Explain why the equation | x | = √x² has infinitely many solutions.

The absolute value of a number, denoted as |x|, represents its distance from zero on the number line, regardless of direction. This means |x| is always non-negative. For example, |3| = 3 and |-3| = 3. Understanding absolute value is crucial for solving equations involving it, as it leads to two possible cases based on the sign of x.

The square root of a number, represented as √x², is the value that, when multiplied by itself, gives the original number. Since squaring any real number (positive or negative) results in a non-negative value, √x² equals |x|. This relationship is fundamental in understanding how the equation |x| = √x² holds true for all real numbers.

An equation has infinitely many solutions when there are countless values that satisfy it. In the case of |x| = √x², since both sides are equal for all real numbers x, every real number is a solution. This concept is essential in algebra, as it indicates that the solution set is not limited to discrete values but encompasses a continuous range.