# CBSE Class 10 Mathematics/Statistics/MCQ

**CBSE Class 10 Mathematics/Statistics/MCQ is about the Model Questions that you can expect for Yearly Examination. Here you can find out practice problems for Class 10 Mathematics.**

**CBSE Class 10 Mathematics/Statistics – Chapter 14/MCQMultiple Choice Questions/Expected Model QuestionsChoose the correct answer from the options given below:**

**For the class 10 – 25, the class mark is —————**

A. 15

B. 17.5

C. 20**3 Median = Mode + ————**

A. Mean

B. 2 Mean

C. 3 Mean**In a frequency distribution, the mean and median are 50 and 58 then its mode is ————-**

A. 74

B. 124

C. 108**The median and mode respectively of a frequency distribution are 48 and 50. Then its mean is ————**

A. 47

B. 94

C. 98**The x coordinate of the point of intersection of two ogives gives ————-**

A. Mode

B. Mean

C. Median**If the point of intersection of two ogives is (3, 5), then find the value of median?**

A. 3

B. 5

C. 8**If the arithmetic mean of x, x+1 and x+2 is 24, the value of x is ———**

A. 22

B. 23

C. 24**The median of the data 23, 25, 27, 29, 30 and 33 is ——-**

A. 27

B. 28

C. 28.5**The class interval of a given observation is 20-25, and then the class mark will be ————**

A. 20.5

B. 21.5

C. 22.5**The frequency obtained by adding the frequencies of all the classes preceding the given class is ———-**

A. Class interval

B. Class Mark

C. Cumulative Frequency**The maximum frequent value is ———–**

A. Mean

B. Median

C. Mode**The empirical relationship between the three measures of central tendency is ———–**

A. 3 Median = Mode + 2Mean

B. 3 Median = 2Mode + Mean

C. Median = 2 Mode + 3 Mean**——— cannot be determined graphically.**

A. Mean

B. Median

C. Mode**Find the mean of first five prime numbers?**

A. 5.4

B. 5.5

C. 5.6**The mean of first five multiples of 5 is ———**

A. 15

B. 25

C. 35

**Answers:**

**17.5****2 Mean****74****47****Median****3****23****28****22.5****Cumulative Frequency****Mode****3 Median = Mode + 2 Mean****Mean****5.6****25**