This is not a question. It is a statement. Please ask a question if you want an answer.
2
(a football field)0.5 A football field is not a number or a quantity and so cannot have a square root. The length of a football field can have a square root, its width can, its area can, but it cannot.(a football field)0.5 A football field is not a number or a quantity and so cannot have a square root. The length of a football field can have a square root, its width can, its area can, but it cannot.(a football field)0.5 A football field is not a number or a quantity and so cannot have a square root. The length of a football field can have a square root, its width can, its area can, but it cannot.(a football field)0.5 A football field is not a number or a quantity and so cannot have a square root. The length of a football field can have a square root, its width can, its area can, but it cannot.
A centimetre.
That's 100 meters- a bit more than the length of a football field. Depends on how fast you walk. At a quick walk, about 90- 120 seconds.
Weight about peahen Almost 3.5 kg and length 90 cm height about peacock Almost 4.5 kg and length 1.90 m
Metres.
The length of the (American) football field ... 100 yards plus the end zones ... is 360 feet.60 mph = 88 feet per second (exactly)360/88 = 41/11 seconds
The length of a high school football time-out is about 60 seconds.
60 seconds
known to be seconds pendulum,the length would be almost 1m when acceleration due to gravity is 9.8m/s2
Almost the length of an American football field - 295.3 feet.
About the length of a football field.
Light. Since the speed of light is almost a million times the speed of sound (in air), it's hardly necessary to do lots of calculations to get this answer.Update: the number of seconds is actually irrelevant. To know how fast something goes, you only need the speed.
they are all the same length...
About 5.5 football field lengths. (Football field length= 160 ft, Titanic length= 882.75 feet [882' 9"])
The length of two (American) football fields, so over 200 yards.
A vehicle with brakes and tires in good working condition traveling at 90 kmh [60 mph] covers 27 metres [88 feet] per second. Stopping a vehicle traveling at this speed involves recognizing the need to stop, initiating braking and then braking to a stop At 90 kmh, once braking starts, it takes 42 metres to come to a complete stop. This encompasses approximately 3.1 seconds. So from perceiving a braking situation to stopping, takes 4.6 seconds during which time the car travels over 82 metres, which is almost the length of a football field. These computations are based on dry pavement, using an average braking rate of .870 g A vehicle with brakes and tires in good working condition traveling at 90 kmh [60 mph] covers 27 metres [88 feet] per second. Stopping a vehicle traveling at this speed involves recognizing the need to stop, initiating braking and then braking to a stop At 90 kmh, once braking starts, it takes 42 metres to come to a complete stop. This encompasses approximately 3.1 seconds. So from perceiving a braking situation to stopping, takes 4.6 seconds during which time the car travels over 82 metres, which is almost the length of a football field. These computations are based on dry pavement, using an average braking rate of .870 g
Is a football pitch a 100 metres in length?