To add 2/5 and 1/5, we first note that the denominators are already the same, so we don’t need to adjust them. We can directly add the numerators: 2 + 1 = 3. Thus, the sum of 2/5 and 1/5 is 3/5. This method works when fractions have the same denominator because we only add the numerators. No other aRead more
To add 2/5 and 1/5, we first note that the denominators are already the same, so we don’t need to adjust them. We can directly add the numerators:
2 + 1 = 3.
Thus, the sum of 2/5 and 1/5 is 3/5. This method works when fractions have the same denominator because we only add the numerators. No other adjustments are needed. The result is already in its simplest form, representing three parts out of five.
CBSE admit cards are crucial for appearing in the board exams. Regular students can obtain them from their respective schools, while private candidates need to visit the CBSE website, log in with their registration number and other details, and download the card. It’s essential to ensure all informaRead more
CBSE admit cards are crucial for appearing in the board exams. Regular students can obtain them from their respective schools, while private candidates need to visit the CBSE website, log in with their registration number and other details, and download the card. It’s essential to ensure all information on the admit card is accurate. In case of discrepancies, report to the school or CBSE immediately. Make sure to carry it on exam days, as entry isn’t allowed without it.
Sample papers for CBSE Class 10 and 12 board exams 2025 can be accessed on the official CBSE website. These papers familiarize students with the question patterns, marking schemes, and difficulty levels. In addition to official papers, educational platforms offer additional practice sets with detailRead more
Sample papers for CBSE Class 10 and 12 board exams 2025 can be accessed on the official CBSE website. These papers familiarize students with the question patterns, marking schemes, and difficulty levels. In addition to official papers, educational platforms offer additional practice sets with detailed solutions and analysis to enhance preparation. Regular practice of sample papers enables students to identify weak areas and improve time management skills, ultimately boosting their confidence for the exams.
Brahmagupta’s method simplifies adding fractions by first converting them to equivalent fractions with a common denominator. The numerators are then added directly, while the denominator stays unchanged. For example, adding 1/2 and 2/3 involves finding a common denominator of 6, making the fractionsRead more
Brahmagupta’s method simplifies adding fractions by first converting them to equivalent fractions with a common denominator. The numerators are then added directly, while the denominator stays unchanged. For example, adding 1/2 and 2/3 involves finding a common denominator of 6, making the fractions 3/6 and 4/6. Adding their numerators gives 7/6. This approach ensures accurate addition of fractions by aligning their denominators, allowing the values to be combined efficiently.
A fraction consists of two parts: the numerator and the denominator. The numerator indicates how many parts are considered, while the denominator shows the total number of equal parts into which the whole is divided. For instance, in the fraction 7/10, 7 is the numerator (selected parts), and 10 isRead more
A fraction consists of two parts: the numerator and the denominator. The numerator indicates how many parts are considered, while the denominator shows the total number of equal parts into which the whole is divided. For instance, in the fraction 7/10, 7 is the numerator (selected parts), and 10 is the denominator (total parts). These components work together to define the fraction’s value and relationship to the whole.
A fractional unit refers to one of the equal parts obtained when a whole unit is divided. Each part is equally significant and proportional. For instance, dividing a chocolate bar into 6 equal parts makes each piece a fractional unit, or 1/6 of the bar. Fractions like 1/6, 1/4, or 1/8 represent suchRead more
A fractional unit refers to one of the equal parts obtained when a whole unit is divided. Each part is equally significant and proportional. For instance, dividing a chocolate bar into 6 equal parts makes each piece a fractional unit, or 1/6 of the bar. Fractions like 1/6, 1/4, or 1/8 represent such divisions of a whole, enabling us to measure, compare, and share portions of a single object or quantity.
To compare the times, convert 10/3 and 13/4 to a common denominator. The least common denominator is 12. Convert 10/3 to 40/12 and 13/4 to 39/12. Now, compare: 39/12 < 40/12, so Namit takes less time. The difference is: 40/12 – 39/12 = 1/12. Thus, Namit takes 1/12 of a minute less than Jeevika, wRead more
To compare the times, convert 10/3 and 13/4 to a common denominator. The least common denominator is 12. Convert 10/3 to 40/12 and 13/4 to 39/12. Now, compare:
39/12 < 40/12, so Namit takes less time.
The difference is:
40/12 – 39/12 = 1/12.
Thus, Namit takes 1/12 of a minute less than Jeevika, which equals 5 seconds. This method ensures accurate comparison by aligning the fractions and observing the difference in time.
Jaya’s school is 7/10 km away, and she takes an auto for 1/2 km. To find the distance she walks, subtract 1/2 from 7/10. First, convert 1/2 to 5/10. Now, subtract: 7/10 – 5/10 = 2/10, which simplifies to 1/5. Therefore, Jaya walks 1/5 km daily. This method ensures that the distances are aligned usinRead more
Jaya’s school is 7/10 km away, and she takes an auto for 1/2 km. To find the distance she walks, subtract 1/2 from 7/10. First, convert 1/2 to 5/10. Now, subtract:
7/10 – 5/10 = 2/10, which simplifies to 1/5.
Therefore, Jaya walks 1/5 km daily. This method ensures that the distances are aligned using a common denominator, and the result is simplified to its lowest terms, representing the portion she walks each day.
Brahmagupta’s method for subtracting fractions starts with finding a common denominator, typically by multiplying the denominators or finding the least common multiple. Once the fractions are converted to have the same denominator, subtract the numerators while keeping the denominator unchanged. IfRead more
Brahmagupta’s method for subtracting fractions starts with finding a common denominator, typically by multiplying the denominators or finding the least common multiple. Once the fractions are converted to have the same denominator, subtract the numerators while keeping the denominator unchanged. If necessary, simplify the result by dividing both the numerator and denominator by their greatest common factor. This method allows for accurate and simplified subtraction, ensuring proper handling of fractions with different denominators.
To determine if the lace is sufficient, add 2/5 and 3/4. The common denominator is 20. Convert 2/5 to 8/20 and 3/4 to 15/20. Adding the fractions gives: 8/20 + 15/20 = 23/20. This simplifies to 1 3/20 meters, which is greater than the 1-meter perimeter. Therefore, Geeta and Shamim's lace is more thaRead more
To determine if the lace is sufficient, add 2/5 and 3/4. The common denominator is 20. Convert 2/5 to 8/20 and 3/4 to 15/20. Adding the fractions gives:
8/20 + 15/20 = 23/20.
This simplifies to 1 3/20 meters, which is greater than the 1-meter perimeter. Therefore, Geeta and Shamim’s lace is more than enough to cover the tablecloth’s border. This calculation shows how adding fractions with different denominators gives the required total.
Find the sum of 2/5 and 1/5.
To add 2/5 and 1/5, we first note that the denominators are already the same, so we don’t need to adjust them. We can directly add the numerators: 2 + 1 = 3. Thus, the sum of 2/5 and 1/5 is 3/5. This method works when fractions have the same denominator because we only add the numerators. No other aRead more
To add 2/5 and 1/5, we first note that the denominators are already the same, so we don’t need to adjust them. We can directly add the numerators:
2 + 1 = 3.
Thus, the sum of 2/5 and 1/5 is 3/5. This method works when fractions have the same denominator because we only add the numerators. No other adjustments are needed. The result is already in its simplest form, representing three parts out of five.
For more NCERT Solutions for Class 6 Math Chapter 7 Fractions Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
How can I download my CBSE admit card for Class 10 and 12 board exams?
CBSE admit cards are crucial for appearing in the board exams. Regular students can obtain them from their respective schools, while private candidates need to visit the CBSE website, log in with their registration number and other details, and download the card. It’s essential to ensure all informaRead more
CBSE admit cards are crucial for appearing in the board exams. Regular students can obtain them from their respective schools, while private candidates need to visit the CBSE website, log in with their registration number and other details, and download the card. It’s essential to ensure all information on the admit card is accurate. In case of discrepancies, report to the school or CBSE immediately. Make sure to carry it on exam days, as entry isn’t allowed without it.
For more CBSE NCERT Solutions, Syllabus, Pdf, Videos, MCQs, Sample Papers visit Tiwari Academy –
See lesshttps://www.tiwariacademy.com/ncert-solutions/
Where can I find CBSE Class 10 and 12 sample papers for 2025?
Sample papers for CBSE Class 10 and 12 board exams 2025 can be accessed on the official CBSE website. These papers familiarize students with the question patterns, marking schemes, and difficulty levels. In addition to official papers, educational platforms offer additional practice sets with detailRead more
Sample papers for CBSE Class 10 and 12 board exams 2025 can be accessed on the official CBSE website. These papers familiarize students with the question patterns, marking schemes, and difficulty levels. In addition to official papers, educational platforms offer additional practice sets with detailed solutions and analysis to enhance preparation. Regular practice of sample papers enables students to identify weak areas and improve time management skills, ultimately boosting their confidence for the exams.
See lessExplain Brahmagupta’s method for adding fractions.
Brahmagupta’s method simplifies adding fractions by first converting them to equivalent fractions with a common denominator. The numerators are then added directly, while the denominator stays unchanged. For example, adding 1/2 and 2/3 involves finding a common denominator of 6, making the fractionsRead more
Brahmagupta’s method simplifies adding fractions by first converting them to equivalent fractions with a common denominator. The numerators are then added directly, while the denominator stays unchanged. For example, adding 1/2 and 2/3 involves finding a common denominator of 6, making the fractions 3/6 and 4/6. Adding their numerators gives 7/6. This approach ensures accurate addition of fractions by aligning their denominators, allowing the values to be combined efficiently.
For more NCERT Solutions for Class 6 Math Chapter 7 Fractions Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
What are the numerator and denominator in a fraction?
A fraction consists of two parts: the numerator and the denominator. The numerator indicates how many parts are considered, while the denominator shows the total number of equal parts into which the whole is divided. For instance, in the fraction 7/10, 7 is the numerator (selected parts), and 10 isRead more
A fraction consists of two parts: the numerator and the denominator. The numerator indicates how many parts are considered, while the denominator shows the total number of equal parts into which the whole is divided. For instance, in the fraction 7/10, 7 is the numerator (selected parts), and 10 is the denominator (total parts). These components work together to define the fraction’s value and relationship to the whole.
For more NCERT Solutions for Class 6 Math Chapter 7 Fractions Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
Define a fractional unit with an example.
A fractional unit refers to one of the equal parts obtained when a whole unit is divided. Each part is equally significant and proportional. For instance, dividing a chocolate bar into 6 equal parts makes each piece a fractional unit, or 1/6 of the bar. Fractions like 1/6, 1/4, or 1/8 represent suchRead more
A fractional unit refers to one of the equal parts obtained when a whole unit is divided. Each part is equally significant and proportional. For instance, dividing a chocolate bar into 6 equal parts makes each piece a fractional unit, or 1/6 of the bar. Fractions like 1/6, 1/4, or 1/8 represent such divisions of a whole, enabling us to measure, compare, and share portions of a single object or quantity.
For more NCERT Solutions for Class 6 Math Chapter 7 Fractions Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
Jeevika takes 10/3 minutes to take a complete round of the park and her friend Namit takes 13/4 minutes to do the same. Who takes less time and by how much?
To compare the times, convert 10/3 and 13/4 to a common denominator. The least common denominator is 12. Convert 10/3 to 40/12 and 13/4 to 39/12. Now, compare: 39/12 < 40/12, so Namit takes less time. The difference is: 40/12 – 39/12 = 1/12. Thus, Namit takes 1/12 of a minute less than Jeevika, wRead more
To compare the times, convert 10/3 and 13/4 to a common denominator. The least common denominator is 12. Convert 10/3 to 40/12 and 13/4 to 39/12. Now, compare:
39/12 < 40/12, so Namit takes less time.
The difference is:
40/12 – 39/12 = 1/12.
Thus, Namit takes 1/12 of a minute less than Jeevika, which equals 5 seconds. This method ensures accurate comparison by aligning the fractions and observing the difference in time.
For more NCERT Solutions for Class 6 Math Chapter 7 Fractions Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
Jaya’s school is 7/10 km from her home. She takes an auto for 1/2 km from her home daily, and then walks the remaining distance to reach her school. How much does she walk daily to reach the school?
Jaya’s school is 7/10 km away, and she takes an auto for 1/2 km. To find the distance she walks, subtract 1/2 from 7/10. First, convert 1/2 to 5/10. Now, subtract: 7/10 – 5/10 = 2/10, which simplifies to 1/5. Therefore, Jaya walks 1/5 km daily. This method ensures that the distances are aligned usinRead more
Jaya’s school is 7/10 km away, and she takes an auto for 1/2 km. To find the distance she walks, subtract 1/2 from 7/10. First, convert 1/2 to 5/10. Now, subtract:
7/10 – 5/10 = 2/10, which simplifies to 1/5.
Therefore, Jaya walks 1/5 km daily. This method ensures that the distances are aligned using a common denominator, and the result is simplified to its lowest terms, representing the portion she walks each day.
For more NCERT Solutions for Class 6 Math Chapter 7 Fractions Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
What is the Brahmagupta’s method for subtracting two fractions?
Brahmagupta’s method for subtracting fractions starts with finding a common denominator, typically by multiplying the denominators or finding the least common multiple. Once the fractions are converted to have the same denominator, subtract the numerators while keeping the denominator unchanged. IfRead more
Brahmagupta’s method for subtracting fractions starts with finding a common denominator, typically by multiplying the denominators or finding the least common multiple. Once the fractions are converted to have the same denominator, subtract the numerators while keeping the denominator unchanged. If necessary, simplify the result by dividing both the numerator and denominator by their greatest common factor. This method allows for accurate and simplified subtraction, ensuring proper handling of fractions with different denominators.
For more NCERT Solutions for Class 6 Math Chapter 7 Fractions Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/
Geeta bought 2/5 meter of lace and Shamim bought 3/4 meter of the same lace to put a complete border on a table cloth whose perimeter is 1 meter long. Find the total length of the lace they both have bought. Will the lace be sufficient to cover the whole border?
To determine if the lace is sufficient, add 2/5 and 3/4. The common denominator is 20. Convert 2/5 to 8/20 and 3/4 to 15/20. Adding the fractions gives: 8/20 + 15/20 = 23/20. This simplifies to 1 3/20 meters, which is greater than the 1-meter perimeter. Therefore, Geeta and Shamim's lace is more thaRead more
To determine if the lace is sufficient, add 2/5 and 3/4. The common denominator is 20. Convert 2/5 to 8/20 and 3/4 to 15/20. Adding the fractions gives:
8/20 + 15/20 = 23/20.
This simplifies to 1 3/20 meters, which is greater than the 1-meter perimeter. Therefore, Geeta and Shamim’s lace is more than enough to cover the tablecloth’s border. This calculation shows how adding fractions with different denominators gives the required total.
For more NCERT Solutions for Class 6 Math Chapter 7 Fractions Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions/class-6/maths/