Respuesta :
Answer:
0.02 m
Explanation:
R₁ = initial distance jumped by jumper = 7.4 m
R₂ = final distance jumped by jumper = ?
θ₁ = initial angle of jump = 45°
θ₂ = final angle of jump = 42.9°
[tex]v[/tex] = speed at which jumper jumps at all time
initial distance jumped is given as
[tex]R_{1}=\frac{v^{2}Sin2\theta _{1} }{g}[/tex]
final distance jumped is given as
[tex]R_{2}=\frac{v^{2}Sin2\theta _{2} }{g}[/tex]
Dividing final distance by initial distance
[tex]\frac{R_{2}}{R_{1}}=\frac{Sin2\theta _{1}}{Sin2\theta _{2}}[/tex]
[tex]\frac{R_{2}}{7.4}=\frac{Sin2(42.9)}{Sin2(45))}[/tex]
[tex]R_{2} =7.38[/tex]
distance lost is given as
d = [tex]R_{1} - R_{2} [/tex]
d = 7.4 - 7.38
d = 0.02 m
