QUESTION IMAGE
Question
- using the following informal histogram, calculate each of the following.
a. ( n )
b. ( sigma x )
c. ( sigma x^2 )
Response
Part a: Calculating \( n \)
Step 1: Identify frequencies for each \( X \)
For \( X = 1 \), frequency \( f = 1 \); \( X = 2 \), \( f = 3 \); \( X = 3 \), \( f = 3 \); \( X = 4 \), \( f = 4 \); \( X = 5 \), \( f = 2 \); \( X = 6 \), \( f = 1 \).
Step 2: Sum the frequencies
\( n=\sum f = 1 + 3 + 3 + 4 + 2 + 1 \)
\( n = 14 \)
Part b: Calculating \( \sum X \)
Step 1: Multiply each \( X \) by its frequency
- \( X = 1 \): \( 1\times1 = 1 \)
- \( X = 2 \): \( 2\times3 = 6 \)
- \( X = 3 \): \( 3\times3 = 9 \)
- \( X = 4 \): \( 4\times4 = 16 \)
- \( X = 5 \): \( 5\times2 = 10 \)
- \( X = 6 \): \( 6\times1 = 6 \)
Step 2: Sum these products
\( \sum X=1 + 6 + 9 + 16 + 10 + 6 \)
\( \sum X = 48 \)
Part c: Calculating \( \sum X^2 \)
Step 1: Calculate \( X^2 \) for each \( X \) and multiply by frequency
- \( X = 1 \): \( 1^2\times1 = 1\times1 = 1 \)
- \( X = 2 \): \( 2^2\times3 = 4\times3 = 12 \)
- \( X = 3 \): \( 3^2\times3 = 9\times3 = 27 \)
- \( X = 4 \): \( 4^2\times4 = 16\times4 = 64 \)
- \( X = 5 \): \( 5^2\times2 = 25\times2 = 50 \)
- \( X = 6 \): \( 6^2\times1 = 36\times1 = 36 \)
Step 2: Sum these products
\( \sum X^2=1 + 12 + 27 + 64 + 50 + 36 \)
\( \sum X^2 = 190 \)
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s:
a. \( \boldsymbol{n = 14} \)
b. \( \boldsymbol{\sum X = 48} \)
c. \( \boldsymbol{\sum X^2 = 190} \)