Answer:
μ = 0.6
Explanation:
given,
speed of car = 29.7 m/s
Radius of curve = 50 m
θ = 30.0°
minimum static friction = ?
now,
writing all the forces acting along y-direction
N cos θ - f sinθ = mg
N cos θ -μN sinθ = mg
[tex]N = \dfrac{m g}{cos\theta-\mu sin \theta}[/tex]
now, writing the forces acting along x- direction
N sin θ + f cos θ = F_{net}
N cos θ + μN sinθ = F_{net}
[tex]\dfrac{m g}{cos\theta-\mu sin \theta}(cos \theta + \mu sin\theta)=F_{net}[/tex]
taking cos θ from nominator and denominator
[tex]F_{net} =\dfrac{tan\theta + \mu}{1-\mutan\theta}. mg[/tex]
[tex]\dfrac{mv^2}{r}=\dfrac{tan\theta + \mu}{1-\mutan\theta}. mg[/tex]
[tex]\dfrac{v^2}{r}=\dfrac{tan\theta + \mu}{1-\mutan\theta}g[/tex]
[tex]\mu=\dfrac{v^2 -r g tan\theta}{v^2tan\theta + r g}[/tex]
now, inserting all the given values
[tex]\mu=\dfrac{29.7^2 -50 \times 9.8tan 30^0}{29.7^2\times tan 30^0 +50 \times 9.8}[/tex]
μ = 0.6
