A car traveling along a straight road is clocked at a number of points. The data from the observations are given in the following table, where the time is in seconds, the distance is in feet, and the speed is in feet per second. Time 3 5 8 13 Distance Speed 1. Use a Divided difference scheme to predict the position of the car and its speed when t = 225 383 623 993 75 77 80 74 72 10s. 2. Use the derivative of the polynomial to determine whether the car ever exceeds a 55 mi/h speed limit on the road. If so, what is the first time the car exceeds this speed? 3. What is the predicted maximum speed for the car using appropriate coding scheme?
A car traveling along a straight road is clocked at a number of points. The data from the observations are given in the following table, where the time is in seconds, the distance is in feet, and the speed is in feet per second. Time 3 5 8 13 Distance Speed 1. Use a Divided difference scheme to predict the position of the car and its speed when t = 225 383 623 993 75 77 80 74 72 10s. 2. Use the derivative of the polynomial to determine whether the car ever exceeds a 55 mi/h speed limit on the road. If so, what is the first time the car exceeds this speed? 3. What is the predicted maximum speed for the car using appropriate coding scheme?
Algebra & Trigonometry with Analytic Geometry
13th Edition
ISBN:9781133382119
Author:Swokowski
Publisher:Swokowski
Chapter7: Analytic Trigonometry
Section7.6: The Inverse Trigonometric Functions
Problem 93E
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