Answer:
Given the quantitative data, the five classes would be:
Number of data given, n = 20
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100 to 150:
Frequency = 1
Cumulative frequency = 1
Relative frequency [tex] = \frac{1}{20} = 0.05 [/tex]
Cumulative relative frequency [tex] = \frac{1}{20} = 0.05 [/tex]
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150 to 200:
Frequency = 0
Cumulative frequency = 0 + previous cumulative frequency = 0 + 1 = 1
Relative frequency = 0
Cumulative relative frequency [tex] = \frac{1}{20} = 0.05 [/tex]
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200 to 250:
Frequency = 8
Cumulative frequency = 9 + previous cumulative frequency = 8 + 1 = 9
Relative frequency [tex] = \frac{8}{20} = 0.4 [/tex]
Cumulative relative frequency [tex] = \frac{9}{20} = 0.45 [/tex]
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250 to 300:
Frequency = 9
Cumulative frequency = 9 + previous cumulative frequency = 9 + 9 = 18
Relative frequency [tex] = \frac{9}{20} = 0.45 [/tex]
Cumulative relative frequency [tex] = \frac{18}{20} = 0.9 [/tex]
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300 to 350:
Frequency = 2
Cumulative frequency = 2 + previous Cumulative frequency = 2 + 18 = 20
Relative frequency [tex] = \frac{2}{20} = 0.1 [/tex]
Cumulative relative frequency [tex] = \frac{20}{20} = 1 [/tex]
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