作者:David Kedrowski 14 年以前
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For absolute value equations of the form |ax+b|=k where k<0, there is no solution, since the expression cannot be a negative distance from 0 on the number line.
For absolute value equations of the form |ax+b|=k, if k is 0 we only need to solve one equation, ax+b=0.
If P and Q are expressions, then to solve |P|=|Q|, we rewrite the absolute value equation as the compound equation
P=Q or P=-Q
and solve for the variable.
If P and Q are expressions, then to solve |P|=|Q|, we rewrite the absolute value equation as the compound equation
P=Q or P=-Q
and solve for the variable.
That is, the equation will be true if the values of P and Q are the same or if they values of P and Q are opposites.
We need to get the absolute value expression by itself on one side of the equation (that is, we need to isolate the absolute value expression).
We need to do this so we can determine how far we're interested in that expression being from zero on a number line.
To solve an absolute value equation of the form |P|=k, where P represents some expression and k is a positive real number, we rewrite the equation as a compound equation.
P=k or P=-k
and then solve for the variable in P.
An absolute value equation, like |x|=6, asks the question
What numbers have a distance of 6 units from zero on a number line?
In this case there are two such numbers, -6 and +6.
That is, |-6|=6 and |6|=6.
The absolute value of a number is that number's distance from zero on a number line.
We take distance to be a nonnegative quantity.