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Quadratic
equations
Clement
Radcliffe, Contributor
IF
YOU have been following the materials
presented in the last three lessons,
you should realise by now that the following
methods are commonly used to solve quadratic
equations. These are:
*
Quadratic factors
*
Quadratic formula
*
Completion of square
Learning
each method is important. It is also
critical that you know when to use
the different methods. Let us review
the materials presented previously
with this in mind.
*
Only some quadratic equations can
be solved by the factorisation method.
*
Given the equation, you should first
use the factorisation method, unless
otherwise directed.
*
If a specific method is requested,
you must obey the instructions, or
you will be penalised.
*
All quadratic equations with real
roots (equations with real numbers
as their solutions) can be solved
using both the formula and completion
of square method.
*
Be sure to use the correct formula
and be careful in processing the negative
signs in using the formula method.
*
If you are asked to solve a quadratic
equation correct to two decimal places,
then you should use the formula method.
Please
continue to practice solving quadratic
equations by attempting the following:
1.
Solve the equation: a²
- 8a + 16 = 0
2.
Solve the quadratic equation: 3x²-
5x - 4 = 0, giving your answer correct
to two decimal places.
3.
Solve the equation: 4x²
+3 = 8x, using the completion of square
method.
4.
Solve x²-
10x + 21 = 0, using the completion
of square method.
We
will now complete ALGEBRA by
reviewing aspects of GRAPHS.
GRAPHS
Please
be reminded that you are required
to be able to draw straight line and
quadratic graphs. In doing so, it
is important that you pay attention
to the following:
*
You need to complete accurately an
appropriate table of x and y values
or appropriate variables.
*
The x and y axes must be CLEARLY
LABELLED
*
The scale used must be appropriate
to the problem. If one is given, it
must be accurately used.
*
A ruler must be used to draw the straight
line while free hand must be used
to draw the curve.
*
The use of a suitable pencil (HB)
is required.
APPLICATIONS
Graphs
may be used to solve:
*
Quadratic Equations
*
Simultaneous Equations
In
both cases, the solution is represented
by the x and y coordinates at the
points of intersection of the line
and the curve.
EXAMPLE
Plot
the equations y = 3x²-
2x - 1 and y = x + 5.
Hence:
(a) Solve the equation 3x2 - 2x -
1 = 0.
(b)
Solve both equation simultaneously
Completing
the tables:
y
= 3x²
- 2x - 1 y = x + 5
(a)
The solution of 3x²
- 2x - 1 = 0 is the x coordinates
of the points of intersection of the
curve and the x axis.
As
the x axis is y = 0, then at the points
of intersection of y = 0 and y = 3x²
- 2x - 1,
y
= 3x²
- 2x - 1= 0. Therefore the x values
are: 1 and -.33
The
solution of the equation 3x²
2x - 1 = 0 is therefore 1 and - .33
Answer:
1 and - .33
(b)
The points of intersection of the
curve y = 3x²-
2x - 1 and the line y = x + 5 represent
the solution of the simultaneous equations.
Therefore, the solutions are x = -1
, y = 4 and x = 2 , y = 7.
NB.
At the points of intersection,
3x²-
2x - 1 = x + 5.
Simplifying:
3x²-
2x - x - 1 - 5 = 0
...
3x²-
3x - 6 = 0 or x²-
x - 2 = 0
...
the values above also represent the
solutions of the quadratic equation.
x²-
x - 2 = 0.
We
will continue the review of Graphs
next week.
* Clement Radcliffe is principal
of Glenmuir High School in Clarendon.
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