Puzzles and worksheets similar to Math Words Word Search

What are 2 adjacent angles that form a line called?
What is the slope of parallel lines
What is the slope of perpendicular lines?
How do you find the length of a segment?
What angles are on opposite sides of the transversal, in between the lines?
What are two angles whose sum is 180 degrees?
What are two angles whose sum is 90 degrees?
What does Santa say?
What are two angles that are across from eachother when two lines intersect called?
How many congruent sides does a rhombus have?
how many reindeer does santa have?
What is opposite the north pole?
If 2 triangles are conguent because all of its sides are congruent, what theorem would it be?
Who is santa's favorite reindeer?
What is the relationship of the sides of similar triangles?
Where does santa live?
What is another name for a ratio?
What cuts an angle in half creating 2 congruent angles?
What do you call two triangles that are the same shape and size?
What kind of triangle has 2 congruent sides?
What kind of triangle has 3 congruent sides?
What do you call a part of a line?
What is the corner of a triangle called?
Given two sides, how do you find the hypotenuse of a right triangle?

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The sum of the measures of the interior angles of a triangle is 180°.
The location or movement of every point used in a figure/object in a plane.
A type of transformation where a figure/object reflects on a coordinate plane. Aka a flip.
Pairs of angles when lines that do not intersect are cut by a transversal line on the same side and in the same place on their parallel line.
A pair of supplementary angles created when parallel lines are cut by a transversal and are outside the parallel lines and on the same side.
A pair of supplementary angles created when parallel lines are cut by a transversal and are inside the parallel lines and on the same side.
A type of transformation in which the size of the figure/object changes but not the shape.
A type of transformation in which makes the figure/object slide; Congruent images.

when we predict a value inside the domain and range of the data
a diagram showing the relation between variable quantities
if for every point on that intervals the first derivate is positive
is commonly used to determine the distance between two numbers on the number line
is a set of real numbers that contains all real numbers lying between any two numbers of the set
describes a relationship between two quantities that show a constant rate of change
is a point where the graph of a function or relation intersects the y-axis of the cordinate system
a mathematical relationship or rule expreesed in symbols
if they are increasing at the same rate, the graphs will never cross
is a function whose graph produces a line
greather than, greather than or equal to, less than, or less than or equal to, between two numbers or algebraic expressions
determines if the function is an increasing function or a decreasing function
a collection of facts
when we predict a value outside the domain and range of the data
a function whose value decreases as the independent variables increases over a give range
when a point crosses x-axis then that point
is a point, line, or curve common to two or more objects
statement of equality between two expressions consisting of variables and/or numbers
lines that intersect at a rigth (90 degrees) angle

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EQUILATERAL TRIANGLE
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determines if the function is a decreasing function or an increasing function
a function whose graph produces a line
two lines that are vertical
when we predict a value inside the domain and range of the data
when we predict a value outside the domain and range data
when a model no longer applies after some point it is called _________
has an equation of the form x=a
has an equations of the form f(x)=b
a function that can be represented in the form f(x)=x^p
the sum of terms each consisting of a vertically stretched or compressed power function
the highest power of the variable that occurs in the polynomial
coefficient of the leading term
can be positive, negative, or zero,8 and be whole numbers, decimals, or fractions.
where h and k are the numbers in the transformation form of the function.
functions involving roots
the most basic complex number is i
a large number or the state of having multiple
two pairs of binomials with identical terms but share opposite sums
slanted asymptotes that show exactly how a function increases or decreases without bond.
a function that can be written as the ratio of two polynomials