The height, in feet, of an object shot upwards into the air with an initial velocity, in feet per second, of v₁. after t seconds is given by the formula: h = - 161² + vt Use the equation above to answer questions about a model rocket is launched from the ground into the air with an initial velocity of 384 feet per second. Use the graph below to help answer the questions. Height in Feet H Module 05 Starting Point Highest Point Save and Close Time in Seconds Assessment Instructions Show and explain all steps in your responses to the following parts of the assignment using the Algebra concepts discussed within the course. All mathematical steps and explanations must be typed up and formatted using the equation editor. Landing Point Part 1: Create the equation for the height of the rocket after t seconds. Part 2: Find the time it takes for the rocket to reach a height of 0. Interpret both solutions. Part 3: Find the time it takes to reach the top of its trajectory. Part 4: Find the maximum height. Part 5: Find the time it takes to reach a height of 900 feet. Round your answer to the nearest tenth. Submit

The height, in feet, of an object shot upwards into the air with an initial velocity, in feet per second, of Vi,
after t seconds is given by the formula:
h=
-1612 + vI
Use the equation above to answer questions about a model rocket is launched from the ground into the air with an
initial velocity of 384 feet per second. Use the graph below to help answer the questions
H
©
Highest
Point
Height in Feet
Starting
Point
Landing
Point
Time in Seconds
Assessment Instructions
Show and explain all steps in your responses to the following parts of the assignment using the Algebra concepts
discussed within the course. All mathematical steps and explanations must be typed up and formatted using the
equation editor.
Part 1: Create the equation for the height of the rocket after t seconds.
Part 2: Find the time it takes for the rocket to reach a height of O. Interpret both solutions.
Part 3: Find the time it takes to reach the top of its trajectory.
Part 4: Find the maximum height.
Part 5: Find the time it takes to reach a height of 900 feet. Round your answer to the nearest

 

step by step

Transcribed Image Text:

2:19 PM Sat Mar 11 X = X Height in Feet Blackboard Ultra after t seconds is given by the formula: The height, in feet, of an object shot upwards into the air with an initial velocity, in feet per second, of vi, H h = - 16t² + v t Use the equation above to answer questions about a model rocket is launched from the ground into the air with an initial velocity of 384 feet per second. Use the graph below to help answer the questions. Starting Point Module 05 Highest Point Save and Close Time in Seconds 5G% 100% Landing Point t Assessment Instructions Show and explain all steps in your responses to the following parts of the assignment using the Algebra concepts discussed within the course. All mathematical steps and explanations must be typed up and formatted using the equation editor. Submit Part 1: Create the equation for the height of the rocket after t seconds. Part 2: Find the time it takes for the rocket to reach a height of 0. Interpret both solutions. Part 3: Find the time it takes to reach the top of its trajectory. Part 4: Find the maximum height. Part 5: Find the time it takes to reach a height of 900 feet. Round your answer to the nearest tenth. с