Concept-wise Practice

terminating-decimal MCQ Questions for Class 10

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

Practice Questions

233 questions tagged with terminating-decimal.

\(\frac{19}{2^5\cdot 5^2}\) को \(\frac{N}{10^5}\) के रूप में लिखने पर (N) क्या होगा?

If \(\frac{19}{2^5\cdot 5^2}\) is written as \(\frac{N}{10^5}\), what is (N)?

Explanation opens after your attempt
Correct Answer

C. (2375)

Step 1

Concept

Since \(10^5=2^5\cdot 5^5\), the denominator lacks \(5^3\). Therefore \(N=19\cdot 125=2375\); multiply by the missing factor when making a power of (10).

Step 2

Why this answer is correct

The correct answer is C. (2375). Since \(10^5=2^5\cdot 5^5\), the denominator lacks \(5^3\). Therefore \(N=19\cdot 125=2375\); multiply by the missing factor when making a power of (10).

Step 3

Exam Tip

\(10^5=2^5\cdot 5^5\) है इसलिए हर में \(5^3\) की कमी है। अतः \(N=19\cdot 125=2375\), हर को (10) की घात बनाते समय कमी वाले गुणनखंड से गुणा करें।

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कौन-सा विकल्प (0.0003125) का सरलतम भिन्न रूप है?

Which option is the lowest fraction form of (0.0003125)?

Explanation opens after your attempt
Correct Answer

A. \(\frac{1}{3200}\)

Step 1

Concept

\(0.0003125=\frac{3125}{10000000}\), and reducing by (3125) gives \(\frac{1}{3200}\). Do not forget to cancel common factors in large denominators.

Step 2

Why this answer is correct

The correct answer is A. \(\frac{1}{3200}\). \(0.0003125=\frac{3125}{10000000}\), and reducing by (3125) gives \(\frac{1}{3200}\). Do not forget to cancel common factors in large denominators.

Step 3

Exam Tip

\(0.0003125=\frac{3125}{10000000}\) है और (3125) से सरल करने पर \(\frac{1}{3200}\) मिलता है। बड़े हर में समान गुणनखंड काटना न भूलें।

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(0.03125) को सरलतम भिन्न में लिखने पर हर क्या होगा?

What is the denominator when (0.03125) is written in lowest fraction form?

Explanation opens after your attempt
Correct Answer

B. (32)

Step 1

Concept

\(0.03125=\frac{3125}{100000}=\frac{1}{32}\). Convert a terminating decimal to a fraction and reduce the denominator.

Step 2

Why this answer is correct

The correct answer is B. (32). \(0.03125=\frac{3125}{100000}=\frac{1}{32}\). Convert a terminating decimal to a fraction and reduce the denominator.

Step 3

Exam Tip

\(0.03125=\frac{3125}{100000}=\frac{1}{32}\) है। सांत दशमलव को भिन्न में बदलकर हर को सरलतम रूप में देखें।

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यदि \(\frac{p}{q}\) का दशमलव सांत है और भिन्न सरलतम रूप में है तो \(q^3\) के अभाज्य गुणनखंडों के बारे में क्या सही है?

If \(\frac{p}{q}\) has a terminating decimal and is in lowest form, what is correct about the prime factors of \(q^3\)?

Explanation opens after your attempt
Correct Answer

A. केवल (2) और (5) हो सकते हैंOnly (2) and (5) can occur

Step 1

Concept

For a terminating decimal, the reduced denominator (q) can contain only (2) and (5). In \(q^3\), powers increase but no new prime factor appears.

Step 2

Why this answer is correct

The correct answer is A. केवल (2) और (5) हो सकते हैं / Only (2) and (5) can occur. For a terminating decimal, the reduced denominator (q) can contain only (2) and (5). In \(q^3\), powers increase but no new prime factor appears.

Step 3

Exam Tip

सांत दशमलव में सरलतम हर (q) में केवल (2) और (5) हो सकते हैं। \(q^3\) में घातें बढ़ेंगी लेकिन नया अभाज्य गुणनखंड नहीं आएगा।

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(0.01875) का सरलतम भिन्न रूप कौन-सा है?

Which is the lowest fraction form of (0.01875)?

Explanation opens after your attempt
Correct Answer

A. \(\frac{3}{160}\)

Step 1

Concept

\(0.01875=\frac{1875}{100000}\), and dividing by (625) gives \(\frac{3}{160}\). Convert the decimal to a fraction and reduce fully.

Step 2

Why this answer is correct

The correct answer is A. \(\frac{3}{160}\). \(0.01875=\frac{1875}{100000}\), and dividing by (625) gives \(\frac{3}{160}\). Convert the decimal to a fraction and reduce fully.

Step 3

Exam Tip

\(0.01875=\frac{1875}{100000}\) है और (625) से भाग देने पर \(\frac{3}{160}\) मिलता है। दशमलव से भिन्न बनाकर अंतिम रूप तक सरल करें।

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किसी भिन्न का सरलतम हर \(2^4\cdot 5^3\cdot 3^0\cdot 17^0\) है। दशमलव प्रसार कैसा होगा?

A fraction has reduced denominator \(2^4\cdot 5^3\cdot 3^0\cdot 17^0\). What type of decimal expansion will it have?

Explanation opens after your attempt
Correct Answer

A. सांत और (4) स्थानों पर समाप्तTerminating after (4) places

Step 1

Concept

Both \(3^0\) and \(17^0\) equal (1), so the effective denominator is \(2^4\cdot 5^3\). The larger exponent is (4), so the decimal terminates after (4) places.

Step 2

Why this answer is correct

The correct answer is A. सांत और (4) स्थानों पर समाप्त / Terminating after (4) places. Both \(3^0\) and \(17^0\) equal (1), so the effective denominator is \(2^4\cdot 5^3\). The larger exponent is (4), so the decimal terminates after (4) places.

Step 3

Exam Tip

\(3^0\) और \(17^0\) दोनों (1) हैं इसलिए प्रभावी हर \(2^4\cdot 5^3\) है। बड़ी घात (4) होने से दशमलव (4) स्थानों पर समाप्त होगा।

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यदि किसी सरलतम भिन्न का दशमलव अधिकतम (7) स्थानों पर समाप्त होता है तो उसका हर किसका भाजक होगा?

If a reduced fraction has a decimal terminating in at most (7) places, its denominator will be a divisor of which number?

Explanation opens after your attempt
Correct Answer

C. \(10^7\)

Step 1

Concept

At most (7) decimal places means the fraction can be written with denominator \(10^7\). Therefore the reduced denominator must divide \(10^7\).

Step 2

Why this answer is correct

The correct answer is C. \(10^7\). At most (7) decimal places means the fraction can be written with denominator \(10^7\). Therefore the reduced denominator must divide \(10^7\).

Step 3

Exam Tip

अधिकतम (7) दशमलव स्थानों का अर्थ है भिन्न को \(10^7\) हर के साथ लिखा जा सकता है। इसलिए सरलतम हर \(10^7\) का भाजक होगा।

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यदि सरलतम हर \(q=2^6\cdot 5^6\) है तो दशमलव प्रसार के बारे में क्या निश्चित है?

If the reduced denominator is \(q=2^6\cdot 5^6\), what is certain about the decimal expansion?

Explanation opens after your attempt
Correct Answer

A. ठीक (6) स्थानों पर समाप्तTerminates exactly after (6) places

Step 1

Concept

The reduced denominator is \(10^6\), so the decimal terminates exactly after (6) places. If the denominator is reduced, do not assume further cancellation.

Step 2

Why this answer is correct

The correct answer is A. ठीक (6) स्थानों पर समाप्त / Terminates exactly after (6) places. The reduced denominator is \(10^6\), so the decimal terminates exactly after (6) places. If the denominator is reduced, do not assume further cancellation.

Step 3

Exam Tip

सरलतम हर \(10^6\) है इसलिए दशमलव ठीक (6) स्थानों पर समाप्त होगा। सरलतम हर दिया हो तो अंश से और कटौती नहीं माननी चाहिए।

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\(\frac{13}{2^3\cdot 5^7}\) को \(\frac{N}{10^7}\) के रूप में लिखने पर (N) का सही मान चुनिए।

Choose the correct value of (N) when \(\frac{13}{2^3\cdot 5^7}\) is written as \(\frac{N}{10^7}\).

Explanation opens after your attempt
Correct Answer

B. (208)

Step 1

Concept

To make the denominator \(10^7\), multiply by \(2^4=16\). Therefore \(N=13\cdot 16=208\).

Step 2

Why this answer is correct

The correct answer is B. (208). To make the denominator \(10^7\), multiply by \(2^4=16\). Therefore \(N=13\cdot 16=208\).

Step 3

Exam Tip

हर को \(10^7\) बनाने के लिए \(2^4=16\) से गुणा करना होगा। इसलिए \(N=13\cdot 16=208\)।

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कौन-सा कथन हमेशा सही है जब \(\frac{p}{q}\) सरलतम रूप में हो?

Which statement is always correct when \(\frac{p}{q}\) is in lowest form?

Explanation opens after your attempt
Correct Answer

A. यदि (q) \(10^k\) का भाजक है तो दशमलव सांत होगाIf (q) divides \(10^k\), the decimal terminates

Step 1

Concept

\(10^k\) has only prime factors (2) and (5), so any divisor gives a terminating decimal. The other statements are not always true because extra factors may occur.

Step 2

Why this answer is correct

The correct answer is A. यदि (q) \(10^k\) का भाजक है तो दशमलव सांत होगा / If (q) divides \(10^k\), the decimal terminates. \(10^k\) has only prime factors (2) and (5), so any divisor gives a terminating decimal. The other statements are not always true because extra factors may occur.

Step 3

Exam Tip

\(10^k\) में केवल (2) और (5) के गुणनखंड होते हैं इसलिए उसके भाजक से सांत दशमलव मिलेगा। बाकी कथन अतिरिक्त गुणनखंडों के कारण हमेशा सही नहीं हैं।

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\(\frac{2^4\cdot 5^3}{2^9\cdot 5^5}\) का दशमलव प्रसार कितने स्थानों पर समाप्त होगा?

After how many decimal places will \(\frac{2^4\cdot 5^3}{2^9\cdot 5^5}\) terminate?

Explanation opens after your attempt
Correct Answer

B. (5)

Step 1

Concept

After cancellation, the denominator becomes \(2^5\cdot 5^2\). The larger exponent is (5), so the decimal terminates after (5) places.

Step 2

Why this answer is correct

The correct answer is B. (5). After cancellation, the denominator becomes \(2^5\cdot 5^2\). The larger exponent is (5), so the decimal terminates after (5) places.

Step 3

Exam Tip

कटौती के बाद हर \(2^5\cdot 5^2\) बचेगा। बड़ी घात (5) है इसलिए दशमलव (5) स्थानों पर समाप्त होगा।

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कथन: \(\frac{121}{2^3\cdot 5^2\cdot 11^2}\) का दशमलव सांत है। कारण: सरल करने पर हर में केवल (2) और (5) बचते हैं। सही विकल्प चुनिए।

Assertion: \(\frac{121}{2^3\cdot 5^2\cdot 11^2}\) has a terminating decimal. Reason: After reducing, only (2) and (5) remain in the denominator. Choose the correct option.

Explanation opens after your attempt
Correct Answer

A. कथन और कारण दोनों सही हैं तथा कारण सही व्याख्या हैBoth are true and the reason explains it

Step 1

Concept

Since \(121=11^2\), the reduced denominator is \(2^3\cdot 5^2\). Therefore the reason correctly explains the terminating decimal rule.

Step 2

Why this answer is correct

The correct answer is A. कथन और कारण दोनों सही हैं तथा कारण सही व्याख्या है / Both are true and the reason explains it. Since \(121=11^2\), the reduced denominator is \(2^3\cdot 5^2\). Therefore the reason correctly explains the terminating decimal rule.

Step 3

Exam Tip

\(121=11^2\) कटने पर हर \(2^3\cdot 5^2\) बचता है। इसलिए कारण सांत दशमलव के नियम को सही तरह समझाता है।

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(0.00096) का सरलतम भिन्न रूप कौन-सा है?

Which is the lowest fraction form of (0.00096)?

Explanation opens after your attempt
Correct Answer

A. \(\frac{3}{3125}\)

Step 1

Concept

\(0.00096=\frac{96}{100000}\), and reducing by (32) gives \(\frac{3}{3125}\). Even for small decimals, check the greatest common factor carefully.

Step 2

Why this answer is correct

The correct answer is A. \(\frac{3}{3125}\). \(0.00096=\frac{96}{100000}\), and reducing by (32) gives \(\frac{3}{3125}\). Even for small decimals, check the greatest common factor carefully.

Step 3

Exam Tip

\(0.00096=\frac{96}{100000}\) है और (32) से सरल करने पर \(\frac{3}{3125}\) मिलता है। छोटे दशमलव में भी महत्तम सामान्य गुणनखंड ध्यान से देखें।

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किस सरलतम हर से ठीक (7) दशमलव स्थान मिलेंगे?

Which reduced denominator will give exactly (7) decimal places?

Explanation opens after your attempt
Correct Answer

B. \(2^7\cdot 5^3\)

Step 1

Concept

For exactly (7) places, the larger exponent of (2) and (5) must be (7). Only \(2^7\cdot 5^3\) satisfies this.

Step 2

Why this answer is correct

The correct answer is B. \(2^7\cdot 5^3\). For exactly (7) places, the larger exponent of (2) and (5) must be (7). Only \(2^7\cdot 5^3\) satisfies this.

Step 3

Exam Tip

ठीक (7) स्थानों के लिए (2) और (5) की बड़ी घात (7) होनी चाहिए। दिए विकल्पों में केवल \(2^7\cdot 5^3\) यह शर्त पूरी करता है।

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\(\frac{147}{2\cdot 3\cdot 5^4\cdot 7^2}\) का दशमलव प्रसार कैसा होगा?

What type of decimal expansion will \(\frac{147}{2\cdot 3\cdot 5^4\cdot 7^2}\) have?

Explanation opens after your attempt
Correct Answer

A. सांत और (4) स्थानों पर समाप्तTerminating after (4) places

Step 1

Concept

Since \(147=3\cdot 7^2\), the reduced denominator is \(2\cdot 5^4\). The larger exponent is (4), so the decimal terminates after (4) places.

Step 2

Why this answer is correct

The correct answer is A. सांत और (4) स्थानों पर समाप्त / Terminating after (4) places. Since \(147=3\cdot 7^2\), the reduced denominator is \(2\cdot 5^4\). The larger exponent is (4), so the decimal terminates after (4) places.

Step 3

Exam Tip

\(147=3\cdot 7^2\) कटने पर हर \(2\cdot 5^4\) बचेगा। बड़ी घात (4) है इसलिए दशमलव (4) स्थानों पर समाप्त होगा।

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यदि \(\frac{p}{q}\) सरलतम रूप में है और \(q=2^8\cdot 5^3\) है तो दशमलव प्रसार ठीक कितने स्थानों पर समाप्त होगा?

If \(\frac{p}{q}\) is in lowest form and \(q=2^8\cdot 5^3\), after exactly how many decimal places will the decimal expansion terminate?

Explanation opens after your attempt
Correct Answer

C. (8) स्थान(8) places

Step 1

Concept

The denominator has only (2) and (5), so the decimal terminates with the larger exponent (8). In exams, use the larger exponent, not the sum.

Step 2

Why this answer is correct

The correct answer is C. (8) स्थान / (8) places. The denominator has only (2) and (5), so the decimal terminates with the larger exponent (8). In exams, use the larger exponent, not the sum.

Step 3

Exam Tip

हर में केवल (2) और (5) हैं इसलिए दशमलव सांत होगा और स्थान बड़ी घात (8) के बराबर होंगे। परीक्षा में घातों का योग नहीं बड़ी घात देखें।

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\(\frac{242}{2^3\cdot 5^4\cdot 11^2}\) को सरलतम रूप में लिखने के बाद उसका दशमलव प्रसार कितने स्थानों पर समाप्त होगा?

After reducing \(\frac{242}{2^3\cdot 5^4\cdot 11^2}\) to lowest form, after how many decimal places will its decimal expansion terminate?

Explanation opens after your attempt
Correct Answer

B. (4) स्थान(4) places

Step 1

Concept

Since \(242=2\cdot 11^2\), the reduced denominator becomes \(2^2\cdot 5^4\). The larger exponent is (4), so reduce first and then count decimal places.

Step 2

Why this answer is correct

The correct answer is B. (4) स्थान / (4) places. Since \(242=2\cdot 11^2\), the reduced denominator becomes \(2^2\cdot 5^4\). The larger exponent is (4), so reduce first and then count decimal places.

Step 3

Exam Tip

\(242=2\cdot 11^2\), इसलिए कटौती के बाद हर \(2^2\cdot 5^4\) बचेगा। बड़ी घात (4) है, इसलिए पहले सरल करें फिर दशमलव स्थान गिनें।

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यदि \(q=2^r5^s\) और \(\frac{p}{q}\) सरलतम रूप में है, तो दशमलव को \(\frac{N}{10^k}\) के रूप में लिखने के लिए न्यूनतम (k) क्या होगा?

If \(q=2^r5^s\) and \(\frac{p}{q}\) is in lowest form, what is the minimum (k) to write the decimal as \(\frac{N}{10^k}\)?

Explanation opens after your attempt
Correct Answer

B. (\max(r,s))

Step 1

Concept

To form \(10^k=2^k5^k\), both powers must reach at least the larger exponent. Therefore the minimum (k=\max(r,s)).

Step 2

Why this answer is correct

The correct answer is B. (\max(r,s)). To form \(10^k=2^k5^k\), both powers must reach at least the larger exponent. Therefore the minimum (k=\max(r,s)).

Step 3

Exam Tip

\(10^k=2^k5^k\) बनाने के लिए दोनों घातें कम से कम बड़ी घात तक पहुँचनी चाहिए। इसलिए न्यूनतम (k=\max(r,s)) है।

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कौन-सा विकल्प (0.000625) का सरलतम भिन्न रूप है?

Which option is the lowest fraction form of (0.000625)?

Explanation opens after your attempt
Correct Answer

A. \(\frac{1}{1600}\)

Step 1

Concept

\(0.000625=\frac{625}{1000000}\), and reducing by (625) gives \(\frac{1}{1600}\). Do not fear large denominators; cancel common factors.

Step 2

Why this answer is correct

The correct answer is A. \(\frac{1}{1600}\). \(0.000625=\frac{625}{1000000}\), and reducing by (625) gives \(\frac{1}{1600}\). Do not fear large denominators; cancel common factors.

Step 3

Exam Tip

\(0.000625=\frac{625}{1000000}\), जिसे (625) से सरल करने पर \(\frac{1}{1600}\) मिलता है। बड़े हर से डरें नहीं, समान गुणनखंड काटें।

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(0.0625) को सरलतम भिन्न में लिखने पर हर क्या होगा?

What is the denominator when (0.0625) is written in lowest fraction form?

Explanation opens after your attempt
Correct Answer

B. (16)

Step 1

Concept

\(0.0625=\frac{625}{10000}=\frac{1}{16}\). Convert a terminating decimal to a fraction and always reduce the denominator.

Step 2

Why this answer is correct

The correct answer is B. (16). \(0.0625=\frac{625}{10000}=\frac{1}{16}\). Convert a terminating decimal to a fraction and always reduce the denominator.

Step 3

Exam Tip

\(0.0625=\frac{625}{10000}=\frac{1}{16}\)। सांत दशमलव को भिन्न में बदलकर हर को सरलतम रूप में अवश्य देखें।

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(0.0375) का सरलतम भिन्न रूप कौन-सा है?

Which is the lowest fraction form of (0.0375)?

Explanation opens after your attempt
Correct Answer

A. \(\frac{3}{80}\)

Step 1

Concept

\(0.0375=\frac{375}{10000}\), and dividing by (125) gives \(\frac{3}{80}\). Convert the decimal to a fraction and reduce fully.

Step 2

Why this answer is correct

The correct answer is A. \(\frac{3}{80}\). \(0.0375=\frac{375}{10000}\), and dividing by (125) gives \(\frac{3}{80}\). Convert the decimal to a fraction and reduce fully.

Step 3

Exam Tip

\(0.0375=\frac{375}{10000}\) और (125) से भाग देने पर \(\frac{3}{80}\) मिलता है। दशमलव से भिन्न बनाकर अंतिम रूप तक सरल करें।

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किसी भिन्न का सरलतम हर \(2^3\cdot 5^2\cdot 3^0\cdot 11^0\) है। दशमलव प्रसार कैसा होगा?

A fraction has reduced denominator \(2^3\cdot 5^2\cdot 3^0\cdot 11^0\). What type of decimal expansion will it have?

Explanation opens after your attempt
Correct Answer

A. सांत और (3) स्थानों पर समाप्तTerminating after (3) places

Step 1

Concept

Both \(3^0\) and \(11^0\) equal (1), so the effective denominator is \(2^3\cdot 5^2\). The larger exponent is (3), so the decimal terminates after (3) places.

Step 2

Why this answer is correct

The correct answer is A. सांत और (3) स्थानों पर समाप्त / Terminating after (3) places. Both \(3^0\) and \(11^0\) equal (1), so the effective denominator is \(2^3\cdot 5^2\). The larger exponent is (3), so the decimal terminates after (3) places.

Step 3

Exam Tip

\(3^0\) और \(11^0\) दोनों (1) हैं, इसलिए हर में केवल \(2^3\cdot 5^2\) प्रभावी है। बड़ी घात (3) है, इसलिए दशमलव (3) स्थानों पर समाप्त होगा।

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यदि किसी सरलतम भिन्न का दशमलव अधिकतम (5) स्थानों पर समाप्त होता है, तो उसका हर किसका भाजक होगा?

If a reduced fraction has a decimal terminating in at most (5) places, its denominator will be a divisor of which number?

Explanation opens after your attempt
Correct Answer

B. \(10^5\)

Step 1

Concept

At most (5) decimal places means the fraction can be written with denominator \(10^5\). The reduced denominator must divide \(10^5\).

Step 2

Why this answer is correct

The correct answer is B. \(10^5\). At most (5) decimal places means the fraction can be written with denominator \(10^5\). The reduced denominator must divide \(10^5\).

Step 3

Exam Tip

अधिकतम (5) दशमलव स्थानों का अर्थ है भिन्न को \(10^5\) हर के साथ लिखा जा सकता है। सरलतम हर \(10^5\) का भाजक होगा।

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यदि सरलतम हर \(q=2^5\cdot 5^5\) है और अंश (10) से विभाज्य नहीं है, तो दशमलव प्रसार के बारे में क्या निश्चित है?

If the reduced denominator is \(q=2^5\cdot 5^5\) and the numerator is not divisible by (10), what is certain about the decimal expansion?

Explanation opens after your attempt
Correct Answer

A. ठीक (5) स्थानों पर समाप्तTerminates exactly after (5) places

Step 1

Concept

The reduced denominator is \(10^5\), so the decimal terminates exactly after (5) places. The numerator condition indicates no further cancellation.

Step 2

Why this answer is correct

The correct answer is A. ठीक (5) स्थानों पर समाप्त / Terminates exactly after (5) places. The reduced denominator is \(10^5\), so the decimal terminates exactly after (5) places. The numerator condition indicates no further cancellation.

Step 3

Exam Tip

सरलतम हर \(10^5\) है, इसलिए दशमलव ठीक (5) स्थानों पर समाप्त होगा। अंश की दी गई बात अतिरिक्त कटौती न होने का संकेत देती है।

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\(\frac{11}{2^6\cdot 5^2}\) को \(\frac{N}{10^6}\) के रूप में लिखने पर (N) का सही मान चुनिए।

Choose the correct value of (N) when \(\frac{11}{2^6\cdot 5^2}\) is written as \(\frac{N}{10^6}\).

Explanation opens after your attempt
Correct Answer

C. (6875)

Step 1

Concept

To make the denominator \(10^6\), multiply by \(5^4=625\). Therefore \(N=11\cdot 625=6875\).

Step 2

Why this answer is correct

The correct answer is C. (6875). To make the denominator \(10^6\), multiply by \(5^4=625\). Therefore \(N=11\cdot 625=6875\).

Step 3

Exam Tip

हर को \(10^6\) बनाने के लिए \(5^4=625\) से गुणा करना होगा। इसलिए \(N=11\cdot 625=6875\)।

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\(\frac{189}{2^2\cdot 3^3\cdot 5\cdot 7}\) का दशमलव प्रसार कैसा होगा?

What type of decimal expansion will \(\frac{189}{2^2\cdot 3^3\cdot 5\cdot 7}\) have?

Explanation opens after your attempt
Correct Answer

A. सांत और (2) स्थानों पर समाप्तTerminating after (2) places

Step 1

Concept

Since \(189=3^3\cdot 7\), the reduced denominator is \(2^2\cdot 5\). The larger exponent is (2), so the decimal terminates after (2) places.

Step 2

Why this answer is correct

The correct answer is A. सांत और (2) स्थानों पर समाप्त / Terminating after (2) places. Since \(189=3^3\cdot 7\), the reduced denominator is \(2^2\cdot 5\). The larger exponent is (2), so the decimal terminates after (2) places.

Step 3

Exam Tip

\(189=3^3\cdot 7\), इसलिए सरल हर \(2^2\cdot 5\) बचेगा। बड़ी घात (2) है, इसलिए दशमलव (2) स्थानों पर समाप्त होगा।

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कौन-सा कथन हमेशा सत्य है, जब \(\frac{p}{q}\) सरलतम रूप में हो?

Which statement is always true when \(\frac{p}{q}\) is in lowest form?

Explanation opens after your attempt
Correct Answer

C. यदि \(q=2^m5^n\), तो दशमलव सांत होगाIf \(q=2^m5^n\), the decimal terminates

Step 1

Concept

A decimal terminates when the reduced denominator has only (2) and (5). The other statements are incomplete because other prime factors may also be present.

Step 2

Why this answer is correct

The correct answer is C. यदि \(q=2^m5^n\), तो दशमलव सांत होगा / If \(q=2^m5^n\), the decimal terminates. A decimal terminates when the reduced denominator has only (2) and (5). The other statements are incomplete because other prime factors may also be present.

Step 3

Exam Tip

सरलतम हर में केवल (2) और (5) होने पर दशमलव सांत होता है। बाकी कथन अधूरे हैं क्योंकि अन्य अभाज्य गुणनखंड भी हो सकते हैं।

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\(\frac{2^3\cdot 5^2}{2^7\cdot 5^5}\) का दशमलव प्रसार कितने स्थानों पर समाप्त होगा?

After how many decimal places will \(\frac{2^3\cdot 5^2}{2^7\cdot 5^5}\) terminate?

Explanation opens after your attempt
Correct Answer

B. (4)

Step 1

Concept

After cancellation, the denominator becomes \(2^4\cdot 5^3\). The larger exponent is (4), so the decimal terminates after (4) places.

Step 2

Why this answer is correct

The correct answer is B. (4). After cancellation, the denominator becomes \(2^4\cdot 5^3\). The larger exponent is (4), so the decimal terminates after (4) places.

Step 3

Exam Tip

कटौती के बाद हर \(2^4\cdot 5^3\) बचेगा। बड़ी घात (4) है, इसलिए दशमलव (4) स्थानों पर समाप्त होगा।

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कथन: \(\frac{63}{2^4\cdot 3^2\cdot 5^3\cdot 7}\) का दशमलव सांत है। कारण: सरल करने पर हर में केवल (2) और (5) बचते हैं। सही विकल्प चुनिए।

Assertion: \(\frac{63}{2^4\cdot 3^2\cdot 5^3\cdot 7}\) has a terminating decimal. Reason: After reducing, only (2) and (5) remain in the denominator. Choose the correct option.

Explanation opens after your attempt
Correct Answer

A. कथन और कारण दोनों सही हैं तथा कारण सही व्याख्या हैBoth are true and the reason explains it

Step 1

Concept

Since \(63=3^2\cdot 7\), the reduced denominator is \(2^4\cdot 5^3\). The reason directly explains the terminating decimal rule.

Step 2

Why this answer is correct

The correct answer is A. कथन और कारण दोनों सही हैं तथा कारण सही व्याख्या है / Both are true and the reason explains it. Since \(63=3^2\cdot 7\), the reduced denominator is \(2^4\cdot 5^3\). The reason directly explains the terminating decimal rule.

Step 3

Exam Tip

\(63=3^2\cdot 7\), इसलिए कटौती के बाद हर \(2^4\cdot 5^3\) बचेगा। कारण सीधे सांत दशमलव का नियम समझाता है।

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(0.00072) को सरलतम भिन्न में लिखने पर हर क्या होगा?

What is the denominator when (0.00072) is written as a fraction in lowest form?

Explanation opens after your attempt
Correct Answer

A. (1250)

Step 1

Concept

\(0.00072=\frac{72}{100000}\), and reducing by (8) gives \(\frac{9}{12500}\). So the correct denominator is (12500); check the common factor carefully in small decimals.

Step 2

Why this answer is correct

The correct answer is A. (1250). \(0.00072=\frac{72}{100000}\), and reducing by (8) gives \(\frac{9}{12500}\). So the correct denominator is (12500); check the common factor carefully in small decimals.

Step 3

Exam Tip

\(0.00072=\frac{72}{100000}\) और (72) से सरल करने पर \(\frac{9}{12500}\) मिलता है। इसलिए सही हर (12500) है, छोटे दशमलवों में महत्तम सामान्य गुणनखंड ध्यान से देखें।

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