3.3.4 Motion in One & Two Dimensions

• If a constant force acts upon an object, then it will experience a resultant acceleration, determined using F = ma
• This motion can be investigated in one or two-dimensional planes, such as along the ground or on a slope
  • One-dimensional planes involve just up and down or left and right (on the ground)
  • Two-dimensional planes involve both up and down and left and right (on a slope)

• On a slope, it is often simpler to resolve the forces into parallel and perpendicular components, rather than horizontally and vertically:
  • The weight, mg of the object acts vertically down
  • The frictional force, F between the slope and the object acts along the plane of the slope, in the direction opposing the motion
  • The normal reaction force, R acts perpendicular to the plane of contact between the object and the slope

The normal reaction force R, weight W and friction F on a block moving down a slope

Part (a)

• • Perpendicular component = W cos 30°
  • Perpendicular component = (8.0 × 10^–5) cos 30° = 6.9 × 10^–5 N

Part (b)

• • Parallel component = W sin 30°
  • Parallel component = (8.0 × 10^–5) sin 30° = 4.0 × 10^–5 N

Part (c)

• • R is equal to the perpendicular component of the weight
  • Perpendicular forces must be equal and opposite

R = 6.9 × 10^–5 N

Part (d)

• • F is equal to the parallel component of the weight
  • Parallel forces must be equal and opposite

F = 4.0 × 10^–5 N

Step 1: Write down the known quantities

• • Acceleration, a = 2.0 m s^–2
  • Weight, W = mg
  • Component of weight parallel the slope, F = W sin θ = mg sin θ

Step 2: Write down the equation relating force and acceleration

F = ma

Step 3: Substitute in the component of weight down the slope

mg sin θ = ma

Step 4: Rearrange for sin θ and calculate the angle

a = g sin θ

sin θ = 2.0 / 9.81

θ = 12°