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Solve the following absolute value inequality. |3 minus 5 x EndAbsoluteValue less than 03−5x<0

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To solve the inequality \( |3 - 5x| < 0 \), we first need to understand that the absolute value \( |A| \) is always non-negative (i.e., \( |A| \geq 0 \)). Therefore, the expression \( |3 - 5x| \) can never be less than 0.

Given that there are no values of \( x \) for which \( |3 - 5x| < 0 \), the solution to the inequality is that there are no solutions.

In summary, the result of your inequality is that there are no values of \( x \) that satisfy \( |3 - 5x| < 0 \).

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