A model train with a mass of 5 kg5kg is moving along a track at 12 (cm)/s12cms. If the curvature of the track changes from a radius of 16 cm16cm to 24 cm24cm, by how much must the centripetal force applied by the tracks change?

2 Answers
Al E.
Apr 30, 2018

Given,

m = 5"kg"m=5kg

nu = (0.12"m")/"s"ν=0.12ms

r_1 = 0.16"m"r1=0.16m

r_2 = 0.24"m"r2=0.24m

Now, recall,

F_"R" = m * nu^2/rFR=mν2r

Hence, the centripetal force applied by the tracks on the model train must change by,

DeltaF_"R" = mnu^2(1/r_1 - 1/r_2) approx 0.15"N"

Note that as the radius increases, the centripetal force will generally decrease, such that,

F_"R" propto 1/r

Narad T.
Apr 30, 2018

The change in centripetal force is =0.15N

Explanation:

The centripetal force is

vecF_C=(mv^2)/r*vecr

The mass is of the train m=5kg

The velocity of the train is v=0.12ms^-1

The radii of the tracks are

r_1=0.16m

and

r_2=0.24m

The variation in the centripetal force is

DeltaF=F_2-F_1

The centripetal forces are

||F_1||=5*0.12^2/0.16=0.45N

||F_2||=5*0.12^2/0.24=0.30N

DeltaF=F_1-F_2=0.45-0.30=0.15N

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