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© Boardworks Ltd 20141 of 9 © Boardworks Ltd 20141 of 9
Maths
Algebra 2
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Linear simultaneous equations
An equation with two unknowns has an infinite number of solution pairs. For example:
x + y = 3
is true when x = 1 and y = 2
x = –4 and y = 7
x = 6.4 and y = –3.4 and so on.
We can represent the set of solutions graphically.
0
3
3 x
y
The coordinates of every point on the line satisfy the equation.
x + y = 3
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Linear simultaneous equations
Similarly, an infinite number of solution pairs exist for the equation
y – x = 1
Again, we can represent the set of solutions graphically.
There is one pair of values that satisfies both these equations simultaneously.
This pair of values corresponds to the point where the lines x + y = 3 and y – x = 1 intersect:
This is the point (1, 2). At this point x = 1 and y = 2.
0 x
y
-1
1
y – x = 1
x + y = 3
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Linear simultaneous equations
Two linear equations with two unknowns, such as x and y, can be solved simultaneously to give a single pair of solutions.
Linear simultaneous equations can be solved algebraically using:
The substitution method.The elimination method, or
The solution to the equations can be illustrated graphically by finding the points where the two lines representing the equations intersect.
When will a pair of linear simultaneous equations have no solutions?
In the case where the lines corresponding to the equations are parallel, they will never intersect and so there are no solutions.
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The elimination method
If two equations are true for the same values, we can add or subtract them to give a third equation that is also true for the same values. For example:
Subtracting gives: 3x + 7y = 223x + 4y = 10–
3y = 12
The terms in x have been eliminated.
y = 4
Substituting y = 4 into the first equation gives:
3x + 28 = 22
x = –23x = –6
Solve the simultaneous equations3x + 7y = 22 and 3x + 4y = 10.
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The elimination method
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y = 2x – 3
2x + 3y = 23
Solve:
The substitution method
Two simultaneous equations can also be solved by substituting one equation into the other. For example:
Substitute 1 into 2 :2x + 3(2x – 3) = 23
2x + 6x – 9 = 23
8x – 9 = 23
8x = 32
x = 4
1
2
y = 2x – 3
Call these equations 1 and 2 .
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The substitution method
y = 2 × 4 – 3
y = 5
Substituting x = 4 into 1 gives
Check by substituting x = 4 and y = 5 into 2 :
So the solution is x = 4, y = 5.
LHS = 2 × 4 + 3 × 5
= 8 + 15
= 23
= RHS
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