Consider the following Cartesian plane:
State the coordinates of the following points:
Consider the following Cartesian plane:
State the coordinates of the following points:
State the x-coordinate of:
The origin.
Any point on the y-axis.
State the y-coordinate of:
The origin.
Any point on the x-axis.
If point P has an x-coordinate of 0, which axis must it lie on? Explain your answer.
If \left(a, b\right) is a point that lies on the y-axis, find the value of a.
Consider the given points on the Cartesian plane:
State which point has the following coordinates:
\left(9, - 3 \right)
\left( - 4 , - 7 \right)
\left(2, 4\right)
\left( - 8 , 8\right)
Consider the points A and B plotted on the Cartesian plane:
Write down the coordinates of point A.
Write down the coordinates of point B.
Which axis do points A and B lie on?
In which quadrant do the following points lie?
State the quadrant(s) that have:
Points with a negative y-coordinate.
Points with a negative x-coordinate.
Points where the x-coordinate and y-coordinate have the same sign.
Points with a negative x-coordinate and a positive y-coordinate.
Points with a negative x-coordinate and a negative y-coordinate.
Plot the following points on a Cartesian plane:
For each of the following points:
Plot the point on a Cartesian plane.
State which quadrant the point lies in.
\left(2, 5\right)
\left( - 2 , 1\right)
\left(- 3 ,- 5 \right)
\left(8, - 5 \right)
\left( -8 ,- 1 \right)
\left( 4 ,- 7 \right)
\left(0, 2\right)
\left(5, 0\right)
For each of the following sets of points:
Plot the points on a Cartesian plane.
Identify the shape formed by joining the points in order.
\left(4, 1\right), \left(7, 1\right), \left(4, 4\right), \left(7, 4\right)
\left(1, 5\right), \left(6, 5\right), \left(1, 8\right), \left(6, 8\right)
\left( - 5 , - 3 \right), \left(0, -1 \right), \left( - 4 , 6 \right), \left(1, 8 \right)
\left( - 4 , - 3 \right), \left(0, -1 \right), \left( - 2 , 1 \right), \left(2, 3 \right)
For each of the following shapes, write down the coordinates of the vertices:
Describe how you would move on the Cartesian plane from the origin, to plot the following points:
Find the coordinates of the following points given the description:
The point 9 units below the origin.
The point 3.5 units to the left of the origin.
The point 4 units to the left of \left( - 3 , 6 \right).
The point 7 units to the right of \left( - 1 , - 2 \right).
The point 2 units to the right and 2 units below the point \left(2, 5\right).
The point 6 units to the left and 5 units above the point \left(4, -4\right).
Which point is furthest from the origin?
\left(0, - 3 \right)
\left(5, 0\right)
\left(0, 4.5\right)
\left( - 4 , 0\right)
How many units above the origin is the point \left( - 6 , 1\right) located?
Starting at the origin, move 4 units left and then 4 units up.
Plot the resulting point on a Cartesian plane.
State the coordinates of this point.
Find the distance between the following pairs of points:
A \left( - 5 , 8\right) and B \left( - 2 , 8\right).
A \left(7, 3\right) and B \left(-1, 3\right).
A \left(6, - 5 \right) and B \left(6, -1\right).
A \left( - 6 , 2\right) and B \left( - 6 , - 7 \right).
Consider the points: A \left( - 4 , 8\right), B \left( - 7 , 8\right) and C \left( - 7 , 1\right).
Plot the points on a Cartesian plane.
Find the length of AB.
Find the length of BC.
A triangle has points A \left(1, 2\right), B \left( - 2 , - 3 \right) and C \left(6, - 3 \right).
Plot the triangle ABC on a Cartesian plane.
Find the perpendicular height of the triangle if BC is the base.
Find the length of base BC.
Find the area of triangle ABC.
The points given represent three vertices of a parallelogram. Find the coordinates of the fourth vertex if it is known to be in the 2nd quadrant.
The points given represent three vertices of a rhombus. Find the coordinates of the fourth vertex if the missing point lies in the 3rd quadrant.