Muft Shiksha™ एक 100% Free Education Portal है 🇮🇳, जिसका उद्देश्य Class 9–12 के हर विद्यार्थी तक High-Quality Education को पूरी तरह मुफ्त पहुँचाना है। 🇮🇳 हम मानते हैं कि अच्छी शिक्षा किसी student की आर्थिक स्थिति पर निर्भर नहीं होनी चाहिए। 🇮🇳 हर विद्यार्थी को वही Quality Study Material, MCQs, Quizzes, Exam Preparation, Concept-Based Learning और Bilingual Support मिलना चाहिए, जो आमतौर पर महंगी Coaching या Premium Platforms में मिलता है। Muft Shiksha™ 🇮🇳 इसी सोच के साथ बनाया गया है • Muft Shiksha™ एक 100% Free Education Portal है 🇮🇳, जिसका उद्देश्य Class 9–12 के हर विद्यार्थी तक High-Quality Education को पूरी तरह मुफ्त पहुँचाना है। 🇮🇳 हम मानते हैं कि अच्छी शिक्षा किसी student की आर्थिक स्थिति पर निर्भर नहीं होनी चाहिए। 🇮🇳 हर विद्यार्थी को वही Quality Study Material, MCQs, Quizzes, Exam Preparation, Concept-Based Learning और Bilingual Support मिलना चाहिए, जो आमतौर पर महंगी Coaching या Premium Platforms में मिलता है। Muft Shiksha™ 🇮🇳 इसी सोच के साथ बनाया गया है • Muft Shiksha™ एक 100% Free Education Portal है 🇮🇳, जिसका उद्देश्य Class 9–12 के हर विद्यार्थी तक High-Quality Education को पूरी तरह मुफ्त पहुँचाना है। 🇮🇳 हम मानते हैं कि अच्छी शिक्षा किसी student की आर्थिक स्थिति पर निर्भर नहीं होनी चाहिए। 🇮🇳 हर विद्यार्थी को वही Quality Study Material, MCQs, Quizzes, Exam Preparation, Concept-Based Learning और Bilingual Support मिलना चाहिए, जो आमतौर पर महंगी Coaching या Premium Platforms में मिलता है। Muft Shiksha™ 🇮🇳 इसी सोच के साथ बनाया गया है
The denominator has only (2) and (5), so the decimal terminates with the larger exponent (9). In exams, use the larger exponent instead of adding exponents.
Step 2
Why this answer is correct
The correct answer is C. (9) स्थान / (9) places. The denominator has only (2) and (5), so the decimal terminates with the larger exponent (9). In exams, use the larger exponent instead of adding exponents.
Step 3
Exam Tip
हर में केवल (2) और (5) हैं इसलिए दशमलव सांत होगा और स्थान बड़ी घात (9) के बराबर होंगे। परीक्षा में घातों को जोड़ने की जगह बड़ी घात देखें।
Since \(484=2^2\cdot 11^2\), the reduced denominator is \(2^2\cdot 5^3\). The larger exponent is (3), so reduce first and then count decimal places.
Step 2
Why this answer is correct
The correct answer is B. (3) स्थान / (3) places. Since \(484=2^2\cdot 11^2\), the reduced denominator is \(2^2\cdot 5^3\). The larger exponent is (3), so reduce first and then count decimal places.
Step 3
Exam Tip
\(484=2^2\cdot 11^2\) कटने पर हर \(2^2\cdot 5^3\) बचता है। बड़ी घात (3) है इसलिए पहले सरल करें फिर दशमलव स्थान गिनें।
For termination, \(3^2\) and \(17^2\) must cancel completely, so (n=2601). For the least value, cancel only the factors other than (2) and (5).
Step 2
Why this answer is correct
The correct answer is C. (2601). For termination, \(3^2\) and \(17^2\) must cancel completely, so (n=2601). For the least value, cancel only the factors other than (2) and (5).
Step 3
Exam Tip
सांत दशमलव के लिए \(3^2\) और \(17^2\) पूरी तरह कटने चाहिए इसलिए (n=2601) होगा। न्यूनतम मान में केवल (2) और (5) के अलावा गुणनखंड काटें।
\(0.4272727\ldots=\frac{423}{990}=\frac{47}{110}\), so the denominator is (110). In mixed recurring decimals, the final fraction must be reduced.
Step 2
Why this answer is correct
The correct answer is B. (110). \(0.4272727\ldots=\frac{423}{990}=\frac{47}{110}\), so the denominator is (110). In mixed recurring decimals, the final fraction must be reduced.
Step 3
Exam Tip
\(0.4272727\ldots=\frac{423}{990}=\frac{47}{110}\) है इसलिए हर (110) है। मिश्रित आवर्ती दशमलव में अंतिम भिन्न को सरल करना जरूरी है।
\(0.\overline{108}=\frac{108}{999}=\frac{4}{37}\). First form the denominator with (9)'s according to the repeating digits and then reduce.
Step 2
Why this answer is correct
The correct answer is B. (37). \(0.\overline{108}=\frac{108}{999}=\frac{4}{37}\). First form the denominator with (9)'s according to the repeating digits and then reduce.
Step 3
Exam Tip
\(0.\overline{108}=\frac{108}{999}=\frac{4}{37}\) है। आवर्ती अंकों की संख्या के अनुसार पहले (9) वाला हर बनाएं फिर सरल करें।
After cancelling \(55=5\cdot 11\), the denominator becomes \(2^2\cdot 5^2\cdot 11\). Since (11) remains, the decimal is non-terminating recurring.
Step 2
Why this answer is correct
The correct answer is B. असांत आवर्ती / Non-terminating recurring. After cancelling \(55=5\cdot 11\), the denominator becomes \(2^2\cdot 5^2\cdot 11\). Since (11) remains, the decimal is non-terminating recurring.
Step 3
Exam Tip
\(55=5\cdot 11\) कटने पर हर \(2^2\cdot 5^2\cdot 11\) बचेगा। (11) बचने से दशमलव असांत आवर्ती होगा।
For exactly (8) places, the larger exponent of (2) and (5) must be (8). Only \(2^8\cdot 5^3\) satisfies this.
Step 2
Why this answer is correct
The correct answer is B. \(2^8\cdot 5^3\). For exactly (8) places, the larger exponent of (2) and (5) must be (8). Only \(2^8\cdot 5^3\) satisfies this.
Step 3
Exam Tip
ठीक (8) स्थानों के लिए (2) और (5) की बड़ी घात (8) होनी चाहिए। दिए विकल्पों में केवल \(2^8\cdot 5^3\) यह शर्त पूरी करता है।
\(0.00084=\frac{84}{100000}\), and reducing by (4) gives \(\frac{21}{25000}\). Even for small decimals, check the greatest common factor carefully.
Step 2
Why this answer is correct
The correct answer is A. \(\frac{21}{25000}\). \(0.00084=\frac{84}{100000}\), and reducing by (4) gives \(\frac{21}{25000}\). Even for small decimals, check the greatest common factor carefully.
Step 3
Exam Tip
\(0.00084=\frac{84}{100000}\) है और (4) से सरल करने पर \(\frac{21}{25000}\) मिलता है। छोटे दशमलव में भी महत्तम सामान्य गुणनखंड ध्यान से देखें।
The factor (17) makes the decimal recurring, and the larger exponent among (2) and (5) is (6), giving the initial non-repeating part. Understand recurrence and delay separately.
Step 2
Why this answer is correct
The correct answer is B. (6). The factor (17) makes the decimal recurring, and the larger exponent among (2) and (5) is (6), giving the initial non-repeating part. Understand recurrence and delay separately.
Step 3
Exam Tip
(17) के कारण दशमलव आवर्ती होगा और (2), (5) की बड़ी घात (6) आरंभिक अनावर्ती भाग देगी। आवर्तीपन और आरंभिक देरी को अलग-अलग समझें।
A. कथन और कारण दोनों सही हैं तथा कारण सही व्याख्या है/Both are true and the reason explains it
Step 1
Concept
Since \(169=13^2\), the reduced denominator is \(2^3\cdot 5^4\). 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 \(169=13^2\), the reduced denominator is \(2^3\cdot 5^4\). Therefore the reason correctly explains the terminating decimal rule.
Step 3
Exam Tip
\(169=13^2\) कटने पर हर \(2^3\cdot 5^4\) बचता है। इसलिए कारण सांत दशमलव के नियम को सही तरह समझाता है।
After cancellation, the denominator becomes \(2^7\cdot 5^3\). The larger exponent is (7), so the decimal terminates after (7) places.
Step 2
Why this answer is correct
The correct answer is C. (7). After cancellation, the denominator becomes \(2^7\cdot 5^3\). The larger exponent is (7), so the decimal terminates after (7) places.
Step 3
Exam Tip
कटौती के बाद हर \(2^7\cdot 5^3\) बचेगा। बड़ी घात (7) है इसलिए दशमलव (7) स्थानों पर समाप्त होगा।
B. ठीक (9) या (10) स्थान/Exactly (9) or (10) places
Step 1
Concept
Since (q) has only (2) and (5), the decimal terminates. Not dividing \(10^8\) means the larger exponent is (9) or (10).
Step 2
Why this answer is correct
The correct answer is B. ठीक (9) या (10) स्थान / Exactly (9) or (10) places. Since (q) has only (2) and (5), the decimal terminates. Not dividing \(10^8\) means the larger exponent is (9) or (10).
Step 3
Exam Tip
(q) में केवल (2) और (5) होंगे इसलिए दशमलव सांत है। \(10^8\) का भाजक न होने से बड़ी घात (9) या (10) होगी।
Two non-repeating zeros and two repeating digits give \(\frac{54}{9900}\). Reducing it gives \(\frac{3}{550}\).
Step 2
Why this answer is correct
The correct answer is A. \(\frac{3}{550}\). Two non-repeating zeros and two repeating digits give \(\frac{54}{9900}\). Reducing it gives \(\frac{3}{550}\).
Step 3
Exam Tip
दो अनावर्ती शून्य और दो आवर्ती अंकों से \(\frac{54}{9900}\) बनता है। इसे सरल करने पर \(\frac{3}{550}\) मिलता है।
After cancellation, the denominator becomes \(2^5\cdot 5^4\). 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 \(2^5\cdot 5^4\). The larger exponent is (5), so the decimal terminates after (5) places.
Step 3
Exam Tip
कटौती के बाद हर \(2^5\cdot 5^4\) बचेगा। बड़ी घात (5) है इसलिए दशमलव (5) स्थानों पर समाप्त होगा।
The factors \(3^4\) and (19) must be removed from the reduced denominator, so the minimum factor is \(81\cdot 19=1539\). Factors (2) and (5) may remain.
Step 2
Why this answer is correct
The correct answer is B. (1539). The factors \(3^4\) and (19) must be removed from the reduced denominator, so the minimum factor is \(81\cdot 19=1539\). Factors (2) and (5) may remain.
Step 3
Exam Tip
सरलतम हर से \(3^4\) और (19) हटने चाहिए इसलिए न्यूनतम गुणनखंड \(81\cdot 19=1539\) है। (2) और (5) हर में रह सकते हैं।
Since \(245=5\cdot 7^2\), the reduced denominator is \(2^2\cdot 5\cdot 7\). Since (7) remains, the decimal is non-terminating recurring.
Step 2
Why this answer is correct
The correct answer is C. असांत आवर्ती / Non-terminating recurring. Since \(245=5\cdot 7^2\), the reduced denominator is \(2^2\cdot 5\cdot 7\). Since (7) remains, the decimal is non-terminating recurring.
Step 3
Exam Tip
\(245=5\cdot 7^2\) कटने पर हर \(2^2\cdot 5\cdot 7\) बचता है। (7) बचने से दशमलव असांत आवर्ती होगा।
C. असांत अनावर्ती अपरिमेय/Non-terminating non-recurring irrational
Step 1
Concept
This decimal does not end, and the number of zeros keeps changing. Since there is no fixed repeating block, it is non-terminating non-recurring.
Step 2
Why this answer is correct
The correct answer is C. असांत अनावर्ती अपरिमेय / Non-terminating non-recurring irrational. This decimal does not end, and the number of zeros keeps changing. Since there is no fixed repeating block, it is non-terminating non-recurring.
Step 3
Exam Tip
यह दशमलव समाप्त नहीं होता और शून्यों की संख्या बदलती जाती है। स्थिर आवर्ती खंड न होने से यह असांत अनावर्ती है।
A. ठीक (7) स्थानों पर समाप्त/Terminates exactly after (7) places
Step 1
Concept
The reduced denominator is \(10^7\), so the decimal terminates exactly after (7) places. If the denominator is reduced, do not assume further cancellation.
Step 2
Why this answer is correct
The correct answer is A. ठीक (7) स्थानों पर समाप्त / Terminates exactly after (7) places. The reduced denominator is \(10^7\), so the decimal terminates exactly after (7) places. If the denominator is reduced, do not assume further cancellation.
Step 3
Exam Tip
सरलतम हर \(10^7\) है इसलिए दशमलव ठीक (7) स्थानों पर समाप्त होगा। सरलतम हर दिया हो तो अंश से और कटौती नहीं माननी चाहिए।
After cancelling \(22=2\cdot 11\), the denominator becomes \(2\cdot 5^4\cdot 11\). Since (11) remains, the decimal is non-terminating recurring.
Step 2
Why this answer is correct
The correct answer is B. असांत आवर्ती / Non-terminating recurring. After cancelling \(22=2\cdot 11\), the denominator becomes \(2\cdot 5^4\cdot 11\). Since (11) remains, the decimal is non-terminating recurring.
Step 3
Exam Tip
\(22=2\cdot 11\) कटने पर हर \(2\cdot 5^4\cdot 11\) बचेगा। (11) बचने से दशमलव असांत आवर्ती होगा।
Since \(243=3^5\), the reduced denominator is \(2^5\cdot 5^4\). 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). Since \(243=3^5\), the reduced denominator is \(2^5\cdot 5^4\). The larger exponent is (5), so the decimal terminates after (5) places.
Step 3
Exam Tip
\(243=3^5\) कटने पर हर \(2^5\cdot 5^4\) बचेगा। बड़ी घात (5) है इसलिए दशमलव (5) स्थानों पर समाप्त होगा।
At most (9) decimal places means the fraction can be written with denominator \(10^9\). Therefore the reduced denominator must divide \(10^9\).
Step 2
Why this answer is correct
The correct answer is C. \(10^9\). At most (9) decimal places means the fraction can be written with denominator \(10^9\). Therefore the reduced denominator must divide \(10^9\).
Step 3
Exam Tip
अधिकतम (9) दशमलव स्थानों का अर्थ है भिन्न को \(10^9\) हर के साथ लिखा जा सकता है। इसलिए सरलतम हर \(10^9\) का भाजक होगा।
\(0.\overline{063}=\frac{63}{999}\), and reducing by (9) gives \(\frac{7}{111}\). An initial zero inside the repeating block is also counted as a digit.
Step 2
Why this answer is correct
The correct answer is A. \(\frac{7}{111}\). \(0.\overline{063}=\frac{63}{999}\), and reducing by (9) gives \(\frac{7}{111}\). An initial zero inside the repeating block is also counted as a digit.
Step 3
Exam Tip
\(0.\overline{063}=\frac{63}{999}\) और (9) से सरल करने पर \(\frac{7}{111}\) मिलता है। आवर्ती भाग में आरंभिक शून्य को भी अंक माना जाता है।
A. सांत और (5) स्थानों पर समाप्त/Terminating after (5) places
Step 1
Concept
Both \(7^0\) and \(19^0\) equal (1), so the effective denominator is \(2^5\cdot 5^2\). The larger exponent is (5), so the decimal terminates after (5) places.
Step 2
Why this answer is correct
The correct answer is A. सांत और (5) स्थानों पर समाप्त / Terminating after (5) places. Both \(7^0\) and \(19^0\) equal (1), so the effective denominator is \(2^5\cdot 5^2\). The larger exponent is (5), so the decimal terminates after (5) places.
Step 3
Exam Tip
\(7^0\) और \(19^0\) दोनों (1) हैं इसलिए प्रभावी हर \(2^5\cdot 5^2\) है। बड़ी घात (5) होने से दशमलव (5) स्थानों पर समाप्त होगा।
The factor (41) makes the decimal recurring, and the larger exponent of (2) and (5) is (7), giving the non-repeating start. In mixed denominators, the larger exponent gives the delay.
Step 2
Why this answer is correct
The correct answer is C. (7). The factor (41) makes the decimal recurring, and the larger exponent of (2) and (5) is (7), giving the non-repeating start. In mixed denominators, the larger exponent gives the delay.
Step 3
Exam Tip
(41) के कारण दशमलव आवर्ती होगा और (2), (5) की बड़ी घात (7) अनावर्ती आरंभ देगी। मिश्रित हर में बड़ी घात से देरी मिलती है।
\(0.046875=\frac{46875}{1000000}\), and reducing gives \(\frac{3}{64}\). Convert the decimal to a fraction and reduce fully.
Step 2
Why this answer is correct
The correct answer is A. \(\frac{3}{64}\). \(0.046875=\frac{46875}{1000000}\), and reducing gives \(\frac{3}{64}\). Convert the decimal to a fraction and reduce fully.
Step 3
Exam Tip
\(0.046875=\frac{46875}{1000000}\) है और सरल करने पर \(\frac{3}{64}\) मिलता है। दशमलव से भिन्न बनाकर अंतिम रूप तक सरल करें।
A positive power of (13) remains in the reduced denominator. Therefore the rational number has a non-terminating recurring decimal.
Step 2
Why this answer is correct
The correct answer is B. असांत आवर्ती / Non-terminating recurring. A positive power of (13) remains in the reduced denominator. Therefore the rational number has a non-terminating recurring decimal.
Step 3
Exam Tip
सरलतम हर में (13) की धनात्मक घात बची है। इसलिए परिमेय संख्या का दशमलव असांत आवर्ती होगा।
Since \(320=2^6\cdot 5\), the reduced denominator is \(2\cdot 5^2\cdot 11\). Since (11) remains, the decimal is non-terminating recurring.
Step 2
Why this answer is correct
The correct answer is B. असांत आवर्ती / Non-terminating recurring. Since \(320=2^6\cdot 5\), the reduced denominator is \(2\cdot 5^2\cdot 11\). Since (11) remains, the decimal is non-terminating recurring.
Step 3
Exam Tip
\(320=2^6\cdot 5\) कटने पर हर \(2\cdot 5^2\cdot 11\) बचेगा। (11) बचने से दशमलव असांत आवर्ती होगा।
Since \(62=2\cdot 31\), the factor (31) cancels and the reduced denominator is \(2^3\cdot 5^3\). If an extra prime appears, check cancellation first.
Step 2
Why this answer is correct
The correct answer is A. \(\frac{62}{2^4\cdot 5^3\cdot 31}\). Since \(62=2\cdot 31\), the factor (31) cancels and the reduced denominator is \(2^3\cdot 5^3\). If an extra prime appears, check cancellation first.
Step 3
Exam Tip
\(62=2\cdot 31\) है इसलिए (31) कट जाता है और सरल हर \(2^3\cdot 5^3\) बचता है। अतिरिक्त अभाज्य गुणनखंड दिखे तो पहले कटौती देखें।
\(0.\overline{36}=\frac{36}{99}\) and \(0.\overline{63}=\frac{63}{99}\), so their sum is (1). The sum of two recurring decimals can be terminating.
Step 2
Why this answer is correct
The correct answer is A. सांत / Terminating. \(0.\overline{36}=\frac{36}{99}\) and \(0.\overline{63}=\frac{63}{99}\), so their sum is (1). The sum of two recurring decimals can be terminating.
Step 3
Exam Tip
\(0.\overline{36}=\frac{36}{99}\) और \(0.\overline{63}=\frac{63}{99}\) हैं इसलिए योग (1) है। दो आवर्ती दशमलवों का योग सांत भी हो सकता है।
B. असांत आवर्ती और (4) अनावर्ती आरंभिक अंक/Non-terminating recurring with (4) initial non-repeating digits
Step 1
Concept
Since (17) remains, the decimal is non-terminating recurring. The larger exponent in \(2^4\cdot 5^4\) gives (4) initial non-repeating digits.
Step 2
Why this answer is correct
The correct answer is B. असांत आवर्ती और (4) अनावर्ती आरंभिक अंक / Non-terminating recurring with (4) initial non-repeating digits. Since (17) remains, the decimal is non-terminating recurring. The larger exponent in \(2^4\cdot 5^4\) gives (4) initial non-repeating digits.
Step 3
Exam Tip
(17) बचता है इसलिए दशमलव असांत आवर्ती होगा। \(2^4\cdot 5^4\) की बड़ी घात (4) आरंभिक अनावर्ती भाग दिखाती है।
A. केवल (2) और (5) हो सकते हैं/Only (2) and (5) can occur
Step 1
Concept
For a terminating decimal, the reduced denominator (q) can contain only (2) and (5). In \(q^4\), 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 \(q^4\), 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। \(q^4\) में घातें बढ़ेंगी लेकिन नया अभाज्य गुणनखंड नहीं आएगा।
After cancellation, the denominator becomes \(2^4\cdot 5^2\cdot 17\). Since (17) remains, the decimal is non-terminating recurring.
Step 2
Why this answer is correct
The correct answer is B. असांत आवर्ती / Non-terminating recurring. After cancellation, the denominator becomes \(2^4\cdot 5^2\cdot 17\). Since (17) remains, the decimal is non-terminating recurring.
Step 3
Exam Tip
कटौती के बाद हर \(2^4\cdot 5^2\cdot 17\) बचेगा। (17) बचने से दशमलव असांत आवर्ती होगा।
\(0.015625=\frac{15625}{1000000}=\frac{1}{64}\). Convert a terminating decimal to a fraction and reduce the denominator.
Step 2
Why this answer is correct
The correct answer is B. (64). \(0.015625=\frac{15625}{1000000}=\frac{1}{64}\). Convert a terminating decimal to a fraction and reduce the denominator.
Step 3
Exam Tip
\(0.015625=\frac{15625}{1000000}=\frac{1}{64}\) है। सांत दशमलव को भिन्न में बदलकर हर को सरलतम रूप में देखें।
\(0.00015625=\frac{15625}{100000000}\), and reducing by (15625) gives \(\frac{1}{6400}\). Do not forget to cancel common factors in large denominators.
Step 2
Why this answer is correct
The correct answer is A. \(\frac{1}{6400}\). \(0.00015625=\frac{15625}{100000000}\), and reducing by (15625) gives \(\frac{1}{6400}\). Do not forget to cancel common factors in large denominators.
Step 3
Exam Tip
\(0.00015625=\frac{15625}{100000000}\) है और (15625) से सरल करने पर \(\frac{1}{6400}\) मिलता है। बड़े हर में समान गुणनखंड काटना न भूलें।
\(448=2^6\cdot 7\), so (6) non-repeating digits appear before the recurring part. For comparison, check the larger power of (2) and (5).
Step 2
Why this answer is correct
The correct answer is C. \(\frac{1}{448}\). \(448=2^6\cdot 7\), so (6) non-repeating digits appear before the recurring part. For comparison, check the larger power of (2) and (5).
Step 3
Exam Tip
\(448=2^6\cdot 7\) है इसलिए आवर्ती भाग से पहले (6) अनावर्ती अंक आएँगे। तुलना में (2) और (5) की बड़ी घात देखें।
A. ठीक (5) स्थानों पर समाप्त/Terminates exactly after (5) places
Step 1
Concept
Since \(7^0=1\), the effective denominator is \(2^5\cdot 5^5=10^5\). The decimal terminates exactly after (5) places.
Step 2
Why this answer is correct
The correct answer is A. ठीक (5) स्थानों पर समाप्त / Terminates exactly after (5) places. Since \(7^0=1\), the effective denominator is \(2^5\cdot 5^5=10^5\). The decimal terminates exactly after (5) places.
Step 3
Exam Tip
\(7^0=1\) है इसलिए प्रभावी हर \(2^5\cdot 5^5=10^5\) है। दशमलव ठीक (5) स्थानों पर समाप्त होगा।
The factors (3), (7), and (13) must be removed from the reduced denominator, so the minimum factor is \(3\cdot 7\cdot 13=273\). Factors (2) and (5) may remain.
Step 2
Why this answer is correct
The correct answer is B. (273). The factors (3), (7), and (13) must be removed from the reduced denominator, so the minimum factor is \(3\cdot 7\cdot 13=273\). Factors (2) and (5) may remain.
Step 3
Exam Tip
सरलतम हर से (3), (7) और (13) हटने चाहिए इसलिए न्यूनतम गुणनखंड \(3\cdot 7\cdot 13=273\) है। (2) और (5) हर में रह सकते हैं।
Since \(750=2\cdot 3\cdot 5^3\), the reduced denominator is \(2^5\cdot 5^2\). The larger exponent is (5), so the decimal terminates after (5) places.
Step 2
Why this answer is correct
The correct answer is C. (5) स्थान / (5) places. Since \(750=2\cdot 3\cdot 5^3\), the reduced denominator is \(2^5\cdot 5^2\). The larger exponent is (5), so the decimal terminates after (5) places.
Step 3
Exam Tip
\(750=2\cdot 3\cdot 5^3\) कटने पर हर \(2^5\cdot 5^2\) बचता है। बड़ी घात (5) है, इसलिए दशमलव (5) स्थानों पर समाप्त होगा।
\(0.124545\ldots=\frac{1245-12}{9900}=\frac{1233}{9900}=\frac{137}{1100}\). Always reduce the final fraction in mixed recurring decimals.
Step 2
Why this answer is correct
The correct answer is C. (1100). \(0.124545\ldots=\frac{1245-12}{9900}=\frac{1233}{9900}=\frac{137}{1100}\). Always reduce the final fraction in mixed recurring decimals.
Step 3
Exam Tip
\(0.124545\ldots=\frac{1245-12}{9900}=\frac{1233}{9900}=\frac{137}{1100}\) है। मिश्रित आवर्ती दशमलव में अंतिम भिन्न को अवश्य सरल करें।
The factors \(7^3\) and (11) must be removed from the reduced denominator, so \(n=7^3\cdot 11=3773\). For the least value, do not cancel (2) and (5).
Step 2
Why this answer is correct
The correct answer is A. (3773). The factors \(7^3\) and (11) must be removed from the reduced denominator, so \(n=7^3\cdot 11=3773\). For the least value, do not cancel (2) and (5).
Step 3
Exam Tip
सरलतम हर से \(7^3\) और (11) हटने चाहिए इसलिए \(n=7^3\cdot 11=3773\) होगा। न्यूनतम मान में (2) और (5) को काटना जरूरी नहीं है।
Since \(19^2\) remains, the decimal is non-terminating recurring, and the larger exponent among (2) and (5) is (4). In such questions, separate recurrence from the initial delay.
Step 2
Why this answer is correct
The correct answer is B. (4). Since \(19^2\) remains, the decimal is non-terminating recurring, and the larger exponent among (2) and (5) is (4). In such questions, separate recurrence from the initial delay.
Step 3
Exam Tip
\(19^2\) बचने से दशमलव असांत आवर्ती होगा और (2), (5) की बड़ी घात (4) आरंभिक अनावर्ती भाग देगी। ऐसे प्रश्न में आवर्तीपन और आरंभिक देरी अलग-अलग देखें।
For exactly (6) places, the larger exponent of (2) and (5) must be (6). Since \(3125=5^5\), it gives only (5) decimal places.
Step 2
Why this answer is correct
The correct answer is B. (3125). For exactly (6) places, the larger exponent of (2) and (5) must be (6). Since \(3125=5^5\), it gives only (5) decimal places.
Step 3
Exam Tip
ठीक (6) स्थानों के लिए (2) और (5) की बड़ी घात (6) होनी चाहिए। \(3125=5^5\) है, इसलिए यह केवल (5) दशमलव स्थान देगा।
\(0.\overline{216}=\frac{216}{999}=\frac{8}{37}\). For a purely recurring decimal, first use a denominator of (9)'s and then reduce fully.
Step 2
Why this answer is correct
The correct answer is A. (37). \(0.\overline{216}=\frac{216}{999}=\frac{8}{37}\). For a purely recurring decimal, first use a denominator of (9)'s and then reduce fully.
Step 3
Exam Tip
\(0.\overline{216}=\frac{216}{999}=\frac{8}{37}\) है। पूर्ण आवर्ती दशमलव में पहले (9) वाला हर बनाएं और फिर पूरा सरल करें।
