Question

Find the mean, variance and standard deviation for the data:

 227, 235, 255, 269, 292, 299, 312, 321, 333, 348.

Answer 1

 227,235,255,269,292,299,312,321,333,348,

\[\text{ Mean } = \frac{227 + 235 + 255 + 269 + 292 + 299 + 312 + 321 + 333 + 348}{10}\]

\[ = \frac{2891}{10} = 289 . 1\]

\[x_i\]	\[\left( x_i - X \right) = \left( x_i - 289 . 1 \right)\]	\[\left( x_i - X \right)^2\]
227	− 62.1	3856.41
235	− 54.1	2926.81
255	− 34.1	1162.81
269	− 20.1	404.01
292	2.9	8.41
299	9.9	98.01
312	22.9	524.41
321	31.9	1017.61
333	43.9	1927.21
348	58.9	3469.21
		\[\sum^{10}_{i = 1} \left( x_i - \bar{x} \right)^2 = 15394 . 9\]

n = 10

\[n = 10\]

\[ \therefore \text{ Variance }  \left( X \right) = \frac{\sum^{10}_{i = 1} \left( x_i - \bar{X} \right)^2}{n} \]

\[ = \frac{15394 . 9}{10} \]

\[ = 1539 . 49\]

\[\text{ Standard deviation } = \sqrt{\text{ Variance } \left( X \right)} \]

\[ = \sqrt{1539 . 49} \]

\[ = 39 . 24\]