Shane Partridge Mathematics
Simultaneous Equation
Equate either Like Terms X or Y to
equal Zero.
Hence 3 x (1) - 4 x (2) corresponds to
the [x] Terms.
Thus 3 x (1) - 4 x (2) Equates the [X] Term
on both Equations to Zero.
Thus the Nullified Term is used
throughout the Equation.
Nullify Either Term X or Y .
Thus in this case X is Evaluated to 0.
Using 3 x (1) - 4 x (2)
Simultaneous Equation
Upon Nullify [x] Term to Zero.
Corresponding Equate the [y] Term using
[3 x (1) - 4 x (2) that Nullified [X] term
to Zero.
Thus the Equation is (-18y)
Simultaneous Equation
Corresponding equate both of the sums
of the Equations.
[28] and [12] using same Terminology.
[3 x (1) - 4 x (2)
Thus the Sum is [36]
Simultaneous Equation
Upon achieving the Values ......................
[-18y] and 36 .
Find the Value of [Y].
Therefore [y] = [-2]
Simultaneous Equation
Once the Value of [Y] is determined
which equates to [-2]
Use the Like Terms Associations of
Either Equation to find the Value [X].
In this case the first Equation is used.
Deciphering by using Like Terms
Association . [x] = Value of [6].
Simultaneous Equation
Therefore Completing the Equations.
[Y]=[2] and [x]=[6].
Then check both of the Equations to
verify that the Values attained are
verfified by the Simultaneous equations.
