A ball is thrown from a level of 6ft straight up into the air with an...

A ball is thrown vertically upward from the 40-ft level in an elevator shaft with an...

A ball is thrown vertically upward from the 40-ft level in an elevator shaft with an initial velocity (straight up) of 50 ft/sec. At the same instant, far below, an open-platform elevator passes the 10-ft level in the elevator shaft, moving upward with a constant velocity of 5 ft/sec. Determine (a) when and where the ball will hit the elevator, (b) the relative velocity of the ball with respect to the elevator when the ball hits the elevator.

A ball is thrown straight up from the too of a building 128 ft. tall with...

A ball is thrown straight up from the too of a building 128 ft. tall with qn initial velocity of 48 ft per second. The distance s(t) (in feet) of the ball from the fround is given by s(t)=128+48t-16t^2. Find the maximum height attained by the ball.

46)  A ball is shot from the ground straight up into the air with initial velocity of...

46)  A ball is shot from the ground straight up into the air with initial velocity of 47 ft/sec. Assuming that the air resistance can be ignored, how high does it go?    Hint: The acceleration due to gravity is 32 ft per second squared.

A girl throws a ball straight up into the air with the initial velocity v0 =...

A girl throws a ball straight up into the air with the initial velocity v0 = 18.0 m/s. At a certain point, the ball falls back into the girl's hands. a) What is the highest height the ball will reach? b) How long is the ball in the open air? c) What is the velocity of the ball just before it hits again?

A ball is thrown straight down from the top of a 497-foot building with an initial...

A ball is thrown straight down from the top of a 497-foot building with an initial velocity of -15 feet per second. Use the position function below for free-falling objects. s(t) = -16t2 + v0t + s0 What is its velocity after 2 seconds? v(2) =  ft/s What is its velocity after falling 316 feet? v =  ft/s

2. A ball is thrown straight upward from the window of a building 40 meters above...

2. A ball is thrown straight upward from the window of a building 40 meters above the ground with an initial velocity of 20 m/s. Calculate a. The speed of the ball after 1.5 sec. b. The time needed for ball to reach its maximum height. c. The maximum height. d. The time needed for the ball to return back to the same window which was thrown e. The time needed for the ball to reach the ground. f. Final...

11. a ball is thrown up from the ground with an initial velocity of 120 feet...

11. a ball is thrown up from the ground with an initial velocity of 120 feet per second. The height s in feet can be expressed as a function of time t in seconds by s(t)=85t-16t^2 a. when does the ball reach its maximum height b. what is the maximum height c. when does the ball hit the ground 12. a farmer has 2800 feet of fencing material with which to enclose a rectangle field that borders a straight stream....

A ball is thrown directly upward from a height of 3 ft with an initial velocity...

A ball is thrown directly upward from a height of 3 ft with an initial velocity of 20 ft/sec. the function s(t) = -16t^2+20t+3 gives the height of the ball, in feet, t seconds after it has been thrown. Determine the time at which the ball reaches its maximum height and find the maximum height.

Answer the following questions for the given problem: A ball is thrown up into the air....

Answer the following questions for the given problem: A ball is thrown up into the air. The ball’s height , h (in feet), from the ground is modeled by h(t) = -16t2 + 64t +5, where t is measured in seconds. Before answering these questions, think about the practical meaning of the vertex, y intercept and x intercepts, and how they apply to this problem. 1. What is the height of the ball at its highest point? 2. How many...

ball weighing 1 pound is thrown vertically upward from a point 6 ft above the surface...

ball weighing 1 pound is thrown vertically upward from a point 6 ft above the surface of the earth with an initial velocity of 18 ft/sec. As it rises it is acted upon by air resistance that is numerically equal to (1/16)*v (in pounds) where v is the velocity (in feet per second). How high will the ball rise? NOTE: Before you attempt to answer, please take into consideration that this problem is for a Differential Equations class (NOT A...