Wednesday, 4 December 2013
Tuesday, 3 December 2013
Exercise Identify coordination
1. Plot
the following points on a cartesian plane.
a. A(5,2) B(-3,2)
C(4,-1) D(-4,-4)
b. P(4,2) Q(5,-1)
R(-4,-2) S(-3,5)
2. The
diagram shows a cartesian plane.
a. State
the coordination of points R,S,T and U.
Exercise Midpoint
1. Refer
to the Cartesian Plane as shown and find the coordinates of thr midpoint of the
line
a) PQ
b) QR
1. Find
the coordinates of the midpoint of the straight line joining point P (-2, 2)
and point Q (4 ,6).
Solution
The
coordinates of the midpoint of the
line PQ are ( 1, 4)
1. Refer
to the Cartesian plane as shown and find the coordinates of the midpoint of the
straight line joining
a) P and F
b) H and J
c) D and
I
d) E and
F
e) G and H
f) I and
J
1. Find
the coordinates of the midpoint of the line which joins the following pairs of
points.
a) P (2, 5) and Q (8, 5)
b) M (5, -2) and M (-1, -2)
c) J (3,
-4) and K (3, 2)
d) A (-4 ,1) and B (-4,-3)
2. Refer
to the Cartesian plane as shown and find the coordinates of the midpoint of the
straight line joining
a) R and
Q
b) T and S
c) T and U
d) S and
Q
1. Find
the coordinates of the midpoint of the line which joins the following pairs
of points
a) P (6, 1) and Q ( 2,7)
b) M (3,
4) and N (-1, 6)
c) J (2, 5) and K (6, 1)
d) A (-3, 2) and B (-1, -8)
2. Given
that ( 2, p) is the midpoint of the
straight line joining the points ( 1, 8)
and (3, -2), find the value of p
3. Given
that (4 ,3) is the midpoint of the straight line joining the points (k, -1) and (2, 7), find value of k
4. PQRS is
the rhombus. Given that the coordinates of P, Q and R are (-3, 2), (1, 4) and (5, 2) respectively.
a) Find
the coordinates of S
b) Find
the coordinates of midpoint of all the sides of the rhombus.
c) What
the shape of the straight lines which
join all the midpoint?
SOLUTION
1.
a)
The coordinates of the midpoint of
the line PQ are (3, 4).
b)
The coordinates of the midpoint of
the line QR are ( 5, 1).
2. The coordinates of the midpoint of the line PQ are ( 1, 4)
2. a)
( 0, 4) b)(-1, 1)
c) (-2, -3) d)(2, 1)
e) (-3, 0) f)(1, -1)
4. a)(5,5)
b)(2, -2)
c)
(3, -1) d)(-4, -1)
5. a)
(-1, 3) b) ( 3, 1)
c)
( -2, 0) d) (3, 4)
6. a)
(4, 4) b) ( 1, 5)
c) (
4, -2 ) d) ( -2 , -3 )
7. P = 3
8. K = 6
9. a) ( 1, 0)
b)
(-1, 3), (3 , 3),(3, 1),(-1,1)
Monday, 2 December 2013
Midpoint
Learning Outcomes :
1. Identify the midpoint of a straight line
joining two points.
2. Find the coordinates
of the midpoint of a straight line joining two points with :
I.
Common y-coordinates.
II.
Common x-coordinates.
3. Find the coordinates
of the midpoint of the line joining two points.
4. Pose and solve
problem involving midpoints.
Activity
Aim : to find the midpoint of a straight
line
Instruction : Carry out
this activity in groups of four.
Materials :
Tracing paper, ruler and pencil.
Procedure :
1. Draw
a straight line on a piece of tracing paper, Label the line as PQ.
2. Fold
the tracing paper so that the two ends of the line overlap each other
perfectly.
3. Unfold
the tracing paper, mark the folded part of the line as R.
4. Is
R equidistant from P and Q ? Discuss.
From the activity , we
find that R is midpoint of the line PQ.
Example
Identify the midpoints of the following straight lines.
a)
Example
Identify the midpoints of the following straight lines.
a)
SOLUTION
Points C is midpoint of AE.
b)
SOLUTION
Points O is the midpoint of MQ.
Distances between two point
Distance between two point in A Cartesian Plane.
1. Find the distance between two points with :
1. Find the distance between two points with :
I. Common y coordinates.
II. Common x coordinates.
There are three ways to find the distance between two point:
a) By inspection
For example, in the Cartesian Plane as shown, the distance between a and b is 4 units. The distance between c and d is 3 units.
b) By moving one point to another
For example, in a Cartesian Plane as shown A has to move for units to reach B. therefore, the distance between A and B is 4 units. C has to move 3 units up to reach D. therefore, the distance between C and D is 3 units.
c) Finding the difference between the x coordinate or y coordinate :
for example the distance between A and B
= difference between the x coordinate
= 5-1
= 4 units.
The distance between C and D
= difference between the y coordinates
= -1- (-4)
= 3 units.
l. find the distance between two points using Pythagoras’ theorem.
identify coordinates
Learning
outcomes :
1.
Identify
the x-axis, y-axis and the origin in the Cartesian Plane.
In the Cartesian Plane , the horizontal number line is called the x-axis whereas the vertical number line is called the y-axis. The intersection point of the x-axis and the y-axis is known as the origin is usually represented with the letter 0
2. Plotting
point and stating the coordinates of the points.
The
position of any point Cartesian Plane can be determined by its distance
from each of the axis .
For example if point P
in the Cartesian Plane is located by an ordered pair(a,b), then
I.
The x-coordinate of P is a and the distance
of P from the y-axis is a units.
II.
The y-coordinate of P is b and the distance
of P from the x-axis is b units.
Example.
The coordinate of P are (4,3)
The Cartesian plane has four
quadrants.
In quadrant 1, the coordinates of any point are positive.
In quadrant 2, the x-coordinate of any point is negative
In quadrant 3, the coordinates of
any point are negative.
In quadrant 4, the y-coordinates of
any point are negative.
For example, point A is 2 units to
the right of the y-axis and 3 units above the axis. Therefore, its coordinates
are (2,3). Point B is 3 units to the y-axis and 3 unit above the axis.
Therefore, its coordinates are (-3, 3). State the coordinates of point C and
point D.
Subscribe to:
Posts (Atom)