To calculate the total rope required, first find the perimeter of the rectangular field using 2 x (length + breadth). Substituting the values: 2 x (230 + 160) = 2 x 390 = 780 m. Since the farmer wants to fence the field with 3 rounds of rope, multiply the perimeter by 3: 3 x 780 = 2340 m. This ensurRead more
To calculate the total rope required, first find the perimeter of the rectangular field using 2 x (length + breadth). Substituting the values: 2 x (230 + 160) = 2 x 390 = 780 m. Since the farmer wants to fence the field with 3 rounds of rope, multiply the perimeter by 3: 3 x 780 = 2340 m. This ensures enough rope to surround the field three times, securing the boundary effectively.
For Akshi, the perimeter of the outer track is 2 x (70 + 40) = 220 m. Distance covered in 5 rounds = 5 x 220 = 1100 m. For Toshi, the inner track perimeter is 2 x (60 + 30) = 180 m. Distance covered in 7 rounds = 7 x 180 = 1260 m. Comparing distances, Toshi covers 1260 m, which is more than Akshi'sRead more
For Akshi, the perimeter of the outer track is 2 x (70 + 40) = 220 m. Distance covered in 5 rounds = 5 x 220 = 1100 m. For Toshi, the inner track perimeter is 2 x (60 + 30) = 180 m. Distance covered in 7 rounds = 7 x 180 = 1260 m. Comparing distances, Toshi covers 1260 m, which is more than Akshi’s 1100 m. Toshi ran a longer distance overall.
The perimeter of the rectangular outer track where Akshi runs is calculated as 2 x (length + breadth) = 2 x (70 + 40) = 2 x 110 = 220 m. Akshi completes 5 rounds of this track, so her total distance covered is 5 x 220 = 1100 m. This calculation provides the exact distance Akshi ran during her exerciRead more
The perimeter of the rectangular outer track where Akshi runs is calculated as 2 x (length + breadth) = 2 x (70 + 40) = 2 x 110 = 220 m. Akshi completes 5 rounds of this track, so her total distance covered is 5 x 220 = 1100 m. This calculation provides the exact distance Akshi ran during her exercise on the outer rectangular track.
Toshi runs on the inner rectangular track with a perimeter of 2 x (length + breadth) = 2 x (60 + 30) = 2 x 90 = 180 m. Completing 7 rounds, Toshi's total distance is 7 x 180 = 1260 m. Comparing with Akshi's distance of 1100 m, Toshi covered a longer distance by 160 m, making her the one who ran fartRead more
Toshi runs on the inner rectangular track with a perimeter of 2 x (length + breadth) = 2 x (60 + 30) = 2 x 90 = 180 m. Completing 7 rounds, Toshi’s total distance is 7 x 180 = 1260 m. Comparing with Akshi’s distance of 1100 m, Toshi covered a longer distance by 160 m, making her the one who ran farther overall.
The inner track perimeter is 4 x 100 = 400 m, and the outer track perimeter is 4 x 150 = 600 m. To ensure both runners finish at the same point after 350 m, their starting points must account for their track perimeters. Use the ratio 350/400 for the inner track and 350/600 for the outer track to finRead more
The inner track perimeter is 4 x 100 = 400 m, and the outer track perimeter is 4 x 150 = 600 m. To ensure both runners finish at the same point after 350 m, their starting points must account for their track perimeters. Use the ratio 350/400 for the inner track and 350/600 for the outer track to find relative start positions. This ensures both runners finish simultaneously at the common finish line.
A farmer has a rectangular field having length 230 m and breadth 160 m. He wants to fence it with 3 rounds of rope as shown. What is the total length of rope needed?
To calculate the total rope required, first find the perimeter of the rectangular field using 2 x (length + breadth). Substituting the values: 2 x (230 + 160) = 2 x 390 = 780 m. Since the farmer wants to fence the field with 3 rounds of rope, multiply the perimeter by 3: 3 x 780 = 2340 m. This ensurRead more
To calculate the total rope required, first find the perimeter of the rectangular field using 2 x (length + breadth). Substituting the values: 2 x (230 + 160) = 2 x 390 = 780 m. Since the farmer wants to fence the field with 3 rounds of rope, multiply the perimeter by 3: 3 x 780 = 2340 m. This ensures enough rope to surround the field three times, securing the boundary effectively.
For more NCERT Solutions for Class 6 Math Chapter 6 Perimeter and Area Extra Questions and Answer:
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Akshi and Toshi start running along the rectangular tracks as shown in the figure. Akshi runs along the outer track and completes 5 rounds. Toshi runs along the inner track and completes 7 rounds. Now, they are wondering who ran more. Find out who ran the longer distance.
For Akshi, the perimeter of the outer track is 2 x (70 + 40) = 220 m. Distance covered in 5 rounds = 5 x 220 = 1100 m. For Toshi, the inner track perimeter is 2 x (60 + 30) = 180 m. Distance covered in 7 rounds = 7 x 180 = 1260 m. Comparing distances, Toshi covers 1260 m, which is more than Akshi'sRead more
For Akshi, the perimeter of the outer track is 2 x (70 + 40) = 220 m. Distance covered in 5 rounds = 5 x 220 = 1100 m. For Toshi, the inner track perimeter is 2 x (60 + 30) = 180 m. Distance covered in 7 rounds = 7 x 180 = 1260 m. Comparing distances, Toshi covers 1260 m, which is more than Akshi’s 1100 m. Toshi ran a longer distance overall.
For more NCERT Solutions for Class 6 Math Chapter 6 Perimeter and Area Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions-class-6-maths-ganita-prakash-chapter-6/
Find out the total distance Akshi has covered in 5 rounds.
The perimeter of the rectangular outer track where Akshi runs is calculated as 2 x (length + breadth) = 2 x (70 + 40) = 2 x 110 = 220 m. Akshi completes 5 rounds of this track, so her total distance covered is 5 x 220 = 1100 m. This calculation provides the exact distance Akshi ran during her exerciRead more
The perimeter of the rectangular outer track where Akshi runs is calculated as 2 x (length + breadth) = 2 x (70 + 40) = 2 x 110 = 220 m. Akshi completes 5 rounds of this track, so her total distance covered is 5 x 220 = 1100 m. This calculation provides the exact distance Akshi ran during her exercise on the outer rectangular track.
For more NCERT Solutions for Class 6 Math Chapter 6 Perimeter and Area Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions-class-6-maths-ganita-prakash-chapter-6/
Find out the total distance Toshi has covered in 7 rounds. Who ran a longer distance?
Toshi runs on the inner rectangular track with a perimeter of 2 x (length + breadth) = 2 x (60 + 30) = 2 x 90 = 180 m. Completing 7 rounds, Toshi's total distance is 7 x 180 = 1260 m. Comparing with Akshi's distance of 1100 m, Toshi covered a longer distance by 160 m, making her the one who ran fartRead more
Toshi runs on the inner rectangular track with a perimeter of 2 x (length + breadth) = 2 x (60 + 30) = 2 x 90 = 180 m. Completing 7 rounds, Toshi’s total distance is 7 x 180 = 1260 m. Comparing with Akshi’s distance of 1100 m, Toshi covered a longer distance by 160 m, making her the one who ran farther overall.
For more NCERT Solutions for Class 6 Math Chapter 6 Perimeter and Area Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions-class-6-maths-ganita-prakash-chapter-6/
In races, usually there is a common finish line for all the runners. Here are two square running tracks with the inner track of 100 m each side and outer track of 150 m each side. The common finishing line for both runners is shown by the flags in the figure which are in the center of one of the sides of the tracks. If the total race is of 350 m, then we have to find out where the starting positions of the two runners should be on these two tracks so that they both have a common finishing line after they run for 350 m. Mark the starting points of the runner on the inner track as ‘A’ and the runner on the outer track as ‘B’.
The inner track perimeter is 4 x 100 = 400 m, and the outer track perimeter is 4 x 150 = 600 m. To ensure both runners finish at the same point after 350 m, their starting points must account for their track perimeters. Use the ratio 350/400 for the inner track and 350/600 for the outer track to finRead more
The inner track perimeter is 4 x 100 = 400 m, and the outer track perimeter is 4 x 150 = 600 m. To ensure both runners finish at the same point after 350 m, their starting points must account for their track perimeters. Use the ratio 350/400 for the inner track and 350/600 for the outer track to find relative start positions. This ensures both runners finish simultaneously at the common finish line.
For more NCERT Solutions for Class 6 Math Chapter 6 Perimeter and Area Extra Questions and Answer:
See lesshttps://www.tiwariacademy.com/ncert-solutions-class-6-maths-ganita-prakash-chapter-6/