Answer:
a) car does not skid , b) car skids, c) v = 11.07 m / s
Step-by-step explanation:
a) When the car around in a curve all force must be exerted by friction, write Newton's second Law
Y axis (vertical)
N - W = 0
N = W = mg
X axis (radial
F = m a
The acceleration is centripetal
a = v² / r
fr = μ N
Let's calculate the maximum friction force
fr = μ m g
fr = 0.70 2000 9.8
fr = 13720 N
Let's calculate the force necessary to take the curve
F = m v² / r
F = 2000 11²/25
F = 9680 N
When examining these two values we see that the maximum value of the friction force is greater than the force to stay in the curve, for which the car does not skid
b) The speed of the driver is v = 18m / s, let's calculate the force to stay in the curve
F = 2000 18²/25
F = 25920 N
This force is greater than the maximum friction force, so it is a skating car
c) The friction coefficient decreases to μ = 0.5
fr = m a
μ mg = m v² / r
v = √μ g r
v = √(0.50 9.8 25)
v = 11.07 m / s
This is the maximum speed