Grade 8 Glossary

alternate interior angles

Unit 1 Lesson 14, Unit 1 Lesson 15, Unit 1 Lesson 16

Alternate interior angles are created when two parallel lines are crossed by another line called a transversal. Alternate interior angles are inside the parallel lines and on opposite sides of the transversal.

This diagram shows two pairs of alternate interior angles. Angles $a$ and $d$ are one pair and angles $b$ and $c$ are another pair.

Two parallel lines intersected by a third line. Angles formed within the two parallel lines are a, b, c, and d.

base (of an exponent)

Unit 7 Lesson 3, Unit 7 Lesson 4, Unit 7 Lesson 5, Unit 7 Lesson 6, Unit 7 Lesson 7, Unit 7 Lesson 8

In expressions like $5^{3}$ and $8^{2}$ , the 5 and the 8 are called bases. They tell you what factor to multiply repeatedly.

For example, $5^{3}$ = $5 \cdot 5 \cdot 5$ , and $8^{2} = 8 \cdot 8$ .

center of dilation

Unit 2 Lesson 2, Unit 2 Lesson 4, Unit 2 Lesson 5

The center of dilation is a fixed point on a plane. It is the starting point from which we measure distances in a dilation.

In this diagram, point $P$ is the center of the dilation.

Point P with three dotted lines extending through 3 triangles of increasing size - A, B, C

clockwise

Unit 1 Lesson 2, Unit 1 Lesson 4, Unit 1 Lesson 5, Unit 1 Lesson 6

Clockwise means to turn in the same direction as the hands of a clock. The top turns to the right. This diagram shows Figure A turned clockwise to make Figure B.

Polygon A turned clockwise to make polygon B

coefficient

Unit 4 Lesson 8, Unit 4 Lesson 9

A coefficient is a number that is multiplied by a variable.

For example, in the expression $3 x + 5$ , the coefficient of $x$ is 3. In the expression $y + 5$ , the coefficient of $y$ is 1, because $y = 1 \cdot y$ .

cone

Unit 5 Lesson 13, Unit 5 Lesson 14, Unit 5 Lesson 15, Unit 5 Lesson 16

A cone is a three-dimensional figure like a pyramid, but the base is a circle.

congruent

Unit 1 Lesson 11, Unit 1 Lesson 12, Unit 1 Lesson 13

One figure is congruent to another if it can be moved with translations, rotations, and reflections to fit exactly over the other.

In the figure, Triangle $A$ is congruent to Triangles $B$ , $C$ , and $D$ . A translation takes Triangle $A$ to Triangle $B$ , a rotation takes Triangle $B$ to Triangle $C$ , and a reflection takes Triangle $C$ to Triangle $D$ .

Four triangles: A (blue), B (yellow), C (red), and D (green). B overlaps A and meets C and D at a common vertex. C and D share a side.

constant of proportionality

Unit 3 Lesson 1, Unit 3 Lesson 2, Unit 3 Lesson 3, Unit 3 Lesson 4

In a proportional relationship, the values for one quantity are each multiplied by the same number to get the values for the other quantity. This number is called the constant of proportionality.

In this example, the constant of proportionality is $3$ , because $2 \cdot 3 = 6$ , $3 \cdot 3 = 9$ , and $5 \cdot 3 = 15$ . This means that there are 3 apples for every 1 orange in the fruit salad.

number of oranges	number of apples
$2$	$6$
$3$	$9$
$5$	$15$

constant term

Unit 4 Lesson 8, Unit 4 Lesson 9

In an expression like $5 x + 2$ , the number $2$ is called the constant term because it doesn’t change when $x$ changes.

In the expression $7 x + 9$ , $9$ is the constant term.
In the expression $5 x + (- 8)$ , $- 8$ is the constant term.
In the expression $12 - 4 x$ , $12$ is the constant term.

coordinate plane

Unit 1 Lesson 5, Unit 1 Lesson 6

The coordinate plane is a system for telling where points are. For example, point $R$ is located at $(3, 2)$ on the coordinate plane, because it is three units to the right and two units up.

A picture of a coordinate plane with a point (R) plotted at (3, 2).

corresponding

Unit 1 Lesson 2, Unit 1 Lesson 7, Unit 1 Lesson 8, Unit 1 Lesson 9, Unit 1 Lesson 10

When part of an original figure matches up with part of a copy, we call them corresponding parts. These could be points, segments, angles, or distances.

For example, point $B$ in the first triangle corresponds to point $E$ in the second triangle.

Segment $A C$ corresponds to segment $D F$ .

Two similar triangles with points ABC and DEF.

counterclockwise

Unit 1 Lesson 2, Unit 1 Lesson 3, Unit 1 Lesson 4, Unit 1 Lesson 5, Unit 1 Lesson 6

Counterclockwise means to turn opposite of the way the hands of a clock turn. The top turns to the left.

This diagram shows Figure A turned counterclockwise to make Figure B.

Polygon A showing a counterclockwise rotation to make polygon B

cube root

Unit 8 Lesson 12, Unit 8 Lesson 13

The cube root of a number $n$ is the number whose cube is $n$ . It is also the edge length of a cube with a volume of $n$ . We write the cube root of $n$ as $\sqrt[3]{n}$ .

For example, the cube root of $64$ , written as $\sqrt[3]{64}$ , is $4$ because $4^{3}$ is $64$ . $\sqrt[3]{64}$ is also the edge length of a cube that has a volume of $64$ .

cylinder

Unit 5 Lesson 11, Unit 5 Lesson 12, Unit 5 Lesson 13, Unit 5 Lesson 14, Unit 5 Lesson 15, Unit 5 Lesson 16

A cylinder is a three-dimensional figure like a prism, but with bases that are circles.

dependent variable

Unit 5 Lesson 3, Unit 5 Lesson 4, Unit 5 Lesson 6, Unit 5 Lesson 7

A dependent variable represents the output of a function.

We need to buy 20 pieces of fruit and decide to buy apples and bananas. If we select the number of apples first, the equation $b = 20 - a$ shows the number of bananas we can buy. The number of bananas is the dependent variable because it depends on the number of apples.

dilation

Unit 2 Lesson 2, Unit 2 Lesson 3, Unit 2 Lesson 4, Unit 2 Lesson 5

A dilation is a transformation in which each point on a figure moves along a line and changes its distance from a fixed point. The fixed point is the center of the dilation. All of the original distances are multiplied by the same scale factor.

For example, triangle $D E F$ is a dilation of triangle $A B C$ . The center point is $O$ and the scale factor is 3.

This means that every point of triangle $D E F$ is 3 times as far from $O$ as every corresponding point of triangle $A B C$ .

Small triangle ABC is dilated to make larger green triangle DEF

exponent

Unit 7 Lesson 1

In expressions like $5^{3}$ and $8^{2}$ , the $3$ and the $2$ are called exponents. They tell you how many factors to multiply.

For example, $5^{3}$ = $5 \cdot 5 \cdot 5$ , and $8^{2} = 8 \cdot 8$ .

function

Unit 5 Lesson 2

A function is a rule that assigns exactly one output to each possible input.

The function $y = 6 x + 4$ assigns one value of the output, $y$ , to each value of the input, $x$ . For example, when $x = 5$ , then $y = 6 (5) + 4$ or $34$ .

hypotenuse

Unit 8 Lesson 6, Unit 8 Lesson 7, Unit 8 Lesson 8, Unit 8 Lesson 9, Unit 8 Lesson 10, Unit 8 Lesson 11

The hypotenuse is the side of a right triangle that is opposite the right angle. It is the longest side of a right triangle.

Here are some right triangles. Each hypotenuse is labeled.

Four triangles labeled with the legs and hypotenuse.

image

Unit 1 Lesson 2, Unit 1 Lesson 3, Unit 1 Lesson 4, Unit 1 Lesson 5, Unit 1 Lesson 6

An image is the result of translations, rotations, and reflections on an object. Every part of the original object moves in the same way to match up with a part of the image.

In this diagram, triangle $A B C$ has been translated up and to the right to make triangle $D E F$ . Triangle $D E F$ is the image of the original triangle $A B C$ .

Triangle ABC with a translation line from point C to point F on triangle DEF

independent variable

Unit 5 Lesson 3, Unit 5 Lesson 4, Unit 5 Lesson 5, Unit 5 Lesson 6, Unit 5 Lesson 7

An independent variable represents the input of a function.

We need to buy 20 pieces of fruit and decide to buy some apples and bananas. If we select the number of apples first, the equation $b = 20 - a$ shows the number of bananas we can buy. The number of apples is the independent variable because we can choose any number for it.

irrational number

Unit 8 Lesson 3

An irrational number is a number that is not a fraction or the opposite of a fraction.

Pi ( $π$ ) and $\sqrt{2}$ are examples of irrational numbers.

legs

Unit 8 Lesson 6, Unit 8 Lesson 7, Unit 8 Lesson 8, Unit 8 Lesson 9, Unit 8 Lesson 10, Unit 8 Lesson 11

The legs of a right triangle are the sides that make the right angle.

Here are some right triangles. Each leg is labeled.

linear relationship

Unit 3 Lesson 5, Unit 3 Lesson 6, Unit 3 Lesson 7, Unit 3 Lesson 8

A linear relationship between two quantities means they are related like this: When one quantity changes by a certain amount, the other quantity always changes by a set amount. In a linear relationship, one quantity has a constant rate of change with respect to the other.

The relationship is called linear because its graph is a line.

The graph shows a relationship between number of days and number of pages read.

When the number of days increases by 2, the number of pages read always increases by 60. The rate of change is constant, 30 pages per day, so the relationship is linear.

A graph of number of days (horizontal axis 0 - 5) and humber of pages read (vertical axis 0 - 160). The is a line starting at point (0,40) with points (1,70) and (4, 160) marked.

negative association

Unit 6 Lesson 5, Unit 6 Lesson 6, Unit 6 Lesson 7, Unit 6 Lesson 8

A negative association is a relationship between two quantities where one tends to decrease as the other increases. In a scatter plot, the data points tend to cluster around a line with negative slope.

Different stores across the country sell a book for different prices.

The scatter plot shows that there is a negative association between the the price of the book in dollars and the number of books sold at that price.

A scatter plot of price in dollars (horizontal axis 6 - 14) and number sold (vertical axis 0 - 160) showing as price increases, number sold decreases.

outlier

Unit 6 Lesson 4, Unit 6 Lesson 5, Unit 6 Lesson 7

An outlier is a data value that is far from the other values in the data set.

Here is a scatter plot that shows lengths and widths of 20 different left feet. The foot whose length is 24.5 cm and width is 7.8 cm is an outlier.

A scatterplot. Horizontal, from 20 to 32, by 2's, labeled foot length in centimeters. Vertical, from 7 to 12, by 1’s, labeled foot width in centimeters. 20 dots trend upward and to the right. Line drawn, trends linearly upward and right with 11 dots above lie and 9 below. No dots lie on the line. The line begins at about point 21 point 9 comma 9 and ends at about 31 point 25 comma 11 point 5.

positive association

Unit 6 Lesson 5, Unit 6 Lesson 6, Unit 6 Lesson 7, Unit 6 Lesson 8

A positive association is a relationship between two quantities where one tends to increase as the other increases. In a scatter plot, the data points tend to cluster around a line with positive slope.

The relationship between height and weight for 25 dogs is shown in the scatter plot. There is a positive association between dog height and dog weight.

Scatter plot of dog height (inches) (horizontal 6-30) and dog weight (pounds) (vertical 0-112). As height increases, weight increases.

Pythagorean Theorem

Unit 8 Lesson 6, Unit 8 Lesson 7, Unit 8 Lesson 8, Unit 8 Lesson 9, Unit 8 Lesson 10, Unit 8 Lesson 11

The Pythagorean Theorem describes the relationship between the side lengths of right triangles.

The diagram shows a right triangle with squares built on each side. If we add the areas of the two small squares, we get the area of the larger square.

The square of the hypotenuse is equal to the sum of the squares of the legs. This is written as $a^{2} + b^{2} = c^{2}$ .

A diagram shows a right triangle with squares built on each side. The legs of the triangle have squares measuring "a squared = 16" and "b squared = 9" and the hypotenuse is "c squared = 25"

radius

Unit 5 Lesson 3, Unit 5 Lesson 4, Unit 5 Lesson 5, Unit 5 Lesson 6, Unit 5 Lesson 7

A radius is a line segment that goes from the center to the edge of a circle. A radius can go in any direction. Every radius of the circle is the same length. We also use the word radius to mean the length of this segment.

For example, $r$ is the radius of this circle with center $O$ .

A circle with a center O and line extending from the center to the edge labeled r.

rate of change

Unit 3 Lesson 3, Unit 3 Lesson 4

The rate of change in a linear relationship is the amount $y$ changes when $x$ increases by 1. The rate of change in a linear relationship is also the slope of its graph.

In this graph, $y$ increases by 15 dollars when $x$ increases by 1 hour. The rate of change is 15 dollars per hour.

A graph of time (hours) (horizontal axis 0 - 9) and amount earned (dollars) (vertical axis 0 - 140). A line starts at approximately 10 and goes up and to the right.

rational number

Unit 8 Lesson 3, Unit 8 Lesson 4

A rational number is a fraction or the opposite of a fraction.

For example, 8 and -8 are rational numbers because they can be written as $\frac{8}{1}$ and $- \frac{8}{1}$ .

Also, 0.75 and -0.75 are rational numbers because they can be written as $\frac{75}{100}$ and $- \frac{75}{100}$ .

reciprocal

Unit 7 Lesson 7, Unit 7 Lesson 8

Dividing 1 by a number gives the reciprocal of that number.

For example, the reciprocal of 12 is $\frac{1}{12}$ , and the reciprocal of $\frac{2}{5}$ is $\frac{5}{2}$ .

reflection

Unit 1 Lesson 2, Unit 1 Lesson 3, Unit 1 Lesson 4, Unit 1 Lesson 5, Unit 1 Lesson 6

A reflection across a line moves every point on a figure to a point directly on the opposite side of the line. The new point is the same distance from the line as it was in the original figure.

This diagram shows a reflection of A over line $ℓ$ that makes the mirror image B.

A blue triangle labeled A, a green triangle labeled B and oriented differently than A, and line l between them.

relative frequency

Unit 6 Lesson 9, Unit 6 Lesson 10

The relative frequency of a category tells us the proportion at which the category occurs in the data set. It is expressed as a fraction, a decimal, or a percentage of the total number.

For example, suppose there were 21 dogs in the park, some white, some brown, some black, and some multi-color. The table shows the frequency and the relative frequency of each color.

color	frequency	relative frequency
white	$5$	$\frac{5}{21}$
brown	$7$	$\frac{7}{21}$
black	$3$	$\frac{3}{21}$
multi-color	$6$	$\frac{6}{21}$

repeating decimal

Unit 8 Lesson 14, Unit 8 Lesson 15

A repeating decimal has digits that keep going in the same pattern over and over. The repeating digits are marked with a line above them.

For example, the decimal representation for $\frac{1}{3}$ is $0. \overset{―}{3}$ , which means 0.3333333 … The decimal representation for $\frac{25}{22}$ is $1.1 \overset{―}{36}$ which means 1.136363636 …

right angle

Unit 1 Lesson 12, Unit 1 Lesson 13

A right angle is half of a straight angle. It measures 90 degrees.

A horizontal line with a vertical line at the center with a point and small lightly colored square labeled right angle.

rigid transformation

Unit 1 Lesson 7, Unit 1 Lesson 8, Unit 1 Lesson 9, Unit 1 Lesson 10

A rigid transformation is a move that does not change any measurements of a figure. Translations, rotations, and reflections are rigid transformations, as is any sequence of these.

rotation

Unit 1 Lesson 2, Unit 1 Lesson 4, Unit 1 Lesson 5, Unit 1 Lesson 6

A rotation moves every point on a figure around a center by a given angle in a specific direction.

This diagram shows Triangle $A$ rotated around center $O$ by 55 degrees clockwise to get Triangle $B$ .

Two triangles sharing a vertex at point O and a 55 degree angle from the left edge of triangle A to the left edge of triangle B

scale factor

Unit 2 Lesson 1, Unit 2 Lesson 2, Unit 2 Lesson 3, Unit 2 Lesson 4, Unit 2 Lesson 5

To create a scaled copy, we multiply all the lengths in the original figure by the same number. This number is called the scale factor.

In this example, the scale factor is 1.5, because $4 \cdot 1.5 = 6$ , $5 \cdot 1.5 = 7.5$ , and $6 \cdot 1.5 = 9$ .

Two similar triangles with points ABC and side lengths of 4, 5, 6. Triangle DEF has sides 6, 7.5, and 9.

scatter plot

Unit 6 Lesson 1, Unit 6 Lesson 2

A scatter plot is a graph that shows the values of two variables on a coordinate plane. It allows us to investigate connections between the two variables.

Each plotted point corresponds to one dog. The coordinates of each point tell us the height and weight of that dog.

Scatter plot of dog height (inches) (horizontal 6-30) and dog weight (pounds) (vertical 0-112).

scientific notation

Unit 7 Lesson 12, Unit 7 Lesson 13, Unit 7 Lesson 14, Unit 7 Lesson 15

Scientific notation is a way to write very large or very small numbers. We write these numbers by multiplying a number between 1 and 10 by a power of 10.

For example, the number $425, 000, 000$ in scientific notation is $4.25 \times 10^{8}$ . The number $0.0000000000783$ in scientific notation is $7.83 \times 10^{- 11}$ in scientific notation.

segmented bar graph

Unit 6 Lesson 9, Unit 6 Lesson 10

A segmented bar graph compares two categories within a data set. The whole bar represents all the data within one category. Then, each bar is separated into parts (segments) that show the percentage of each part in the second category.

Segmented bar graph comparing age to has a cell phone(blue) to no cell phone(yellow striped). 10-12 yrs has phone-45%. 13-15 yrs has phone-80%. 16-18 yrs has phone-85%. approximate

This segmented bar graph shows the percentage of people in different age groups that do and do not have a cell phone. For example, among people ages 10 to 12, about 40% have a cell phone and 60% do not have a cell phone.

sequence of transformations

Unit 1 Lesson 4, Unit 1 Lesson 5, Unit 1 Lesson 6

A sequence of transformations is a set of translations, rotations, reflections, and dilations on a figure. The transformations are performed in a given order.

This diagram shows a sequence of transformations to move Figure A to Figure C.

First, A is translated to the right to make B. Next, B is reflected across line $ℓ$ to make C.

A grid with blue figure A, point P and line extending to point O on green figure B. Line l extends across the grid with point R on it. Shape C is turned and on other side of line.

Two figures are similar if one can fit exactly over the other after rigid transformations and dilations.

In this figure, triangle $A B C$ is similar to triangle $D E F$ .

If $A B C$ is rotated around point $B$ and then dilated with center point $O$ , then it will fit exactly over $D E F$ . This means that they are similar.

Point O with two dotted lines extending out with three triangles, a red triangle, a blue triangle ABC turned, and larger green triangle DEF along the lines.

slope

Unit 2 Lesson 10, Unit 2 Lesson 11, Unit 2 Lesson 12

The slope of a line is a number we can calculate using any two points on the line. To find the slope, divide the vertical distance between the points by the horizontal distance.

The slope of this line is 2 divided by 3 or $\frac{2}{3}$ .

A coordinate grid with a line starting from approx 0.4 and moving up and to the right. A triangle is drawn on the line and labeled with vertical and horizontal distance.

solution to an equation with two variables

Unit 3 Lesson 12, Unit 3 Lesson 13

A solution to an equation with two variables is a pair of values of the variables that make the equation true.

For example, one possible solution to the equation $4 x + 3 y = 24$ is $(6, 0)$ . Substituting 6 for $x$ and 0 for $y$ makes this equation true because $4 (6) + 3 (0) = 24$ .

sphere

Unit 5 Lesson 13, Unit 5 Lesson 14, Unit 5 Lesson 15, Unit 5 Lesson 16

A sphere is a three-dimensional figure in which all cross-sections in every direction are circles.

square root

Unit 8 Lesson 2, Unit 8 Lesson 3, Unit 8 Lesson 4, Unit 8 Lesson 5

The square root of a positive number n is the positive number whose square is $n$ . It is also the the side length of a square whose area is $n$ . We write the square root of $n$ as $\sqrt{n}$ .

For example, the square root of 16, written as $\sqrt{16}$ , is $4$ because $4^{2}$ is $16$ . $\sqrt{16}$ is also the side length of a square that has an area of $16$ .

straight angle

Unit 1 Lesson 15, Unit 1 Lesson 16

A straight angle is an angle that forms a straight line. It measures 180 degrees.

A straight line with a point in the middle and a semi-circle drawn over it and labeled a straight angle.

system of equations

Unit 4 Lesson 11, Unit 4 Lesson 12, Unit 4 Lesson 13, Unit 4 Lesson 14, Unit 4 Lesson 15

A system of equations is a set of two or more equations. Each equation contains two or more variables. We want to find values for the variables that make all the equations true.

These equations make up a system of equations:

$x + y = - 2$
$x - y = 12$

The solution to this system is $x = 5$ and $y = - 7$ because when these values are substituted for $x$ and $y$ , each equation is true: $5 + (- 7) = - 2$ and $5 - (- 7) = 12$ .

term

Unit 4 Lesson 6, Unit 4 Lesson 7, Unit 4 Lesson 8

A term is a part of an expression. It can be a single number, a variable, or a number and a variable that are multiplied together.

For example, the expression $5 x + 18$ has two terms. The first term is $5 x$ and the second term is 18.

tessellation

Unit 1 Lesson 17, Unit 9 Lesson 2

A tessellation is a repeating pattern of one or more shapes. The sides of the shapes fit together perfectly and do not overlap. The pattern goes on forever in all directions.

This diagram shows part of a tessellation.

A drawing of a repeating patterns of squares and hexagons.

transformation

Unit 1 Lesson 3, Unit 1 Lesson 4, Unit 1 Lesson 6

A transformation is a translation, rotation, reflection, or dilation, or a combination of these.

translation

Unit 1 Lesson 2, Unit 1 Lesson 4, Unit 1 Lesson 5, Unit 1 Lesson 6

A translation moves every point in a figure a given distance in a given direction.

This diagram shows a translation of Figure A to Figure B using the direction and distance given by the arrow.

A blue triangle with point A and a line drawn from it to point B on an overlapping green triangle.

transversal

Unit 1 Lesson 14, Unit 1 Lesson 15, Unit 1 Lesson 16

A transversal is a line that crosses parallel lines.

This diagram shows a transversal line $k$ intersecting parallel lines $m$ and $ℓ$ .

diagram shows a transversal line "k" intersecting parallel lines "m" and "l".

two-way table

Unit 6 Lesson 9, Unit 6 Lesson 10

A two-way table provides a way to compare two categorical variables.

It shows one of the variables across the top and the other down one side. Each entry in the table is the frequency or relative frequency of the category shown by the column and row headings.

A study investigates the connection between meditation and the state of mind of athletes before a track meet. This two-way table shows the results of the study.

	meditated	did not meditate	total
calm	$45$	$8$	$53$
agitated	$23$	$21$	$44$
total	$68$	$29$	$97$

vertex

Unit 1 Lesson 1, Unit 1 Lesson 2, Unit 1 Lesson 3, Unit 1 Lesson 4, Unit 1 Lesson 5, Unit 1 Lesson 6

A vertex is a point where two or more edges meet. When we have more than one vertex, we call them vertices.

The vertices in this polygon are labeled $A$ , $B$ , $C$ , $D$ , and $E$ .

An enclosed polygon of an irregular shape labeled A, B, C, D, E.

vertical angles

Unit 1 Lesson 9, Unit 1 Lesson 10

Vertical angles are opposite angles that share the same vertex. They are formed by a pair of intersecting lines. Their angle measures are equal.

For example, angles $A E C$ and $D E B$ are vertical angles. If angle $A E C$ measure $120^{\circ}$ , then angle $D E B$ must also measure $120^{\circ}$ .

Angles $A E D$ and $B E C$ are another pair of vertical angles.

Two line intersecting in an "x" shape at point E. Point A is upper left from E, C is upper right, B is lower right, and D is lower left.

vertical intercept

Unit 3 Lesson 6, Unit 3 Lesson 7, Unit 3 Lesson 8

The vertical intercept is the point where the graph of a line crosses the vertical axis.

The vertical intercept of this line is $(0, - 6)$ or just -6.

A coordinate grid with a line drawn. The line crosses the y axis at (0, -6)

volume

Unit 5 Lesson 7

Volume is the number of cubic units that fill a three-dimensional region, without any gaps or overlaps.

For example, the volume of this rectangular prism is 60 units $^{3}$ , because it is composed of 3 layers that are each 20 units $^{3}$ .

A picture of a rectangular prism made up of 3 layers of 5x4 rectangles. The second picture shows the three layers separated.