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Page 1 Measures of Central Tendency (Mean, Median, Quartiles & Mode) Exercise 24A Question 1. Find the mean of the following set of numbers: (i) 6, 9, 11, 12 and 7 (ii) 11, 14, 23, 26, 10, 12, 18 and 6 Solution: Question 2. Marks obtained (in mathematics) by 9 student are given below: 60, 67, 52, 76, 50, 51, 74, 45 and 56 (a) find the arithmetic mean (b) if marks of each student be increased by 4; what will be the new value of arithmetic mean. Page 2 Measures of Central Tendency (Mean, Median, Quartiles & Mode) Exercise 24A Question 1. Find the mean of the following set of numbers: (i) 6, 9, 11, 12 and 7 (ii) 11, 14, 23, 26, 10, 12, 18 and 6 Solution: Question 2. Marks obtained (in mathematics) by 9 student are given below: 60, 67, 52, 76, 50, 51, 74, 45 and 56 (a) find the arithmetic mean (b) if marks of each student be increased by 4; what will be the new value of arithmetic mean. Solution: Question 3. Find the mean of the natural numbers from 3 to 12. Solution: Question 4. (a) Find the mean of 7, 11, 6, 5, and 6 (b) If each number given in (a) is diminished by 2, find the new value of mean. Solution: Question 5. If the mean of 6, 4, 7, ‘a’ and 10 is 8. Find the value of ‘a’ Page 3 Measures of Central Tendency (Mean, Median, Quartiles & Mode) Exercise 24A Question 1. Find the mean of the following set of numbers: (i) 6, 9, 11, 12 and 7 (ii) 11, 14, 23, 26, 10, 12, 18 and 6 Solution: Question 2. Marks obtained (in mathematics) by 9 student are given below: 60, 67, 52, 76, 50, 51, 74, 45 and 56 (a) find the arithmetic mean (b) if marks of each student be increased by 4; what will be the new value of arithmetic mean. Solution: Question 3. Find the mean of the natural numbers from 3 to 12. Solution: Question 4. (a) Find the mean of 7, 11, 6, 5, and 6 (b) If each number given in (a) is diminished by 2, find the new value of mean. Solution: Question 5. If the mean of 6, 4, 7, ‘a’ and 10 is 8. Find the value of ‘a’ Solution: No. of terms = 5 Mean = 8 Sum of numbers = 8 x 5 = 40 .(i) But, sum of numbers = 6+4+7+a+10 = 27+a ..(ii) From (i) and (ii) 27+a = 40 a = 13 Question 6. The mean of the number 6, ‘y’, 7, ‘x’ and 14 is 8. Express ‘y’ in terms of ‘x’. Solution: No. of terms = 5 and mean = 8 Sum of numbers = 5 x 8 = 40 ..(i) but sum of numbers = 6+y+7+x+14 = 27+y+x .(ii) from (i) and (ii) 27 + y + x = 40 x + y = 13 y = 13 – x Question 7. Solution: Page 4 Measures of Central Tendency (Mean, Median, Quartiles & Mode) Exercise 24A Question 1. Find the mean of the following set of numbers: (i) 6, 9, 11, 12 and 7 (ii) 11, 14, 23, 26, 10, 12, 18 and 6 Solution: Question 2. Marks obtained (in mathematics) by 9 student are given below: 60, 67, 52, 76, 50, 51, 74, 45 and 56 (a) find the arithmetic mean (b) if marks of each student be increased by 4; what will be the new value of arithmetic mean. Solution: Question 3. Find the mean of the natural numbers from 3 to 12. Solution: Question 4. (a) Find the mean of 7, 11, 6, 5, and 6 (b) If each number given in (a) is diminished by 2, find the new value of mean. Solution: Question 5. If the mean of 6, 4, 7, ‘a’ and 10 is 8. Find the value of ‘a’ Solution: No. of terms = 5 Mean = 8 Sum of numbers = 8 x 5 = 40 .(i) But, sum of numbers = 6+4+7+a+10 = 27+a ..(ii) From (i) and (ii) 27+a = 40 a = 13 Question 6. The mean of the number 6, ‘y’, 7, ‘x’ and 14 is 8. Express ‘y’ in terms of ‘x’. Solution: No. of terms = 5 and mean = 8 Sum of numbers = 5 x 8 = 40 ..(i) but sum of numbers = 6+y+7+x+14 = 27+y+x .(ii) from (i) and (ii) 27 + y + x = 40 x + y = 13 y = 13 – x Question 7. Solution: Question 8. If 69.5 is the mean of 72, 70, ‘x’, 62, 50, 71, 90, 64, 58 and 82, find the value of ‘x’. Solution: No. of terms = 10 Mean = 69.5 Sum of the numbers = 69.5 x 10 = 695 ……….(i) But sum of numbers = 72+70+x+62+ 50+71+90+64+58+82 = 619 + x ……(ii) from (i) and (ii) 619 + x = 695 x = 76 Question 9. Solution: Page 5 Measures of Central Tendency (Mean, Median, Quartiles & Mode) Exercise 24A Question 1. Find the mean of the following set of numbers: (i) 6, 9, 11, 12 and 7 (ii) 11, 14, 23, 26, 10, 12, 18 and 6 Solution: Question 2. Marks obtained (in mathematics) by 9 student are given below: 60, 67, 52, 76, 50, 51, 74, 45 and 56 (a) find the arithmetic mean (b) if marks of each student be increased by 4; what will be the new value of arithmetic mean. Solution: Question 3. Find the mean of the natural numbers from 3 to 12. Solution: Question 4. (a) Find the mean of 7, 11, 6, 5, and 6 (b) If each number given in (a) is diminished by 2, find the new value of mean. Solution: Question 5. If the mean of 6, 4, 7, ‘a’ and 10 is 8. Find the value of ‘a’ Solution: No. of terms = 5 Mean = 8 Sum of numbers = 8 x 5 = 40 .(i) But, sum of numbers = 6+4+7+a+10 = 27+a ..(ii) From (i) and (ii) 27+a = 40 a = 13 Question 6. The mean of the number 6, ‘y’, 7, ‘x’ and 14 is 8. Express ‘y’ in terms of ‘x’. Solution: No. of terms = 5 and mean = 8 Sum of numbers = 5 x 8 = 40 ..(i) but sum of numbers = 6+y+7+x+14 = 27+y+x .(ii) from (i) and (ii) 27 + y + x = 40 x + y = 13 y = 13 – x Question 7. Solution: Question 8. If 69.5 is the mean of 72, 70, ‘x’, 62, 50, 71, 90, 64, 58 and 82, find the value of ‘x’. Solution: No. of terms = 10 Mean = 69.5 Sum of the numbers = 69.5 x 10 = 695 ……….(i) But sum of numbers = 72+70+x+62+ 50+71+90+64+58+82 = 619 + x ……(ii) from (i) and (ii) 619 + x = 695 x = 76 Question 9. Solution: Question 10. Solution:Read More
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