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hello using the kinematic eqautions for the horizontal projectile of a ball being thrown I am given range of flight dx= 1.02time of flight t= 1.20 sheight of launch dy= 1m I need help finding the initial velocity of the realase

User Mducc
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1 Answer

9 votes
9 votes

Answer:

intial velocity: 6.02 m /s

Step-by-step explanation:

To find the initial velocity, we make use of the following kinematic equations


\begin{gathered} y=y_0+(v_0\sin \theta)t-(1)/(2)gt^2 \\ x=(v_0\cos \theta)t \end{gathered}

Now we know that t = 1.20 s, g = 9.8 m /s, y0 = 1.0 m, and at the ground y =0; therefore, the above equations give


\begin{gathered} 0=1+(v_0\sin \theta)(1.20)-(1)/(2)(9.8)(1.20)^2 \\ 1.02=(v_0\cos \theta)(1.20) \end{gathered}

solving these equations for v0 sin θ and v0 cos θ gives


((1)/(2)(9.8)(1.20)^2-1)/(\mleft(1.20\mright))=(v_0\sin \theta)
\Rightarrow v_0\sin \theta=5.05

and


(1.02)/(\mleft(1.20\mright))=(v_0\cos \theta)
v_0\cos \theta=0.85

Now dividing the two equations gives


(v_0\sin \theta)/(v_0\cos \theta)=(5.05)/(0.85)
\tan \theta=5.94

taking the inverse tan gives


\theta=80.45^o

Now that we know theta, it is easy to find v0.


v_0\sin (80.45)=5.94
v_0=(5.94)/(\sin (80.45))
\boxed{v_0=6.02}

which is our answer!

User AlanObject
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