5, 3, 9 and 8. For this data set, find : a) Mean and standard deviation, media and range b) Disply the data in the histogram plot, dot diagram and also stem-and-leaf diagram c) Determine the intervals  x ± s,  x ± 2s,  x ± 3s d) Find the proportion of the meausurements that lie in each of this intervals. e) Compare your finding with empirical guideline of bell-shaped distribution

3. The data below were obtained from the detailed record of purchases over several month. The usage vegetables (in weeks) for a household taken from consumer panel were (gram) : a. Plot a histogram of the data! a. Plot a histogram of the data! b. Find the relative frequency of the usage time that did not exceed 80. b. Find the relative frequency of the usage time that did not exceed 80. c. Calculate the mean, variance and the standard deviation c. Calculate the mean, variance and the standard deviation d. Calculate the median and quartiles. d. Calculate the median and quartiles. 4. The mean of corn weight is 278 g by ear and deviation standard is 9,64 g, and than we have 10 ears. If they are gotten from ten different fields, mean of plant height is Rp. 1200,- and its deviation standard is Rp 90,-, which one have more homogenous, the weight of corn ear or the plant height? Explain your answer! Verify your results by direct calculation with the other data.

5. The employment’s salary at seed company, abbreviated, as follows : 18, 15, 21, 19, 13, 15, 14, 23, 18 and 16 rupiah. If these abbreviation is real salary divide Rp ,-, find the mean, variance and deviation standard of them. 6. Computer-aided statistical calculations. Calculation of the descriptive statistic such as  x and s are increasingly tedious with large data sets. Modern computers have come a long way in alleviating the drudgery of hand calculation. Microsoft Exel, Minitab or SPSS are three of computing packages those are easy accessible to student because its commands are in simple English. Find these programs and install its at your computers. Bellow main and sub menu of Microsoft Exel, Minitab and SPSS program. Use these software to find  x, s, s 2, and coefisien of variation (CV) for data set in exercise b. Histogram and another illustration can also be created.

7. Some properties of the standard deviation a) if a fixed number c is added to all measurements in a data set, will the deviations (x i -  x) remain changed? And consequently, will s² and s remain changed, too? Take data sample. b) If all measurements in a data set are multiplied by a fixed number d, the deviation (x i -  x) get multiplied by d. Is it right? What about the s² and s? Take data sample. c) Apply your computer software to explain your data sample. Verify your results by other data.