How to Draw the Ray Diagram for Reflection at a Plane Surface Using Huygens’ Principle– Smarter Techniques

How to Draw the Ray Diagram for Reflection at a Plane Surface Using Huygens’ Principle– Smarter Techniques

 

Author:
Prof. Kali C. S.
M.Sc., M.Ed., D.C.S.
50+ Years of Experience in Physics Teaching

1. Introduction:

    Most students know the laws of reflection, but when asked to draw the ray diagram based on Huygens’ Principle, they often get confused.
Why?

     Because students often replicate the diagram mechanically rather than understanding the underlying wavefront method.

   In my series “How to Draw Diagrams in Physics — Smarter Techniques,” I focus on teaching students scientific, accurate, and exam-perfect ways to draw on an A4 sheet using simple tools like a scale, set-square, and compass.

In this article, you will learn:

• What Huygens’ Principle says
• How it explains reflection
• And—most importantly—

How to draw the ray diagram step-by-step using a smarter technique?

Let’s begin.

2. Laws of Reflection:

  2.1. Angle of incidence (i) = Angle of reflection (r)

  2.2Incident ray, reflected ray, and normal lie in the same plane

These laws are not assumptions—they can be beautifully proved using wave fronts.

3. Huygens’ principle (Quick recap):

“Every point on a wave front acts as a secondary source and emits secondary wavelets in all directions.”

This simple idea helps us reconstruct the next position of a wave front.

4. How Huygens’ principle explains reflection:

 When a wave front strikes a plane mirror:

• The point touching the mirror acts as a source of secondary wavelets
• These wavelets reflect according to the rule: Angle of reflection = angle of incidence
• By constructing the reflected wave front, we obtain the reflected ray

This is more scientific than simply “drawing rays.”

5. Why this is a “Smarter technique”?

1. The diagram uses only straight lines, one arc, and simple perpendiculars, so students can reproduce it quickly and neatly in the exam.
2. Each construction step has a clear physical meaning: incident wave front, secondary wavelet, reflected wave front, and rays perpendicular to wave fronts.
3. From a single, clean diagram, both laws of reflection are obtained using Huygens ’ Principle, giving students both clarity in concept and confidence in drawing.

Here is a step-by-step construction matching your given diagram.

6. Step-by-step construction:

6.1. Draw the plane reflecting surface

• Draw a horizontal line and mark it as plane reflecting surface XY.
• Choose the point on it, near the left, and label them A.

  6.2.  Draw the incident rays from a distant source

• Place the ruler at point A so that its left edge passes through A and is slightly inclined (about 30°) to the XY line, with about 5 cm of the ruler above XY.
• Now draw two parallel lines along the edges of the ruler up to the XY line. Label the point where the right-side line meets the XY line as C.

   6.3. Draw the normal at points of incidence

•     At point A, draw a vertical line upwards; label its upper part as M. This line is the normal to the surface at A.
• At point C, draw another vertical line upwards; label its upper part as N. This line is the normal to the surface at C.

  6.4. Mark the angle of incidence at A

• • At A, mark the angle between the incident ray PA and the normal AM as ∠i.
  •   Indicate this angle clearly with a small arc and the symbol i.

  6.5. Show an incident wave front and its secondary source

• Draw perpendicular to the line QC from A, mark a point B at foot of the perpendicular on QC.
• Line segment AB indicates the part of the incident wave front that has already reached the mirror at A, while the point near B is still in the incident medium.

   6.6. Draw secondary wavelets from point A

• Taking A as centre, draw an arc with radius AB cutting the vertical through N at a point; this arc represents the secondary wavelet that has travelled from A during the time the disturbance moves from B to C.
• Indicate this arc smoothly from near M towards the region near C, as in your diagram.

  6.7. Construct the new (reflected) wave front

• From point C on the surface, mark off on the vertical CN a distance equal to the radius used at A; label the point where the arc intersects the construction as D.
• Join B to D by a straight line; this line BD represents the reflected wave front obtained as the common tangent to the secondary wavelets.

  6.8. Draw the reflected rays

• Through point A, draw a straight line from left to right such that it is symmetric to the incident ray PA about the normal AM; this is the reflected ray, and you may extend it towards the right and label it AR with an arrow pointing away from the mirror.
• Through point C, draw another reflected ray starting from C, making the same angle with the normal CN as the ray from B does with the vertical; mark this ray as CS with an arrow.

  6.9. Show equality of angles and explain

1. 1. Mark the angle between the reflected ray at A and the normal AM as ∠r
   2. Note that by construction the triangles formed using distances along the surface and verticals are congruent, so ∠i=∠r, verifying the law of reflection using Huygens’ Principle.

6.10.  Final labelling and neatness

• Label all important points and lines: surface XY, normals AM and CN, incident rays PQ and reflected rays AR and CS, wave front segment AB, secondary wave front arc through D.
• Thicken or darken the final incident and reflected rays and keep construction lines slightly lighter so students see clearly what they must finally reproduce in the examination.

7. Video support:

   Do you want to know “How to draw the ray diagram for reflection at a plane surface based on Huygens’ principle?” using given guide lines.

Let us see from following video for actual smarter method of drawing diagram.