mean, median, mode, range
45.6, 54.6, 44.6, 46.5, 66.4, 54.6
mean = 52.05 median = 45.1
mode = ______ range = ______
1.6, 2.2, 1.6, 3.5, 2.4, 2.2, 3.5, 2.4, 2.2
mean = ______ median = ______
mode = ______ range = ______
120, 320, 330, 220, 202, 210, 230, 320, 210, 201, 310, 330, 240, 210, 330, 230
mean = ______ median = ______
mode = ______ range = ______
54.2, 34.5, 53.4, 45.8, 24.6, 38.6, 26.8, 43.5, 45.2, 42.6
mean = ______ median = ______
mode = ______ range = ______

Question

Accepted Answer

# Explanation:
## Step1: Calculate mean for first set
Mean is sum of values divided by number of values. Sum of 45.6, 54.6, 44.6, 46.5, 66.4, 54.6 is $45.6 + 54.6+44.6 + 46.5+66.4+54.6=312.3$. There are 6 values, so mean is $\frac{312.3}{6}=52.05$.
## Step2: Calculate median for first set
Arrange values in ascending order: 44.6, 45.6, 46.5, 54.6, 54.6, 66.4. Since there are 6 (even) values, median is average of middle two, $\frac{46.5 + 54.6}{2}=50.55$.
## Step3: Calculate mode for first set
Mode is most - frequent value. 54.6 appears twice, more frequently than others, so mode is 54.6.
## Step4: Calculate range for first set
Range is difference between largest and smallest values. Range is $66.4−44.6 = 21.8$.
## Step5: Calculate mean for second set
Sum of 1.6, 2.2, 1.6, 3.5, 2.4, 2.2, 3.5, 2.4, 2.2 is $1.6	imes2+2.2	imes4 + 3.5	imes2+2.4	imes2=3.2 + 8.8+7+4.8 = 23.8$. There are 9 values, so mean is $\frac{23.8}{9}\approx2.64$.
## Step6: Calculate median for second set
Arrange in ascending order: 1.6, 1.6, 2.2, 2.2, 2.2, 2.2, 2.4, 2.4, 3.5, 3.5. Since there are 9 (odd) values, median is the 5th value, which is 2.2.
## Step7: Calculate mode for second set
2.2 appears 4 times, more frequently than others, so mode is 2.2.
## Step8: Calculate range for second set
Range is $3.5−1.6 = 1.9$.
## Step9: Calculate mean for third set
Sum of 120, 320, 330, 220, 202, 210, 230, 320, 210, 201, 310, 330, 240, 210, 330, 230 is $120 + 320	imes2+330	imes4+220+202+210	imes4+230	imes3+201+310+240=120 + 640+1320+220+202+840+690+201+310+240 = 4883$. There are 16 values, so mean is $\frac{4883}{16}=305.1875$.
## Step10: Calculate median for third set
Arrange in ascending order: 120, 201, 202, 210, 210, 210, 220, 230, 230, 230, 240, 310, 320, 320, 330, 330, 330, 330. Since there are 16 (even) values, median is average of 8th and 9th values, $\frac{230 + 230}{2}=230$.
## Step11: Calculate mode for third set
330 appears 4 times, more frequently than others, so mode is 330.
## Step12: Calculate range for third set
Range is $330−120 = 210$.
## Step13: Calculate mean for fourth set
Sum of 54.2, 34.5, 53.4, 45.8, 24.6, 38.6, 26.8, 43.5, 45.2, 42.6 is $54.2+34.5+53.4+45.8+24.6+38.6+26.8+43.5+45.2+42.6 = 409.2$. There are 10 values, so mean is $\frac{409.2}{10}=40.92$.
## Step14: Calculate median for fourth set
Arrange in ascending order: 24.6, 26.8, 34.5, 38.6, 42.6, 43.5, 45.2, 45.8, 53.4, 54.2. Since there are 10 (even) values, median is average of 5th and 6th values, $\frac{42.6+43.5}{2}=43.05$.
## Step15: Calculate mode for fourth set
No value appears more than once, so there is no mode.
## Step16: Calculate range for fourth set
Range is $54.2−24.6 = 29.6$.

# Answer:
First set: Mean = 52.05, Median = 50.55, Mode = 54.6, Range = 21.8
Second set: Mean $\approx$ 2.64, Median = 2.2, Mode = 2.2, Range = 1.9
Third set: Mean = 305.1875, Median = 230, Mode = 330, Range = 210
Fourth set: Mean = 40.92, Median = 43.05, Mode = None, Range = 29.6

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Question

Explanation:

Step1: Calculate mean for first set

Step2: Calculate median for first set

Step3: Calculate mode for first set

Step4: Calculate range for first set

Step5: Calculate mean for second set

Step6: Calculate median for second set

Step7: Calculate mode for second set

Step8: Calculate range for second set

Step9: Calculate mean for third set

Step10: Calculate median for third set

Step11: Calculate mode for third set

Step12: Calculate range for third set

Step13: Calculate mean for fourth set

Step14: Calculate median for fourth set

Step15: Calculate mode for fourth set

Step16: Calculate range for fourth set

Answer: