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Solve for tt.\newline3t9-3|t| \leq -9\newlineWrite a compound inequality like 1 < x < 3 or like x < 1 or x > 3. Use integers, proper fractions, or improper fractions in simplest form.\newline______

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Q. Solve for tt.\newline3t9-3|t| \leq -9\newlineWrite a compound inequality like 1<x<31 < x < 3 or like x<1x < 1 or x>3x > 3. Use integers, proper fractions, or improper fractions in simplest form.\newline______
  1. Isolate absolute value: First, we need to isolate the absolute value expression by dividing both sides of the inequality by 3-3. Remember that dividing by a negative number reverses the inequality sign.\newline3t9-3|t| \leq -9 \newlinet3|t| \geq 3
  2. Interpret t3|t| \geq 3: Now that we have t3|t| \geq 3, we can interpret this as tt being either greater than or equal to 33 or less than or equal to 3-3. This is because the absolute value of tt is either positive tt or negative tt.\newlinet3t \geq 3 or t3t \leq -3
  3. Write compound inequality: We can now write the compound inequality that represents the solution to the original inequality.\newlineThe compound inequality is t3t \leq -3 or t3t \geq 3.

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