Statistics — RBSE Class 10 (Mathematics)
A teacher has the marks of 60 students spread across class intervals 0–10, 10–20, and so on. What single number best represents the class? Is it the average, the most common band, or the middle student? This chapter gives you all three — mean, mode and median — for grouped data, where you no longer have the individual values, only how many fall in each interval.
1. From raw data to grouped data
When there are many observations, we organise them into class intervals with frequencies (how many values fall in each interval). The trade-off: organisation makes patterns visible, but we lose the exact values — so we work with the class mark (midpoint) of each interval:
2. Mean of grouped data — three methods
(a) Direct method
Multiply each class mark by its frequency , add up, divide by the total frequency. Simple, but the arithmetic gets heavy when are large.
(b) Assumed-mean method
Pick a convenient class mark as the assumed mean a, and work with deviations :
The numbers are smaller, so the computation is lighter. The mean does not depend on which a you pick — choosing one near the centre just keeps the deviations small.
(c) Step-deviation method
If all class sizes are equal to h, scale the deviations: .
This is the lightest of the three and the one to prefer in the exam when class widths are equal.
All three methods give exactly the same mean — they are just smarter bookkeeping. Choose based on the numbers in front of you.
3. Mode of grouped data
The mode is the value that occurs most often. For grouped data we first find the modal class (the interval with the highest frequency), then:
where
- = lower limit of the modal class,
- = frequency of the modal class,
- = frequency of the class before it,
- = frequency of the class after it,
- = class size.
4. Median of grouped data
The median is the middle value when data are arranged in order — it splits the data into two equal halves. For grouped data, build a cumulative frequency (cf) column, find (where n = total frequency), locate the median class (the first class whose cf ≥ n/2), then:
where
- = lower limit of the median class,
- = cumulative frequency of the class before the median class,
- = frequency of the median class,
- = class size.
The median is unaffected by extreme values, which makes it the fairest "typical value" for skewed data (like incomes).
5. The empirical relationship
For a moderately skewed distribution, the three measures are tied together by:
equivalently Mode = 3 Median − 2 Mean. If a question gives any two of the three, you can estimate the third — a frequently-asked 1–2 mark shortcut.
6. Closing thought
Three "averages", three jobs:
- Mean — the balance point; uses every value; best when data are symmetric. Compute it the light way (step-deviation when class widths are equal).
- Mode — the most frequent; best for "what is most common" questions.
- Median — the middle; resistant to outliers; best for skewed data.
The skill the RBSE board tests is setting up the table correctly — the class marks, the or cumulative-frequency columns — and then plugging into the right formula. Lay the table out neatly, identify the modal/median class without rushing, and the marks follow. This chapter also sets up the ogive and probability work that follow, and the descriptive statistics you'll meet again in Class 11.
