0:00:14.000,0:00:17.000 Have you ever noticed that it's harder [br]to start pedaling your bicycle 0:00:17.000,0:00:20.000 than it is to ride at a constant speed? 0:00:20.000,0:00:23.000 Or wondered what causes your bicycle to move? 0:00:23.000,0:00:27.246 Or thought about why it goes forward [br]instead of backwards or sideways? 0:00:27.246,0:00:30.259 Perhaps not, and you wouldn't be alone. 0:00:30.259,0:00:31.815 It wasn't until the 17th century 0:00:31.815,0:00:34.692 that Isaac Newton described [br]the fundamental laws of motion 0:00:34.692,0:00:37.000 and we understood the answer [br]to these three questions. 0:00:37.000,0:00:40.800 What Newton recognized was that [br]things tend to keep on doing 0:00:40.800,0:00:43.692 what they are already doing. [br]So when your bicycle is stopped, 0:00:43.692,0:00:46.692 it stays stopped, and when it is going, 0:00:46.692,0:00:48.000 it stays going. 0:00:48.000,0:00:50.000 Objects in motion tend to stay in motion 0:00:50.000,0:00:53.815 and objects at rest tend to stay at rest. 0:00:53.815,0:00:55.891 That's Newton's First Law. 0:00:55.891,0:00:59.523 Physicists call it the Law of Inertia, [br]which is a fancy way of saying 0:00:59.523,0:01:03.984 that moving objects don't spontaneously [br]speed up, slow down, or change direction. 0:01:03.984,0:01:09.000 It is this inertia that you must overcome [br]to get your bicycle moving. 0:01:09.000,0:01:12.000 Now you know that you have to overcome [br]inertia to get your bicycle moving, 0:01:12.000,0:01:14.000 but what is it that allows you to overcome it? 0:01:14.000,0:01:18.076 Well, the answer is explained by Newton's Second Law. 0:01:18.076,0:01:20.538 In mathematical terms, Newton's Second Law says 0:01:20.538,0:01:24.000 that force is the product of mass times acceleration. 0:01:24.000,0:01:27.000 To cause an object to accelerate, or speed up, 0:01:27.000,0:01:29.000 a force must be applied. 0:01:29.000,0:01:31.000 The more force you apply, 0:01:31.000,0:01:34.000 the quicker you accelerate. [br]And the more mass your bicycle has, 0:01:34.000,0:01:36.000 and the more mass you have too, 0:01:36.000,0:01:39.830 the more force you have to use [br]to accelerate at the same rate. 0:01:39.830,0:01:43.646 This is why it would be really difficult [br]to pedal a 10,000 pound bicycle. 0:01:43.646,0:01:49.060 And it is this force, which is applied [br]by your legs pushing down on the pedals, 0:01:49.060,0:01:52.092 that allows you to overcome Newton's Law of Inertia. 0:01:52.092,0:01:54.969 The harder you push down on the pedals, [br]the bigger the force 0:01:54.969,0:01:56.569 and the quicker you accelerate. 0:01:56.569,0:01:58.784 Now on to the final question: 0:01:58.784,0:02:00.661 When you do get your bike moving, 0:02:00.661,0:02:03.000 why does it go forward? 0:02:03.000,0:02:05.000 According to Newton's Third Law, [br]for every action, 0:02:05.000,0:02:07.861 there is an equal and opposite reaction. 0:02:07.861,0:02:12.292 To understand this, think about what [br]happens when you drop a bouncy ball. 0:02:12.292,0:02:13.953 As the bouncy ball hits the floor, 0:02:13.953,0:02:15.815 it causes a downward force on the floor. 0:02:15.815,0:02:17.876 This is the action. 0:02:17.876,0:02:21.000 The floor reacts by pushing [br]on the ball with the same force, 0:02:21.000,0:02:24.000 but in the opposite direction, upward, 0:02:24.000,0:02:27.000 causing it to bounce back up to you. 0:02:27.000,0:02:29.000 Together, the floor and the ball form what's called 0:02:29.000,0:02:32.000 the action/reaction pair. [br]When it comes to your bicycle, 0:02:32.000,0:02:35.569 it is a little more complicated. [br]As your bicycle wheels spin 0:02:35.569,0:02:39.000 clockwise, the parts of each tire [br]touching the ground 0:02:39.000,0:02:41.000 push backwards against the Earth: 0:02:41.000,0:02:45.000 the actions. The ground pushes [br]forward with the same force 0:02:45.000,0:02:49.261 against each of your tires: the reactions. 0:02:49.261,0:02:53.000 Since you have two bicycle tires, [br]each one forms an action/reaction pair 0:02:53.000,0:02:56.553 with the ground. And since [br]the Earth is really, really, really big 0:02:56.553,0:02:59.000 compared to your bicycle, it barely moves 0:02:59.000,0:03:02.000 from the force caused by your bicycle [br]tires pushing backwards, 0:03:02.000,0:03:11.795 but you are propelled forward.