Answer:
a) 0.78 m/s
b)The velocity vector points 81.1 degrees with respect to the horizontal
Explanation:
First of all we need to figure the air time of the mug. It will fall from an initial height of 1.28 m without vertical initial speed thus [tex]v_{0y}=0 \, m/s[/tex].
The vertical displacement equation is given by:
[tex]y(t)=-\frac{1}{2}gt^2+v_{0y}t+y_0=-\frac{1}{2}gt^2+1.28[/tex]
Plugging in the values of [tex]y_0=1.28\, m[/tex], [tex]g=9.81 ', m/s^2[/tex] and [tex]y(t)=0[/tex] (because we want to know at what time [tex]y(t)[/tex] equals zero, that is the position of the mug is at the floor) we get the following equation:
[tex]0=-\frac{1}{2}gt^2+y_0\implies t=\sqrt\frac{2y_0}{g}[/tex]
For the x and y velocities we have:
[tex]v_x=v_{0x}=\frac{d_x}{t}=\frac{0.40}{\sqrt{\frac{2y_0}{g}}}\approx 0.78\, m/s[/tex]
The above gives the first answer, let's continue with the y velocity:
[tex]v_y=-gt[/tex]
For the y-velocity at the instant the mug is in the floor we have:
[tex]v_y=-gt\approx -5\, m/s[/tex]
To know the angle of direction of the velocity vector with respect to the horizontal we have:
[tex]\arctan{\frac{v_y}{v_x}\approx 81.11 \, degrees[/tex]
