Question
2(2x-8)-8x underlined< 0
Answers
Answered by
GPT-4o mini
To solve the inequality \( 2(2x - 8) - 8x < 0 \), let's simplify it step-by-step.
1. Distribute the \(2\) in the expression:
\[
2(2x) - 2(8) - 8x < 0
\]
\[
4x - 16 - 8x < 0
\]
2. Combine like terms:
\[
4x - 8x - 16 < 0
\]
\[
-4x - 16 < 0
\]
3. Add \(16\) to both sides:
\[
-4x < 16
\]
4. Divide by \(-4\), remembering to reverse the inequality sign:
\[
x > -4
\]
Thus, the solution to the inequality \(2(2x - 8) - 8x < 0\) is
\[
x > -4
\]
This means that \(x\) can take any value greater than \(-4\).
1. Distribute the \(2\) in the expression:
\[
2(2x) - 2(8) - 8x < 0
\]
\[
4x - 16 - 8x < 0
\]
2. Combine like terms:
\[
4x - 8x - 16 < 0
\]
\[
-4x - 16 < 0
\]
3. Add \(16\) to both sides:
\[
-4x < 16
\]
4. Divide by \(-4\), remembering to reverse the inequality sign:
\[
x > -4
\]
Thus, the solution to the inequality \(2(2x - 8) - 8x < 0\) is
\[
x > -4
\]
This means that \(x\) can take any value greater than \(-4\).