2 (Median - Mean) = Mode - Mean . (True / False).

Median = 3 Mode - 2 Mean

The relationship between mean, median and mode for a moderately skewed distribution is (a) Mode = 2 Median – 3 Mean (b) Mode = Median – 2 Mean (c) Mode = 2 Median – Mean (d) Mode = 3 Median – 2 mean

The relationship between mean, median and mode for a moderately skewed distribution is (a) Mode = 2 Median – 3 Mean (b) Mode = Median – 2 Mean (c) Mode = 2 Median – Mean (d) Mode = 3 Median – 2 mean

i. Mean = a (3 median - mode) II. Mean - Mode = b(Mean - Median) (iii) Median = Mode + c (Mean - mode)

i. Mean = a (3 median - mode) II. Mean - Mode = b(Mean - Median) (iii) Median = Mode + c (Mean - mode)

One of the methods of determining mode is (a) Mode = 2 Median – 3 Mean (b) Mode = 2 Median + 3 Mean (c) Mode = 3 Median – 2 Mean (d) Mode = 3 Median + 2 Mean

One of the methods of determining mode is (a) Mode = 2 Median – 3 Mean (b) Mode = 2 Median + 3 Mean (c) Mode = 3 Median – 2 Mean (d) Mode = 3 Median + 2 Mean

For a frequency distribution, mean, median and mode are connected by the relation (a) Mode = 3 Mean – 2 median (b) Mode = 2 Median – 3 Mean (c) Mode = 3 Median – 2 Mean (d) Mode = 3 Median + 2 Mean

For a frequency distribution, mean, median and mode are connected by the relation (a) Mode = 3 Mean – 2 median (b) Mode = 2 Median – 3 Mean (c) Mode = 3 Median – 2 Mean (d) Mode = 3 Median + 2 Mean

For the set of numbers 2, 2, 4, 5 and 12, which of the following statements is true? Mean = Median (b) Mean > Mode Mean < Mode (d) Mode=Median