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Welcome to our Physics lesson on **Examples of torque involving forces**, this is the second lesson of our suite of physics lessons covering the topic of **Torque**, you can find links to the other lessons within this tutorial and access additional physics learning resources below this lesson.

- Rotating the steering wheel of a car,
- Rotating the handle bar of a bike,
- Two men rotating a grinding mill, etc.

- Pushing a door as it swings on its hinges when pushed,
- Turning the key,
- Turning the dood knob, etc.

As you can see, all three examples shown above (in the second set of examples), involve the same process: opening a door. Thus, torque is applied three times in a row in this process: turning the key (action 1), turning the door knob (2) and pushing the door as it swings around its hinges (3). Look at the figure.

On the other hand, in the first set of the abovementioned examples, there are two forces acting in the same direction or rotation on both sides of a system. Let's take the steering wheel for illustration.

Both forces applied by our hands help each other making the rotation of steering wheel easier. As a result, the car turns in the desired direction. In the figure below, forces F1 and F_{2} help each other rotate the steering wheel clockwise. As a result, the car turns right.

In most cases (although it is not a must), the distance from the turning force is the same for each force applied when they form a couple. This helps the users balance their senses. In the specific case, this distance is equal to the radius of the steering wheel.

Both Moment of Force and Torque have the same unit i.e. N-m but The equation of torque for a single force applied is:

τ *⃗* = r *⃗* × F*⃗*_{⊥}

where r *⃗* is the distance from the turning point (usually the radius of a circle), and F*⃗*_{⊥} is the perpendicular force to the bar (line of action) or the tangent force used at that specific point of the circle.

The scalar equivalent of the above equation is

|τ | = |r| × |F| × sin θ

where θ is the angle between the axis of rotation and the force applied. Look at the figure:

In this figure there is a single force that produce torque. However, not all the force goes for the rotation of the system; some of it is wasted (the component of force in the direction of the bar). Therefore, since only the component of force perpendicular to the bar is able to produce rotation, we consider only it as a turning force.

A 60 N acts at the edge of a bar in the direction shown in the figure.

Giving that cos 400 = 0.766 and sin 400 = 0.643, calculate the length of bar in cm to produce a 10 N × m torque.

From the scalar equivalent of the equation of torque

|τ| = |r| × |F| × sin θ

we obtain after substitutions,

10 = |r| × 60 × 0.643

10 = |r| × 38.58

|r| =*10**/**38.58*

= 0.2592 m

= 25.92 cm

≈ 26 cm

10 = |r| × 38.58

|r| =

= 0.2592 m

= 25.92 cm

≈ 26 cm

As for the torque of a couple, we obtain the following equation:

τ *⃗*_{tot} = r *⃗*_{1} × F *⃗*_{1} + r *⃗*_{2} × F *⃗*_{2}

When the couple of forces is used to rotate a kind of wheel (such as a steering wheel), we have

r_{1}

= r_{2}

= r

= r

= r

A steering wheel has not been lubricated properly and a 12 N force is needed to overcome friction. What is the minimum force a driver must use on the steering wheel with either hand to make the car turn left at 24 N × m? The diameter of steering wheel is 36 cm.

The steering wheel must rotate anticlockwise to make the car turn left. Also, F1 = F_{2} = F and r_{1} = r_{2} = r = d/2 = 36 cm / 2 = 18 cm = 0.18 m.

The torque given in the clues is the resultant (net) torque. It inludes the positive torque produced by the driver and the negative torque of the friction against motion. Therefore, we have

τ *⃗*_{net} = τ *⃗*_{driver} + τ *⃗*_{friction} = 24 N × m

For the negative torque produced by friction, we have

τ *⃗*_{friction} = -f *⃗* × r *⃗*

If we take the angle θ = 90° (as we need the minimum values of force), we obtain

τ *⃗*_{friction} = -12 N × 0.18 m

= -2.16 N × m

= -2.16 N × m

Therefore, the torque produced by the driver is

24 N × m = τ *⃗*_{driver} - 2.16 N × m

τ*⃗*_{driver} = 24 N × m + 2.16 N × m

= 26.16 N × m

τ

= 26.16 N × m

This torque is produced by a couple of equal forces acting at r = 0.18 cm away from the turning point. Thus, we have

τ *⃗*_{driver} = r *⃗*_{1} × F *⃗*_{1} + r *⃗*_{2} × F *⃗*_{2}

= r*⃗* × F *⃗* + r *⃗* × F *⃗*

= 2r*⃗* × F *⃗*

= 26.16 N × m

= r

= 2r

= 26.16 N × m

Thus,

2 × 0.18 × F *⃗* = 26.16

0.36 × F*⃗* = 26.16

F*⃗* = *26.16**/**0.36*

= 72.7 N

0.36 × F

F

= 72.7 N

Therefore, the driver must apply a 72.7 N by either hand to make the system rotate as described.

**Remark!** As for the signs of the directions of rotation, anticlockwise is taken as positive [clockwise is negative].

You have reached the end of Physics lesson **6.9.2 Examples of torque involving forces**. There are 2 lessons in this physics tutorial covering **Torque**, you can access all the lessons from this tutorial below.

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