B) 5 feet
C) 60 feet
D) 100 feet
Answer:
The answer is D
Step-by-step explanation:
Lacking the graph or a function showing the ball's trajectory, the question cannot be answered at this point. However, it can usually be solved using kinematics, assuming we have initial velocity, throw height, and acceleration due to gravity (-9.8 m/s^2).
Unfortunately, without the actual graph or a function representing the path of the ball, it's not possible to accurately answer the question, 'After ten seconds how high was the ball (round to the nearest foot)?'. In physics, typically, we could use the equations of kinematics to solve such a problem if we have the relevant data, which includes initial velocity, the height from which the ball was thrown, and the acceleration due to gravity, which is -9.8 m/s^2. These equations particularly apply to a scenario such as this where Andy throws a ball from top of a building and watches it hit the ground.
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Answer:
202
Step-by-step explanation:
Match Term Definition
Triangle A) perpendicular cross section of a cylinder
Rectangle B) perpendicular cross section of a pyramid
Circle C) shape created when a right triangle is rotated about the y-axis
Cylinder D) parallel cross section of a sphere
Answer:
Part A) Rectangle
Part B) Triangle
Part C) Cone
Part D) Circle
Step-by-step explanation:
Part A) Perpendicular cross section of a cylinder
The perpendicular cross section of a cylinder is a rectangle
The base of the rectangle is equal top the diameter of the circular base of cylinder and the height of the rectangle is equal to the height of the cylinder
Part B) Perpendicular cross section of a pyramid
Cross sections perpendicular to the base and through the vertex of a pyramid will be triangles
Part C) Shape created when a right triangle is rotated about the y-axis
When a right triangle is rotated about the y-axis, then it forms a cone.
The vertical leg of the triangle becomes the height of the cone.
The horizontal leg of the triangle becomes the radius of the cone.
The hypotenuse of the triangle becomes the slant height
Part D) Parallel cross section of a sphere
The parallel cross section of a sphere is a circle
All cross sections of a sphere are circles