91Ó°ÊÓ

It is given that,

$$\begin{gathered} y=9.1m \\ \stackrel{→}{v}=7.6\hat{i}+6.1\hat{j} \end{gathered}$$

This problem is based on kinematic equations of motion that describe the motion of an object with constant acceleration. Using the velocity vector of the ball given at the distance, the initial velocity and its angle can be found. Using this, find the rest of the values.

Formulae:

The final velocity in kinematic equation can be written as,

$v_f^2=v_0^2+2ay$ (i)

$v_f=v_0+at$ (ii)

The magnitude of the velocity is,

$v=\sqrt{v_x^2+v_y^2}$ (iii)

$\mathrm{θ}={\tan }^{-1}\left(\frac{v_y}{v_x}\right)$ (iv)

For the velocity in y direction the equation (i) can be written as,

$$\begin{gathered} v_{fy}^2=v_{0y}^2+2ay\left(v\right) \\ {\left(6.1\right)}^2=v_{0y}^2-\left(2×9.8×9.1\right) \\ 37.21=v_{0y}^2-178.36 \\ {v}_{0y}^2=37.21+178.36 \\ {v}_{0y}^2=215.57 \\ {v}_{0y}^2=\sqrt{215.57} \\ {v}_{0y}^2=14.7m/s \end{gathered}$$

As there is no acceleration in the horizontal direction, so the velocity will be constant throughout the motion.

$v_{0x}=7.6m/s$

At the maximum height of the projectile,$v_{fy}=0$ , thus the equation (v) can be written as,

$$\begin{gathered} 0={\left(14.7\right)}^2-\left(2×9.8×y_{max}\right) \\ {y}_{max}=\frac{14.7^2}{2×9.8} \\ {y}_{max}=11.0m \end{gathered}$$

Time required to reach the maximum height is given by equation (ii) and can be written as,,

$v_{fy}=v_{0y}+at$

For maximum height, $v_{fy}=0$

$$\begin{gathered} 0=14.7-9.8×t \\ \frac{14.7}{9.8}=t \\ t=1.5s \end{gathered}$$

Time required for total flight,

role="math" localid="1661146549954" $$\begin{gathered} T=2×timerequiredtoreachthemaximumheight \\ =2×1.5 \\ T=3.0sec \end{gathered}$$

$$\begin{gathered} speed=\frac{dis\tan ce}{time} \\ dis\tan ce=speed×time \\ =7.6×3 \end{gathered}$$

$$\begin{gathered} dis\tan ce=22.8 \\ ≈23m \end{gathered}$$

When the ball is about to hit the ground, its velocity components will be 7.6 m/s in the x direction and -14.7 m/s in the y direction. The magnitude of the velocity is then given by equation (iii)

$$\begin{gathered} v=\sqrt{v_x^2+v_y^2} \\ =\sqrt{7.6^2+{\left(-14.7\right)}^2} \\ =\sqrt{57.76+216.09} \\ v=16.5 \\ ≈17m/s \end{gathered}$$

$$\begin{gathered} \mathrm{θ}={\tan }^{-1}\left(\frac{v_y}{v_x}\right) \\ ={\tan }^{-1}\left(-\frac{14.7}{7.6}\right) \\ \mathrm{θ}=-62.66° \\ ≈-63° \end{gathered}$$

With the sign of the components, it is said that the resultant of the vector lie in the fourth quadrant. Therefore, the maximum height attained, total horizontal distance travelled by the ball, angle of the ball’s velocity when it is about to the hit the ground can be found using the kinematic equations and concept of projectile motion.