Solve
|6 - 4x| < -13
trick question. |u| is always positive
A number in the modulus can't be negative, it will always be positive.
To solve the inequality |6 - 4x| < -13, we need to find the values of x that satisfy the inequality.
First, let's consider the absolute value "| |" of an expression. The absolute value of any number or expression is always non-negative (greater than or equal to zero). This means that |6 - 4x| cannot be less than -13, because -13 is negative.
Since the absolute value cannot be less than a negative number, the given inequality |6 - 4x| < -13 has no solution.