When you need to apply a small tweak to the document, it must not take long to Initiate equation pdf. Such a basic action does not have to require extra education or running through manuals to understand it. Using the appropriate document modifying tool, you will not take more time than is necessary for such a swift change. Use DocHub to streamline your modifying process regardless if you are an experienced user or if it is your first time using an online editor service. This instrument will require minutes or so to learn to Initiate equation pdf. The sole thing needed to get more productive with editing is actually a DocHub account.
A simple document editor like DocHub will help you optimize the time you need to dedicate to document modifying regardless of your prior experience with this kind of resources. Create an account now and increase your productivity instantly with DocHub!
- NASA LAUNCHES A ROCKET AT T = 0 SECONDS. ITS HEIGHT IN METERS ABOVE SEA LEVEL AS A FUNCTION OF TIME IS GIVEN BY THE FUNCTION H OF T. WE WILL ASSUME THE ROCKET WILL SPLASH DOWN INTO THE OCEAN. WE WANT TO ANSWER TWO QUESTIONS. 1. WHAT TIME WILL THE ROCKET SPLASH INTO THE OCEAN? 2. HOW HIGH ABOVE SEA LEVEL WILL THE ROCKET docHub? NOW, WE JUST SOLVED THIS PROBLEM USING A GRAPHING CALCULATOR, BUT NOW WERE GOING TO SOLVE IT USING WHAT WE KNOW ABOUT QUADRATIC FUNCTIONS AND QUADRATIC EQUATIONS. SO BEFORE WE SOLVE THIS I THINK ITS GOING TO BE HELPFUL TO UNDERSTAND WHATS HAPPENING IF WE GRAPH THIS FUNCTION. SO IVE ALREADY GRAPHED THIS USING SOME GRAPHING SOFTWARE. SO OUR X AXIS REPRESENTS TIME IN SECONDS AND OUR Y AXIS REPRESENTS THE METERS ABOVE SEA LEVEL. NOTICE AT TIME T = 0 THE ROCKET WOULD BE RIGHT HERE, WHICH WOULD BE THE Y INTERCEPT. THIS REPRESENTS THE INITIAL HEIGHT OF THE ROCKET AND THEN AS TIME PASSES THE ROCKET GOES UP, docHubES A MAXIMUM HEIGHT HERE AT THE