Problem 5: A baseball slugger smacks a pitch and watches the ball float into the bleachers for a home run, landing h=6.5m higher than it was struck. When visiting with the fan that caught the ball, he learned the ball was moving with final velocity vf= 39.15m/s at an angle θf=26.5° below horizontal when caught. Assume the ball encountered no air resistance, and use a Cartesian coordinate system with the origin located at the ball's initial position.
Part (a) Create an expression for the ball's initial horizontal velocity, v0 x in terms of the variables given in the problem statement.
Part (b) Calculate the ball's initial vertical velocity, v0y in m /s.
Part (c) Calculate the magnitude of the ball's initial velocity, v0, in m /s.
Part (d) Find the angle θ0 in degrees above the horizontal at which the ball left the bat.
A baseball slugger smacks a pitch and watches the ball float into the bleachers for a home run
A baseball slugger hits a pitch and watches the ball fly into the bleachers for a home run, landing h=8.5 m higher than it was struck. When visiting with the fan that caught the ball, he learned the ball was moving with final velocity vf= 39.45 m / s at an angle θf=29.5° below horizontal when caught. Assume the ball encountered no air resistance, and use a Cartesian coordinate system with the origin located at the ball's initial position.
Problem 10: During a baseball game, a baseball is struck at ground level by a batter. The ball leaves the baseball bat with an initial velocity v0=29m/s at an angle θ= 21° above horizontal. Let the origin of the Cartesian coordinate system be the ball's position the instant it leaves the bat. Air resistance may be ignored throughout this. problem.
A batter hits a home run. The ball leaves the bat at a 17.4 degree angle above the horizontal and travels 135m horizontally. What is the velocity of the ball when it is caught by a fan who is in the bleachers, 3.52m higher than where it was hit?
A baseball is thrown at an angle = 21° above the horizontal with an initial vertical velocity v0y = 9.75 m/s. Use a Cartesian coordinate system with the origin at the baseball's initial position.Part (a) Create an expression for the ball's initial horizontal velocity component, v0x, in terms of v0y, sin(θ), and cos(θ).Part (b) Calculate the initial horizontal velocity component, v0x in m/s. Part (c) Find the ball's initial velocity magnitude, v0 in m/s.
In the figure here, a ball is thrown up onto a roof, landing 4.30 s later at height h = 20.0 m above the release level. The ball's path just before landing is angled at θ = 68.0˚ with the roof. (a) Find the horizontal distance d it travels. (Hint: One way is to reverse the motion, as if it is on a video.) What are the (b) magnitude and (c)angle (relative to the horizontal) of the ball's initial velocity?...
A baseball player hits a home run, and the ball lands in the left- field seats, y=7.70 m above the point at which it was hit. It lands with a velocity of v= 39 m/s at an angle of 28 degrees below the horizontal. The positive directions are upward and to the right in the drawing. Ifnoring aie resistance, find the magnitude and the direction of the initial velocity with which the ball leaves the bat. A baseball player hits...
A batted baseball leaves the bat at an angle of 30.0 degrees about the horizontal and is caught by an outfilder 375 ft from home plate at the same height from which it left the bat. (a) what was the initial speed on the ball? (b) how high does the ball rise about the point where is struck the bat?
A baseball player hits a home run, and the ball lands in the left-field seats, y3,00 m above the point at which it wasnt. It lands with a velocity of v = 33.0 m/s at an angle of 20 below the horizontal (see the Figure). The positive directions are upward and to the right in the drawing, Ignoring ar resistance, find (a) the magnitude and (b) the direction of the initial velocity with which the ball leaves the bat 8.00...
A second baseman tosses the ball to the first baseman, who catches it at the same level from which it was thrown. The throw is made with an initial speed of 19.0 m/s at an angle of 33.0 ∘above the horizontal. Part a) What is the horizontal component of the ball's velocity just before it is caught? Part b) How long is the ball in the air?
In the figure here, a ball is thrown up onto a roof, landing 3.80 s later at height h = 25.0 m above the release level. The ball's path just before landing is angled at theta = 61.0 degree with the roof, (a) Find the horizontal distance d it travels. What are the (b) magnitude and (c) angle (relative to the horizontal) of the ball's initial velocity? Number Unit Number Unit Number Unit