असमानता (2x-5y<10) के ग्राफ में मूल-बिंदु जांचने पर कौन सा छायांकन सही होगा?

For the graph of (2x-5y<10), which shading is correct after testing the origin?

Explanation opens after your attempt
Correct Answer

B. टूटी सीमा और मूल-बिंदु वाली ओरDashed boundary and toward the origin

Step 1

Concept

Substituting the origin gives (0<10), which is true. Because the inequality is strict, the boundary is dashed and shading is toward the origin.

Step 2

Why this answer is correct

The correct answer is B. टूटी सीमा और मूल-बिंदु वाली ओर / Dashed boundary and toward the origin. Substituting the origin gives (0<10), which is true. Because the inequality is strict, the boundary is dashed and shading is toward the origin.

Step 3

Exam Tip

मूल-बिंदु रखने पर (0<10) सही है। कठोर असमानता के कारण सीमा टूटी होगी और छायांकन मूल-बिंदु वाली ओर होगा।

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Mathematics Answer, Explanation and Revision Hints

असमानता (2x-5y<10) के ग्राफ में मूल-बिंदु जांचने पर कौन सा छायांकन सही होगा? / For the graph of (2x-5y<10), which shading is correct after testing the origin?

Correct Answer: B. टूटी सीमा और मूल-बिंदु वाली ओर / Dashed boundary and toward the origin. Explanation: मूल-बिंदु रखने पर (0<10) सही है। कठोर असमानता के कारण सीमा टूटी होगी और छायांकन मूल-बिंदु वाली ओर होगा। / Substituting the origin gives (0<10), which is true. Because the inequality is strict, the boundary is dashed and shading is toward the origin.

Which concept should I revise for this Mathematics MCQ?

Substituting the origin gives (0<10), which is true. Because the inequality is strict, the boundary is dashed and shading is toward the origin.

What exam hint can help solve this Mathematics question?

मूल-बिंदु रखने पर (0<10) सही है। कठोर असमानता के कारण सीमा टूटी होगी और छायांकन मूल-बिंदु वाली ओर होगा।