असमीका \(\frac{3x+7}{2}\ge -4\) को अंतराल रूप में लिखिए।
Write the inequality \(\frac{3x+7}{2}\ge -4\) in interval form.
Explanation opens after your attempt
A. \([-5,\infty\))
Concept
\(3x+7\ge -8\) gives \(x\ge -5\), so the interval is \([-5,\infty\)). Use a closed endpoint for \(\ge\).
Why this answer is correct
The correct answer is A. \([-5,\infty\)). \(3x+7\ge -8\) gives \(x\ge -5\), so the interval is \([-5,\infty\)). Use a closed endpoint for \(\ge\).
Exam Tip
\(3x+7\ge -8\) से \(x\ge -5\), इसलिए अंतराल \([-5,\infty\)) है। परीक्षा में \(\ge\) के लिए बंद सिरा लगाएं।
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