कौन सा कथन सत्य है: संख्या रेखा पर \(\sqrt{2}\) और \(\sqrt{3}\) में कौन दाईं ओर है?

Which statement is true: on the number line, which is to the right, \(\sqrt{2}\) or \(\sqrt{3}\)?

Explanation opens after your attempt
Correct Answer

B. \(\sqrt{3}\) दाईं ओर है\(\sqrt{3}\) is to the right

Step 1

Concept

Since (3>2), \(\sqrt{3}>\sqrt{2}\). For positive square roots, the root of the larger number is larger.

Step 2

Why this answer is correct

The correct answer is B. \(\sqrt{3}\) दाईं ओर है / \(\sqrt{3}\) is to the right. Since (3>2), \(\sqrt{3}>\sqrt{2}\). For positive square roots, the root of the larger number is larger.

Step 3

Exam Tip

क्योंकि (3>2), इसलिए \(\sqrt{3}>\sqrt{2}\) है। धनात्मक वर्गमूलों में बड़ी संख्या का वर्गमूल बड़ा होता है।

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कौन सा कथन सत्य है: संख्या रेखा पर \(\sqrt{2}\) और \(\sqrt{3}\) में कौन दाईं ओर है? / Which statement is true: on the number line, which is to the right, \(\sqrt{2}\) or \(\sqrt{3}\)?

Correct Answer: B. \(\sqrt{3}\) दाईं ओर है / \(\sqrt{3}\) is to the right. Explanation: क्योंकि (3>2), इसलिए \(\sqrt{3}>\sqrt{2}\) है। धनात्मक वर्गमूलों में बड़ी संख्या का वर्गमूल बड़ा होता है। / Since (3>2), \(\sqrt{3}>\sqrt{2}\). For positive square roots, the root of the larger number is larger.

Which concept should I revise for this Mathematics MCQ?

Since (3>2), \(\sqrt{3}>\sqrt{2}\). For positive square roots, the root of the larger number is larger.

What exam hint can help solve this Mathematics question?

क्योंकि (3>2), इसलिए \(\sqrt{3}>\sqrt{2}\) है। धनात्मक वर्गमूलों में बड़ी संख्या का वर्गमूल बड़ा होता है।