Obavezno
1
The coordinates of point A are
The coordinates of point A are
6.NS.6.c
Obavezno
1
The coordinates of point B are
The coordinates of point B are
6.NS.6.c
Obavezno
1
6.NS.8
1
6.NS.6.c
Graph and label each point on the coordinate plane.
A) (7, --5)
B) (4, 5)
C) (--3, --4)
D) (2, 0)
E) (--6, 7)
Drag a point on the LEFT to the matching reflection definition (there will be only one per definition). Drag all the others to the "no match" group.
(6, --8)
(--6, 8)
(--1, 3)
(--1, --3)
(7, 2)
(7, --2)
(--7, 2)
(1, 3)
(--6, --8)
The reflection of the point (6, 8) over the x-axis
The reflection of the point (--7, --2) over the y-axis
The reflection of the point (1, --3) over the y-axis
The reflection of the point (1, --3) over the x-axis
no match
The coordinates of point A are
The coordinates of point B are
Write the coordinates for Point A [use format (x,y)]
Write the coordinates for Point B [use format (x,y)]
Write the coordinates for Point C [use format (x,y)]
Use the image to
Quadrant I | Quadrant II | Quadrant III | Quadrant IV | |
|---|---|---|---|---|
The green circle is in | ||||
The blue pentagon is in | ||||
The yellow square is in | ||||
The red triangle is in | ||||
The point (4, --2) is in | ||||
The reflection over the y-axis of point (--3, 5) is in | ||||
If both numbers in an ordered pair are negative, the point is in |
Point A is located at (-4, 9) on the coordinate plane. Point B is located at (--4, --7).
What is the distance between Point A and Point B? Your answer should be in units.
Use the information below to plot and label John’s fourth point.
Neither coordinate of John’s fourth point is negative.
The horizontal distance between John’s fourth point and one of his other points is 2.
Plot the points (-2, -5) and (2, 5) in the coordinate plane.
Use your work in Question 14 to say whether each statement is TRUE or FALSE
TRUE | FALSE | |
|---|---|---|
The x-coordinates have the same absolute value | ||
The x-coordinates are opposite numbers | ||
Both points are 5 units away from the y-axis | ||
The points lie on opposite sides of each axis | ||
One point is 2 units right of the y-axis |
The coordinates of two vertices (corners) of a rectangle are (3, 3) and (--5, 3). If the rectangle has a
perimeter (distance around the outside) of 30 units, what are the possible coordinates of its other two vertices?
CHALLENGE QUESTION I
On a coordinate plane Mitchell’s house is located at (--5,2). Liam’s house is located at a point that is a reflection of Mitchell’s house over the y-axis. What are the coordinates of Liam’s house? Use the coordinate plane to help you think about the problem.
CHALLENGE QUESTION II
What is the distance between Mitchell and Liam’s house? (Answer in units: for example "2 units")
CHALLENGE QUESTION III
What would the coordinates of Mitchell’s house be if it was reflected over the x-axis?
CHALLENGE QUESTION IV
What would the coordinates be if Mitchell's house was reflected over the origin? Note: this is what Mr. Randolph calls a "double reflection," where the point is reflected over the x-axis AND over the y-axis.
Point C has the same first coordinate as Point A
The second coordinate of Point C is 1/2 the second coordinate of Point B
What are the coordinates of Point C?
Locate and label point C on the coordinate plane.
Which statement(s) about John’s points are true?
Select all that apply.