Stats Jeopardy

Mean, Median, Mode

Dot Plots & Data Displays

Stem-and-Leaf Plots

Mean Absolute Deviation (MAD)

Random Multiplication

100

This measure is found by adding all numbers and dividing by how many you have.

Mean

100

A dot plot shows data using these small marks above a number line.

Dots

100

In the value 47, which digit is the stem?

100

MAD stands for Mean ________ Deviation.

Absolute

100

6 x 7

200

The middle number in an ordered set of data.

Median

200

A dot plot shows data using these small marks above a number line.

Histogram

200

A stem-and-leaf plot organizes numbers by their tens and these units.

Ones (units) digits

200

MAD measures how far data points typically are from this measure of center

mean

200

12 x 4

300

In the set {2, 2, 3, 5, 7}, this is the mode

300

If a dot plot has several dots far from the others, what do we call those unusual points?

Outliers

300

A stem-and-leaf plot organizes numbers by their tens and these units.

Least to greatest

300

If all numbers in a set are the same, the MAD equals this.

300

18 x 9

162

400

A set has two modes. What do we call it?

Bimodal

400

In a dot plot, the number with the most dots represents this measure of center.

Mode

400

The stem-and-leaf plot shows leaves: 2, 4, 7 on stem 3. Name one number represented.

32, 34, or 37

400

To find MAD, we first find this measure, then calculate distances from it.

The Mean

400

27 x 13

351

500

The median of {4, 7, 9, 12} is found by taking the mean of these two numbers.

(7 + 9) ÷ 2 = 8

500

A histogram is different from a bar graph because these two features touch each other.

Bars (bins) touch each other

500

When combining two classes' plots into one, this type of stem-and-leaf plot is created.

Back-to-back stem-and-leaf plot

500

A larger MAD means the data is more this.

Spread out (more variability)

500

48 x 26

1,248