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Bicycle Stopping Distances
In a head to head test and in normal conditions a bike should be able
to stop faster than a car. But that includes that the rider has both hands on the bars (and brakes) which is hard to do when you're flipping someone off. At 50 kmh http://www.exploratorium.edu/cycling/brakes2.html Bike stops in 10 meters http://www.forensicdynamics.com/stopdistcalc Car stops in 14 meters. I hate proving Kunich wrong (again) at the expense of proving Magilla right. But Kunich may be right on an empirical basis. It make take several hundred meters to slow his fat ass to a stop. Besides this is all theory as we know Kunich has never gone 30 mph on a bike. |
#2
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Bicycle Stopping Distances
In article
, Anton Berlin wrote: In a head to head test and in normal conditions a bike should be able to stop faster than a car. But that includes that the rider has both hands on the bars (and brakes) which is hard to do when you're flipping someone off. At 50 kmh http://www.exploratorium.edu/cycling/brakes2.html Bike stops in 10 meters http://www.forensicdynamics.com/stopdistcalc Car stops in 14 meters. I hate proving Kunich wrong (again) at the expense of proving Magilla right. But Kunich may be right on an empirical basis. It make take several hundred meters to slow his fat ass to a stop. Besides this is all theory as we know Kunich has never gone 30 mph on a bike. The missing factor is essentially reaction time, which probably explains how Dr. Evil managed to whomp two riders with his trunk. Here's a claim that reaction times vary around 0.7-1.5 s for drivers in braking situations. That suggests that if the Doctor swerved and braked fast enough, the riders would not have had time to react before hitting the car. He's effectively got about a 1-second head start on braking, and at 50 km/h, that's about 14 meters. In other words, the car could be at zero km/h before the riders got to their brakes, and the rest depends on how closely in front of them he cut. Considering he seems to have been trying to injure them, I'm going to guess really close, like 5m. I figure that scenario as being 14 metres of stopping distance but about 24 metres of rt+ideal stopping. In other words, physics says those cyclists were gonna hit the car no matter how good their brakes, as long as their reaction times were within human norms. Gerbils or monkeys may have better reaction times than humans, though. -- Ryan Cousineau http://www.wiredcola.com/ "In other newsgroups, they killfile trolls." "In rec.bicycles.racing, we coach them." |
#3
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Bicycle Stopping Distances
On Nov 1, 6:05*pm, Ryan Cousineau wrote:
In article , *Anton Berlin wrote: In a head to head test and in normal conditions a bike should be able to stop faster than a car. But that includes that the rider has both hands on the bars (and brakes) which is hard to do when you're flipping someone off. At 50 kmh http://www.exploratorium.edu/cycling/brakes2.html Bike stops in 10 meters http://www.forensicdynamics.com/stopdistcalc Car stops in 14 meters. I hate proving Kunich wrong (again) at the expense of proving Magilla right. But Kunich may be right on an empirical basis. *It make take several hundred meters to slow his fat ass to a stop. Besides this is all theory as we know Kunich has never gone 30 mph on a bike. The missing factor is essentially reaction time, which probably explains how Dr. Evil managed to whomp two riders with his trunk. Here's a claim that reaction times vary around 0.7-1.5 s for drivers in braking situations. That suggests that if the Doctor swerved and braked fast enough, the riders would not have had time to react before hitting the car. He's effectively got about a 1-second head start on braking, and at 50 km/h, that's about 14 meters. In other words, the car could be at zero km/h before the riders got to their brakes, and the rest depends on how closely in front of them he cut. Considering he seems to have been trying to injure them, I'm going to guess really close, like 5m. I figure that scenario as being 14 metres of stopping distance but about 24 metres of rt+ideal stopping. In other words, physics says those cyclists were gonna hit the car no matter how good their brakes, as long as their reaction times were within human norms. Gerbils or monkeys may have better reaction times than humans, though. -- Ryan Cousineau / "In other newsgroups, they killfile trolls." "In rec.bicycles.racing, we coach them."- Hide quoted text - - Show quoted text - You're right. The good Dr. was one up on them knowing he was going to slam the brakes. I hope he gets a few years just because the man bites dog angle will generate a lot of coverage. However as we all know it's more prudent to run over cyclists from behind if you want to avoid the legal tangles. In fact it might be one of the easiest ways on the planet to kill someone without consequences. |
#4
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Bicycle Stopping Distances
On Nov 1, 5:50*pm, Anton Berlin wrote:
However as we all know it's more prudent to run over cyclists from behind if you want to avoid the legal tangles. In fact it might be one of the easiest ways on the planet to kill someone without consequences. I respectfully disagree. My impression, based upon an experience I had, is that it would be easy for the driver of a motorized vehicle to do insure damage by pulling closely in front of a paceline or similar group of cyclists, hitting the brakes and causing the front riders to also hit their brakes. This causes the following riders to plow into the leading riders and if done properly, causes them all to crash in a nice pileup. If executed by a skilled perpetrator there need not be any contact between the car and riders and the driver can depart with no physical evidence of any involvement. After all, a broken rear window and/or blood is far too messy. In the LA road rage trial, relative braking distances and/or capabilities of bikes vs. cars is a red herring thrown in by sleazy defense counsel trying to divert the jury's attention from the fact that the dear doctor performed a deliberate and illegal act which caused exactly the illegal results which might have been expected. DR |
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Bicycle Stopping Distances
DirtRoadie wrote:
On Nov 1, 5:50*pm, Anton Berlin wrote: However as we all know it's more prudent to run over cyclists from behind if you want to avoid the legal tangles. In fact it might be one of the easiest ways on the planet to kill someone without consequences. I respectfully disagree. My impression, based upon an experience I had, is that it would be easy for the driver of a motorized vehicle to do insure damage by pulling closely in front of a paceline or similar group of cyclists, hitting the brakes and causing the front riders to also hit their brakes. This causes the following riders to plow into the leading riders and if done properly, causes them all to crash in a nice pileup. If executed by a skilled perpetrator there need not be any contact between the car and riders and the driver can depart with no physical evidence of any involvement. After all, a broken rear window and/or blood is far too messy. In the LA road rage trial, relative braking distances and/or capabilities of bikes vs. cars is a red herring thrown in by sleazy defense counsel trying to divert the jury's attention from the fact that the dear doctor performed a deliberate and illegal act which caused exactly the illegal results which might have been expected. DR So riddle me this, jackass...how come this cop wasn't charged with even careless driving? http://www.kold.com/global/story.asp?s=7959848 Thanks, Magilla |
#6
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Bicycle Stopping Distances
DirtRoadie wrote: On Nov 1, 5:50*pm, Anton Berlin wrote: However as we all know it's more prudent to run over cyclists from behind if you want to avoid the legal tangles. In fact it might be one of the easiest ways on the planet to kill someone without consequences. I respectfully disagree. My impression, based upon an experience I had, is that it would be easy for the driver of a motorized vehicle to do insure damage by pulling closely in front of a paceline or similar group of cyclists, hitting the brakes and causing the front riders to also hit their brakes. This causes the following riders to plow into the leading riders and if done properly, causes them all to crash in a nice pileup. Most cyclists in group rides are spazzes and are well capable of crashing thesmelves without anyone doing anything. Haven't you ever watched the Tour de France? Half those Euro guys have no idea what the **** they are doing. Some of the most ****ed up riders I've ever seen are in the pro ranks. If executed by a skilled perpetrator there need not be any contact between the car and riders and the driver can depart with no physical evidence of any involvement. After all, a broken rear window and/or blood is far too messy. In the LA road rage trial, relative braking distances and/or capabilities of bikes vs. cars is a red herring thrown in by sleazy defense counsel trying to divert the jury's attention from the fact that the dear doctor performed a deliberate and illegal act which caused exactly the illegal results which might have been expected. DR You mean the OJ Simpson jury or the Robert Blake jury? Magilla |
#7
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Bicycle Stopping Distances
"Ryan Cousineau" wrote in message
]... In article , Anton Berlin wrote: In a head to head test and in normal conditions a bike should be able to stop faster than a car. But that includes that the rider has both hands on the bars (and brakes) which is hard to do when you're flipping someone off. At 50 kmh http://www.exploratorium.edu/cycling/brakes2.html Bike stops in 10 meters http://www.forensicdynamics.com/stopdistcalc Car stops in 14 meters. I hate proving Kunich wrong (again) at the expense of proving Magilla right. But Kunich may be right on an empirical basis. It make take several hundred meters to slow his fat ass to a stop. Besides this is all theory as we know Kunich has never gone 30 mph on a bike. The missing factor is essentially reaction time, which probably explains how Dr. Evil managed to whomp two riders with his trunk. Here's a claim that reaction times vary around 0.7-1.5 s for drivers in braking situations. That suggests that if the Doctor swerved and braked fast enough, the riders would not have had time to react before hitting the car. He's effectively got about a 1-second head start on braking, and at 50 km/h, that's about 14 meters. In other words, the car could be at zero km/h before the riders got to their brakes, and the rest depends on how closely in front of them he cut. Considering he seems to have been trying to injure them, I'm going to guess really close, like 5m. I figure that scenario as being 14 metres of stopping distance but about 24 metres of rt+ideal stopping. In other words, physics says those cyclists were gonna hit the car no matter how good their brakes, as long as their reaction times were within human norms. Gerbils or monkeys may have better reaction times than humans, though. As usual, those who fail to think do the most talking. The brakes on a modern car will stop the car at a rate of about one gee. Race cars commonly brake well above one gee. Moreover, car tires, which cover a large portion of the road and put more square inches of rubber on the road per lb. of load, are less susceptible to road conditions, gravel etc. on the road and other traction problems. Because of the high center of gravity a bicycle has, the braking force you can apply while sitting normally on the saddle is about 1/2 gee. Got that? HALF the braking force of a car. You can increase your braking force to perhaps .85 gees by sliding backwards and putting your stomach on the saddle. This unfortunately greatly decreases your control of the bicycle while increasing your ability to brake by lowering your center of gravity. Note that normally the time to slide back like that would take more time/distance than the slightly improved braking would justify. The reaction time for both the driver and the rider are the same and so can be ignored when discussing stopping distances at equal speeds. |
#8
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Bicycle Stopping Distances
On Nov 1, 6:50*pm, "Tom Kunich" wrote:
"Ryan Cousineau" wrote in message ]... In article , Anton Berlin wrote: In a head to head test and in normal conditions a bike should be able to stop faster than a car. But that includes that the rider has both hands on the bars (and brakes) which is hard to do when you're flipping someone off. At 50 kmh http://www.exploratorium.edu/cycling/brakes2.html Bike stops in 10 meters http://www.forensicdynamics.com/stopdistcalc Car stops in 14 meters. I hate proving Kunich wrong (again) at the expense of proving Magilla right. But Kunich may be right on an empirical basis. *It make take several hundred meters to slow his fat ass to a stop. Besides this is all theory as we know Kunich has never gone 30 mph on a bike. The missing factor is essentially reaction time, which probably explains how Dr. Evil managed to whomp two riders with his trunk. Here's a claim that reaction times vary around 0.7-1.5 s for drivers in braking situations. That suggests that if the Doctor swerved and braked fast enough, the riders would not have had time to react before hitting the car. He's effectively got about a 1-second head start on braking, and at 50 km/h, that's about 14 meters. In other words, the car could be at zero km/h before the riders got to their brakes, and the rest depends on how closely in front of them he cut. Considering he seems to have been trying to injure them, I'm going to guess really close, like 5m. I figure that scenario as being 14 metres of stopping distance but about 24 metres of rt+ideal stopping. In other words, physics says those cyclists were gonna hit the car no matter how good their brakes, as long as their reaction times were within human norms. Gerbils or monkeys may have better reaction times than humans, though. As usual, those who fail to think do the most talking. The brakes on a modern car will stop the car at a rate of about one gee. Race cars commonly brake well above one gee. Moreover, car tires, which cover a large portion of the road and put more square inches of rubber on the road per lb. of load, are less susceptible to road conditions, gravel etc. on the road and other traction problems. Because of the high center of gravity a bicycle has, the braking force you can apply while sitting normally on the saddle is about 1/2 gee. Got that? HALF the braking force of a car. You can increase your braking force to perhaps .85 gees by sliding backwards and putting your stomach on the saddle. This unfortunately greatly decreases your control of the bicycle while increasing your ability to brake by lowering your center of gravity.. Note that normally the time to slide back like that would take more time/distance than the slightly improved braking would justify. The reaction time for both the driver and the rider are the same and so can be ignored when discussing stopping distances at equal speeds.- Hide quoted text - - Show quoted text - Gee, where the **** did you get the idea G was gee? Geesus ****ing christ you're an idiot. |
#9
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Bicycle Stopping Distances
In article
, Anton Berlin wrote: On Nov 1, 6:50Â*pm, "Tom Kunich" wrote: "Ryan Cousineau" wrote in message ]... In article , Anton Berlin wrote: In a head to head test and in normal conditions a bike should be able to stop faster than a car. But that includes that the rider has both hands on the bars (and brakes) which is hard to do when you're flipping someone off. At 50 kmh http://www.exploratorium.edu/cycling/brakes2.html Bike stops in 10 meters http://www.forensicdynamics.com/stopdistcalc Car stops in 14 meters. I hate proving Kunich wrong (again) at the expense of proving Magilla right. But Kunich may be right on an empirical basis. Â*It make take several hundred meters to slow his fat ass to a stop. Besides this is all theory as we know Kunich has never gone 30 mph on a bike. The missing factor is essentially reaction time, which probably explains how Dr. Evil managed to whomp two riders with his trunk. Here's a claim that reaction times vary around 0.7-1.5 s for drivers in braking situations. That suggests that if the Doctor swerved and braked fast enough, the riders would not have had time to react before hitting the car. He's effectively got about a 1-second head start on braking, and at 50 km/h, that's about 14 meters. In other words, the car could be at zero km/h before the riders got to their brakes, and the rest depends on how closely in front of them he cut. Considering he seems to have been trying to injure them, I'm going to guess really close, like 5m. I figure that scenario as being 14 metres of stopping distance but about 24 metres of rt+ideal stopping. In other words, physics says those cyclists were gonna hit the car no matter how good their brakes, as long as their reaction times were within human norms. Gerbils or monkeys may have better reaction times than humans, though. As usual, those who fail to think do the most talking. The brakes on a modern car will stop the car at a rate of about one gee. Race cars commonly brake well above one gee. Moreover, car tires, which cover a large portion of the road and put more square inches of rubber on the road per lb. of load, are less susceptible to road conditions, gravel etc. on the road and other traction problems. Because of the high center of gravity a bicycle has, the braking force you can apply while sitting normally on the saddle is about 1/2 gee. Got that? HALF the braking force of a car. You can increase your braking force to perhaps .85 gees by sliding backwards and putting your stomach on the saddle. This unfortunately greatly decreases your control of the bicycle while increasing your ability to brake by lowering your center of gravity. Note that normally the time to slide back like that would take more time/distance than the slightly improved braking would justify. The reaction time for both the driver and the rider are the same and so can be ignored when discussing stopping distances at equal speeds.- Hide quoted text - - Show quoted text - Gee, where the **** did you get the idea G was gee? Geesus ****ing christ you're an idiot. I always write `g' or `g_n', because the official nomenclature is `g' with a a subscript `n'; and the value is 9.806Â*65 m /s^2 exactly. -- Michael Press |
#10
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Bicycle Stopping Distances
Michael Press wrote:
and the value is 9.806 65 m /s^2 exactly. Depends. |
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