A model train with a mass of $2 k g$ $2 kg$ is moving along a track at $18 \frac{c m}{s}$ $18 (cm)/s$ . If the curvature of the track changes from a radius of $9 c m$ $9 cm$ to $12 c m$ $12 cm$ , by how much must the centripetal force applied by the tracks change?

Question

A model train with a mass of $2 k g$ $2 kg$ is moving along a track at $18 \frac{c m}{s}$ $18 (cm)/s$ . If the curvature of the track changes from a radius of $9 c m$ $9 cm$ to $12 c m$ $12 cm$ , by how much must the centripetal force applied by the tracks change?

1 Answer

Impact of this question

1796 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2016-07-07T07:48:18

0.18N

Explanation:

Since $F = m a$ $F = ma$ and $A_{c} = \frac{V^{2}}{r}$ $A_c = (V^2)/r$ , $F_{c}$ $F_c$ must be $F_{c} = m \frac{V^{2}}{r}$ $F_c = m(V^2)/r$ , by substituting the acceleration in a circle into the equation for Force.

First we need to convert all of the values into standard units, since if we make the calculation in cm we will not get Newtons as the answer since Newtons is $K g m s^{- 1}$ $Kgms^-1$ instead we would get $K g c m s^{- 1}$ $Kgcms^-1$

So we need to convert the $c m s^{- 1}$ $cms^-1$ and $c m$ $cm$ into $m s^{- 1}$ $ms^-1$ and $m$ $m$ respectively.

$V = \frac{18 c m s^{- 1}}{100} = 0.18 m s^{- 1}$ $V = (18cms^-1)/100 = 0.18ms^-1$
$r_{1} = \frac{9 c m}{100} = 0.09 m$ $r_1 = (9cm)/100 = 0.09m$
$r_{2} = \frac{12 c m}{100} = 0.12 m$ $r_2 = (12cm)/100 = 0.12m$

Since we now have the mass, radius and velocity we simply substitute the values for the 0.09m radius into the equation as follows:

$F_{c 1} = 2 k g ⎛ ⎝ \frac{{(0.18 m s^{- 1})}^{2}}{0.09 m} ⎞ ⎠ = 0.72 N$ $F_(c1) = 2kg(((0.18ms^-1)^2)/(0.09m)) =0.72N$

Then we repeat for the 0.12m radius

$F_{c 2} = 2 k g ⎛ ⎝ \frac{{(0.18 m s^{- 1})}^{2}}{0.12 m} ⎞ ⎠ = 0.54 N$ $F_(c2) = 2kg(((0.18ms^-1)^2)/(0.12m)) =0.54N$

Now that we have both Centripetal Forces we can calculate the difference:

$F_{c} = F_{c 1} - F_{c 2} = 0.72 N - 0.54 N = 0.18 N$ $F_c = F_(c1) - F_(c2) = 0.72N - 0.54N = 0.18N$

Science

Math

Humanities

... and beyond

A model train with a mass of $2 k g$ $2 kg$ is moving along a track at $18 \frac{c m}{s}$ $18 (cm)/s$ . If the curvature of the track changes from a radius of $9 c m$ $9 cm$ to $12 c m$ $12 cm$ , by how much must the centripetal force applied by the tracks change?

1 Answer

Explanation:

Related questions

Impact of this question

Science

Math

Humanities

... and beyond

A model train with a mass of 2kg2 kg is moving along a track at 18cms18 (cm)/s. If the curvature of the track changes from a radius of 9cm9 cm to 12cm12 cm, by how much must the centripetal force applied by the tracks change?

1 Answer

Explanation:

Related questions

Impact of this question

A model train with a mass of $2 k g$ $2 kg$ is moving along a track at $18 \frac{c m}{s}$ $18 (cm)/s$ . If the curvature of the track changes from a radius of $9 c m$ $9 cm$ to $12 c m$ $12 cm$ , by how much must the centripetal force applied by the tracks change?