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When asked to "solve" for the missing "x" variable in a linear equation, we are actually finding the first coordinate of an ordered pair where the "y" value has been established. More specifically,
when asked to "solve" for x in the equation 25 = 3x + 1, the y value has been assigned the number 25 and we are looking for the x value.
This problem could be solved graphically by graphing y = 3x + 1 on a a graphing utility, and consulting the table of values for y = 25. OR... This problem could be solved using the Real Number Properties (describing how numbers behave) and the Laws of Algebra. You may use one or more of the properties to perform "transformations" on the original algebraic statement until the correct form is achieved.  The more frequently used properties include:
Example (1): Solve 12x + 175 = 487 Solution:
12x + 175 = 487 Given Problem
487 = 12x + 175 Optional step-to be consistent with Linear discussion
487-175 = 12x + (175 -175) Subtraction Property
312 = 12x + (0) Substitution
312 = 12x Additive Identity
312/12 = 12x/12 Division Property
26 = (1) x Multiplicative Identity
26 = x Simplify
As expertise is gained in solving basic linear equations, some of the above steps may be combined. Each and every step in the solution process must be justified with an accepted Property or Law. Another form of equation which requires discussion is called "Literal Equation". This type of equation has more than one variable present. You must be advised "which" variable is to be solved for. The procedure is exactly as was demonstrated for other linear equations. The solution for a Literal Equation will not be numerical but rather will be an expressionn in terms of the other variables present. Example (1): Solve d = r * t : for r Solution:
d = r * t Given Problem
d/t = r * t /t Division Property
d/t = r * 1 Substitution
d/t = r Multiplicative Identity
Note: All formulas containing more than one variable actually represent many formulas if you consider them as Literal Equations. |