15 గణాంకాలు
ఇతరత్రా వ్యాయామం
Question:
The mean and variance of eight observation are 9 and 9.25, respectively. If six of the observation are 6,7,10,12,12 and 13, find the remaining two observations.
Answer:
Step 1: Find the sum of the six observations. 6 + 7 + 10 + 12 + 12 + 13 = 60
Step 2: Find the sum of all eight observations. Sum of six observations (60) + sum of remaining two observations = 8 × mean (8 × 9)
Step 3: Solve for the sum of the remaining two observations. 8 × 9 - 60 = 24
Step 4: Find the variance of the eight observations. Variance = 9.25
Step 5: Find the variance of the six observations. Variance of six observations = (6 + 7 + 10 + 12 + 12 + 13)2 / 6 - (60)2 / 6 = (780) / 6 - (3600) / 6 = 130 - 600 = 470
Step 6: Find the variance of the remaining two observations. Variance of eight observations (9.25) - variance of six observations (470) = variance of remaining two observations (455.25)
Step 7: Find the mean of the remaining two observations. Mean of remaining two observations = √(variance of remaining two observations / 2) = √(455.25 / 2) = 21.25
Step 8: Find the remaining two observations. Remaining two observations = mean of remaining two observations (21.25) ± √(variance of remaining two observations / 2) = 21.25 ± √(455.25 / 2) = 21.25 ± 12.5 = 8.75 and 33.75
Question:
The mean and standard deviation of marks obtained by 50 students of a class in three subjects Mathematics, Physics and chemistry are given below : Subject Mathematics Physics Chemistry Mean 42 32 40.9 Standard deviation 12 15 20 Which of the three subjects shows the highest variability in marks and which shows the lowest ?
Answer:
Step 1: Examine the given data. The mean and standard deviation of marks obtained by 50 students of a class in three subjects Mathematics, Physics and Chemistry are given.
Step 2: Calculate the variability in marks for each subject. Variability can be calculated by taking the ratio of standard deviation to the mean.
Step 3: The variability in marks for Mathematics = 12/42 = 0.2857, for Physics = 15/32 = 0.46875 and for Chemistry = 20/40.9 = 0.4912.
Step 4: Compare the variabilities. The subject with the highest variability in marks is Chemistry and the subject with the lowest variability in marks is Mathematics.
Question:
The mean and variance of 7 observation are 8 and 16 respectively. If five of the observation are 2,4,10,12 and 14. Find the remaining two observations.
Answer:
Step 1: Calculate the sum of the five given observations. Answer: 2 + 4 + 10 + 12 + 14 = 42
Step 2: Calculate the sum of all seven observations. Answer: Sum of seven observations = Mean x Number of observations = 8 x 7 = 56
Step 3: Find the sum of the remaining two observations. Answer: Sum of remaining two observations = Sum of seven observations - Sum of five given observations = 56 - 42 = 14
Step 4: Find the two remaining observations. Answer: 14 / 2 = 7 Therefore, the remaining two observations are 7 and 7.
Question:
The mean and standard deviation of a group of 100 observations were found to be 20 and 3 respectively. Later on it was found that three observations were incorrect which were recorded as 21,21 and 18. Find the mean and standard deviation if the incorrect observation are omitted
Answer:
Step 1: Calculate the mean of the 100 observations. Mean = 20
Step 2: Calculate the standard deviation of the 100 observations. Standard Deviation = 3
Step 3: Calculate the sum of the three incorrect observations. Sum = 21 + 21 + 18 = 60
Step 4: Calculate the new mean by subtracting the sum of the incorrect observations from the total sum of the 100 observations. New Mean = (100 × 20) – 60 = 1400 – 60 = 1340
Step 5: Calculate the new standard deviation by subtracting the sum of the incorrect observations from the total sum of the 100 observations. New Standard Deviation = (100 × 3) – 60 = 300 – 60 = 240
Step 6: Calculate the new mean and standard deviation by dividing the new sums by the number of observations after omitting the incorrect observations. New Mean = 1340 / 97 = 13.8 New Standard Deviation = 240 / 97 = 2.5
Question:
Given that Xˉ is the mean and σ2 is the variance of n observations X1,X2…Xn. Prove that the mean and variance of the observations aX1,aX2,aX3….aXn are axˉ and a2σ2 respectively (a=0).
Answer:
Proof:
Step 1: Let X1, X2, X3, …, Xn be n observations with mean X¯ and variance σ2.
Step 2: Let aX1, aX2, aX3, …, aXn be the same observations multiplied by a constant a.
Step 3: The mean of aX1, aX2, aX3, …, aXn is given by
mean = (aX1 + aX2 + aX3 + … + aXn) / n
Step 4: Substituting the values of aX1, aX2, aX3, …, aXn, we get
mean = (aX1 + aX2 + aX3 + … + aXn) / n
= (a(X1 + X2 + X3 + … + Xn)) / n
= a(X1 + X2 + X3 + … + Xn) / n
= a(X¯)
Step 5: Thus, the mean of the observations aX1, aX2, aX3, …, aXn is ax¯.
Step 6: The variance of aX1, aX2, aX3, …, aXn is given by
variance = (a2X12 + a2X22 + a2X32 + … + a2Xn2) / n - (ax¯)2
Step 7: Substituting the values of aX1, aX2, aX3, …, aXn, we get
variance = (a2X12 + a2X22 + a2X32 + … + a2Xn2) / n - (ax¯)2
= (a2(X12 + X22 + X32 + … + Xn2)) / n - (a2(X¯)2
= a2(X12 + X22 + X32 + … + Xn2) / n - a2(X¯)2
= a2σ2
Step 8: Thus, the variance of the observations aX1, aX2, aX3, …, aXn is a2σ2.
Step 9: Therefore, the mean and variance of the observations aX1, aX2, aX3, …, aXn are ax¯ and a2σ2 respectively (a ≠ 0).
Question:
The mean and standard deviation of 20 observation are found to be 10 and 2 respectively. On rechecking it was found that an observation 8 was incorrect. Calculate the correct mean and standard deviation in each of the following cases : (i) If wrong item is omitted (ii) If it is replaced by 12
Answer:
(i) If wrong item is omitted
Mean = (10 + 11 + 10 + 10 + 11 + 10 + 11 + 11 + 10 + 11 + 10 + 10 + 11 + 10 + 11 + 11 + 10 + 11 + 10 + 11) / 19 = 10.53
Standard Deviation = √[( (10 - 10.53)2 + (11 - 10.53)2 + (10 - 10.53)2 + (10 - 10.53)2 + (11 - 10.53)2 + (10 - 10.53)2 + (11 - 10.53)2 + (11 - 10.53)2 + (10 - 10.53)2 + (11 - 10.53)2 + (10 - 10.53)2 + (10 - 10.53)2 + (11 - 10.53)2 + (10 - 10.53)2 + (11 - 10.53)2 + (11 - 10.53)2 + (10 - 10.53)2 + (11 - 10.53)2 + (10 - 10.53)2 + (11 - 10.53)2 ) / 18 ] = 0.9
(ii) If it is replaced by 12
Mean = (12 + 11 + 10 + 10 + 11 + 10 + 11 + 11 + 10 + 11 + 10 + 10 + 11 + 10 + 11 + 11 + 10 + 11 + 10 + 11) / 20 = 10.6
Standard Deviation = √[( (12 - 10.6)2 + (11 - 10.6)2 + (10 - 10.6)2 + (10 - 10.6)2 + (11 - 10.6)2 + (10 - 10.6)2 + (11 - 10.6)2 + (11 - 10.6)2 + (10 - 10.6)2 + (11 - 10.6)2 + (10 - 10.6)2 + (10 - 10.6)2 + (11 - 10.6)2 + (10 - 10.6)2 + (11 - 10.6)2 + (11 - 10.6)2 + (10 - 10.6)2 + (11 - 10.6)2 + (10 - 10.6)2 + (11 - 10.6)2 ) / 19 ] = 0.8
Question:
The mean and standard deviation of six observation are 8 and 4 respectively. If each observation is multiplied by 3, find the new mean and new standard deviation of the resulting observations.
Answer:
- Mean of the six observations = 8
- Standard deviation of the six observations = 4
- Each observation is multiplied by 3
- New mean of the resulting observations = 8 x 3 = 24
- New standard deviation of the resulting observations = 4 x 3 = 12
JEE స్టడీ మెటీరియల్ (గణితం)
01 సెట్లు
02 సంబంధాలు మరియు విధులు
03 త్రికోణమితి విధులు
04 గణిత ప్రేరణ సూత్రం
05 సంక్లిష్ట సంఖ్యలు మరియు చతుర్భుజ సమీకరణాలు
06 లీనియర్ అసమానతలు
07 ప్రస్తారణలు మరియు కలయికలు
08 ద్విపద సిద్ధాంతం
09 సీక్వెన్సులు మరియు సిరీస్
10 స్ట్రెయిట్ లైన్స్ వ్యాయామం
10 స్ట్రెయిట్ లైన్స్ ఇతరాలు
11 కోనిక్ విభాగాలు
12 త్రీ డైమెన్షనల్ జామెట్రీకి పరిచయం
13 పరిమితులు మరియు ఉత్పన్నాలు
14 గణిత రీజనింగ్
15 గణాంకాలు
16 సంభావ్యత