Concept-wise Practice

pi MCQ Questions for Class 10

pi se related questions ko ek jagah revise karein. Har question me bilingual content, answer feedback aur explanation available hai.

Practice Questions

3 questions tagged with pi.

संख्या रेखा पर \( \frac{355}{113} \) और \( \pi \) के लिए कौन सा कथन सही है?

Which statement is correct for \( \frac{355}{113} \) and \( \pi \) on the number line?

Explanation opens after your attempt
Correct Answer

C. \( \frac{355}{113}>\pi \)

Step 1

Concept

\( \frac{355}{113}\approx3.14159292 \) and \( \pi\approx3.14159265 \), so the fraction is slightly larger. Do not treat approximations as exactly equal.

Step 2

Why this answer is correct

The correct answer is C. \( \frac{355}{113}>\pi \). \( \frac{355}{113}\approx3.14159292 \) and \( \pi\approx3.14159265 \), so the fraction is slightly larger. Do not treat approximations as exactly equal.

Step 3

Exam Tip

\( \frac{355}{113}\approx3.14159292 \) और \( \pi\approx3.14159265 \), इसलिए भिन्न थोड़ा बड़ा है। अनुमानों को ठीक बराबर न मानें।

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संख्या रेखा पर \( \frac{22}{7} \) और \( \pi \) के स्थानों के बारे में कौन सा कथन सही है?

Which statement about the positions of \( \frac{22}{7} \) and \( \pi \) on the number line is correct?

Explanation opens after your attempt
Correct Answer

A. \( \frac{22}{7}>\pi\)

Step 1

Concept

\( \frac{22}{7}\approx3.142857\) and \( \pi\approx3.14159\), so \( \frac{22}{7}\) is slightly larger. Do not treat common approximations as exactly equal.

Step 2

Why this answer is correct

The correct answer is A. \( \frac{22}{7}>\pi\). \( \frac{22}{7}\approx3.142857\) and \( \pi\approx3.14159\), so \( \frac{22}{7}\) is slightly larger. Do not treat common approximations as exactly equal.

Step 3

Exam Tip

\( \frac{22}{7}\approx3.142857\) और \( \pi\approx3.14159\), इसलिए \( \frac{22}{7}\) थोड़ा बड़ा है। प्रसिद्ध अनुमानों को बराबर न मानें।

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\(\pi\) किस प्रकार की संख्या है?

What type of number is \(\pi\)?

Explanation opens after your attempt
Correct Answer

A. अपरिमेय संख्याIrrational number

Step 1

Concept

The decimal expansion of \(\pi\) is non terminating and non repeating. So it is irrational.

Step 2

Why this answer is correct

The correct answer is A. अपरिमेय संख्या / Irrational number. The decimal expansion of \(\pi\) is non terminating and non repeating. So it is irrational.

Step 3

Exam Tip

\(\pi\) का दशमलव अनंत और अनावर्ती है। इसलिए यह अपरिमेय संख्या है।

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