Linear (No Linear Relation rules/restrictions are broken in the equation)
100
Find the slope of a line that passes through the points
(2, 3) and (5, 15)
m=4
100
True or False:
The point of intersect is where the line segment meets the y-axis.
False (The point of intersect is where two line segments meet.)
100
In the equation of a Linear Relation, the coefficient of the variable 'x' represents...
The Slope!
100
Identify the slope of the line shown in the graph.
m=2
200
y=2x^2 +8
NON-Linear (With ANY exponent added onto either of the variables, the pattern of the line sagment is automatically altered, and it is no longer linear.)
200
Find the slope of a line that passes through the points
(5, 4) and (-15, 6)
m= -1/10
200
True or False:
Two linear relations can have more than one Point of Intersection.
False
200
In the equation of a Linear Relation, the variable 'b' represents...
The initial value, The y-intercept, etc.
200
Identify the equation of the linear relation shown in the graph.
y=2x +4
300
y=(2+x)(4+x)+2
NON-Linear (When simplified, the variable 'x' then gains an exponent, making it no longer linear)
300
Find the slope of a line that passes through the points
(2, 12) and (6, 12)
m=0
300
True or False:
Any line segment can have a point of intersection.
False (Two line sements are needed and they cannot be parallel. Then any two line segments will meet eventually.)
300
In the equation of a Linear Relation, the slope can be found as...
The variable 'm'!
300
Identify the variable 'm' in the equation y=6x +2
m=6!
400
y=2x^2 +8
NON-Linear (With ANY exponent added onto either of the variables, the pattern of the line sagment is automatically altered, and it is no longer linear.)
400
Find the slope of a line that passes through the points
(5, 3) and (5, -22)
m=UNDEFINED!
400
True or False:
Point of Intersection has to be presented as a coordinate point
True (There can only be one point on the grid in which the two lines meet.)
400
What is the proper formula for a linear relation?
y=mx +b
400
Identify the initial value of both linear relations shown on the graph.
1 & -1
500
y=2+ x(5) -6
Linear (Expanded the equation is y=5x -4, and such equation is linear!)
500
Name the four different ways to state equation for slope.
m= change in y / change in x
m= y2-y1 / x2-x1
m= delta y / delta x
m= rise / run
500
Identify the point of intersection from the graph shown.
(1, 3)
500
Create the equation of both of the lines shown in the graph.
BONUS: What do you know about the line sagments from looking at the equations?
y=x +1
y=x -1
BONUS: The two line sagments are parellel!
500
Identify the Point of intersection of the line sagments
y=2x -4 and y=1/3x.