Which option helps show that the claim (\sqrt{2}+\sqrt{3}+\sqrt{6}) is rational is false?

Q: What is the correct answer to this Mathematics MCQ?

The correct answer is A. विभिन्न अपूर्ण वर्गों के मूल स्वतंत्र अपरिमेय भाग देते हैं / Roots of different non-perfect squares give independent irrational parts.

Q: Where can I practice more Mathematics questions?

Open the subject page or level quiz links on this page to practice more active Mathematics MCQs with answers and explanations.

Question

कौन-सा विकल्प (\sqrt{2}+\sqrt{3}+\sqrt{6}) के परिमेय होने के दावे को गलत दिखाने में मदद करता है?
Which option helps show that the claim (\sqrt{2}+\sqrt{3}+\sqrt{6}) is rational is false?

Accepted Answer

विभिन्न अपूर्ण वर्गों के मूल स्वतंत्र अपरिमेय भाग देते हैं / Roots of different non-perfect squares give independent irrational parts. Step 1: (\sqrt{2}), (\sqrt{3}), and (\sqrt{6}) are linked to different non-perfect squares. Step 2: Their irrational parts do not cancel through ordinary addition, so the sum is not rational. Step 3: Avoid false identities such as (\sqrt{a+b}=\sqrt{a}+\sqrt{b}).

Answer

विभिन्न अपूर्ण वर्गों के मूल स्वतंत्र अपरिमेय भाग देते हैं / Roots of different non-perfect squares give independent irrational parts

Answer

सभी वर्गमूल हमेशा परिमेय होते हैं / All square roots are always rational

Answer

तीन अपरिमेय संख्याओं का योग हमेशा परिमेय होता है / The sum of three irrational numbers is always rational

Answer

(\sqrt{6}=\sqrt{2}+\sqrt{3}) होता है / (\sqrt{6}=\sqrt{2}+\sqrt{3})

कौन-सा विकल्प \(\sqrt{2}+\sqrt{3}+\sqrt{6}\) के परिमेय होने के दावे को गलत दिखाने में मदद करता है?

Concept

Why this answer is correct

Exam Tip

Related Mathematics Learning Links

Mathematics Subject

Chapter 1: Real Numbers Quiz

Search Similar MCQs

Daily Challenge

Mathematics Question FAQs

Related Mathematics Questions