यदि \(U={x:x \in \mathbb{Z},-4\le x\le 6}\) और \(A=\{x:x \in U,(x-1)(x+2)\ge 0\}\), तो (A') क्या है?

If \(U={x:x \in \mathbb{Z},-4\le x\le 6}\) and \(A=\{x:x \in U,(x-1)(x+2)\ge 0\}\), what is (A')?

Explanation opens after your attempt
Correct Answer

A. ({-1,0})

Step 1

Concept

The solution of ((x-1)(x+2)\ge 0) is \(x\le -2\) or \(x\ge 1\). Thus the middle integers (-1,0) are in the complement.

Step 2

Why this answer is correct

The correct answer is A. ({-1,0}). The solution of ((x-1)(x+2)\ge 0) is \(x\le -2\) or \(x\ge 1\). Thus the middle integers (-1,0) are in the complement.

Step 3

Exam Tip

((x-1)(x+2)\ge 0) का हल \(x\le -2\) या \(x\ge 1\) है। इसलिए बीच के पूर्णांक (-1,0) पूरक में आते हैं।

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Mathematics Answer, Explanation and Revision Hints

यदि \(U={x:x \in \mathbb{Z},-4\le x\le 6}\) और \(A=\{x:x \in U,(x-1)(x+2)\ge 0\}\), तो (A') क्या है? / If \(U={x:x \in \mathbb{Z},-4\le x\le 6}\) and \(A=\{x:x \in U,(x-1)(x+2)\ge 0\}\), what is (A')?

Correct Answer: A. ({-1,0}). Explanation: ((x-1)(x+2)\ge 0) का हल \(x\le -2\) या \(x\ge 1\) है। इसलिए बीच के पूर्णांक (-1,0) पूरक में आते हैं। / The solution of ((x-1)(x+2)\ge 0) is \(x\le -2\) or \(x\ge 1\). Thus the middle integers (-1,0) are in the complement.

Which concept should I revise for this Mathematics MCQ?

The solution of ((x-1)(x+2)\ge 0) is \(x\le -2\) or \(x\ge 1\). Thus the middle integers (-1,0) are in the complement.

What exam hint can help solve this Mathematics question?

((x-1)(x+2)\ge 0) का हल \(x\le -2\) या \(x\ge 1\) है। इसलिए बीच के पूर्णांक (-1,0) पूरक में आते हैं।