Projections
Projections explain how one vector can be expressed as a shadow or component along another vector or subspace.
This idea connects geometry, algebra, optimization, and machine learning. Whenever we approximate, predict, or minimize error, we are using projections.
Why Projections Are Important
In real life, we often need the “best approximation” rather than an exact value.
Projections help us:
- Approximate vectors
- Remove unwanted components
- Minimize error
- Understand orthogonality
Many AI algorithms are projection-based.
What Is a Projection? (Intuition)
Imagine shining a light on a vector.
The shadow cast on another direction is the projection.
It tells us how much of one vector lies along another.
Projection Onto a Vector
Given two vectors:
- v → vector being projected
- u → direction vector
The projection of v onto u is the component of v that lies along u.
Formula for Projection Onto a Vector
The projection of v onto u is:
proju(v) = ( v·u / u·u ) u
This formula is extremely important for exams and applications.
Understanding the Projection Formula
Each part of the formula has meaning:
- v·u → measures alignment
- u·u → magnitude squared of u
- Multiplying by u → gives direction
The result is a vector along u.
Example: Projection Onto a Vector
Let:
v = (3, 4), u = (1, 0)
Then:
v·u = 3
u·u = 1
proju(v) = 3(1, 0) = (3, 0)
This is the horizontal component of v.
Orthogonal Component
The part of v that is not along u is called the orthogonal component.
It is given by:
v − proju(v)
This component is perpendicular to u.
Orthogonal Projection (Key Idea)
An orthogonal projection is the closest vector (in distance) to v that lies along u.
This makes projections essential for minimizing error.
Projection Onto a Line
Projecting onto a vector is the same as projecting onto the line spanned by that vector.
The projection gives the closest point on that line to the original vector.
Projection Onto a Subspace
Projections can also be done onto entire subspaces.
If a subspace has an orthonormal basis, projection becomes very simple.
Each basis vector contributes independently.
Orthogonal Basis and Projections
If basis vectors are orthogonal:
- Projections are easy to compute
- No interference between directions
This is why orthogonality is so powerful.
Projection in Geometry
Geometrically, projections represent:
- Shadows
- Perpendicular drops
- Closest points
They appear naturally in shapes and measurements.
Projection in Physics
Physics uses projections constantly:
- Resolving forces
- Motion along inclined planes
- Component analysis
Each force is projected onto directions.
Projection in Data Science
In data science:
- Data is projected onto features
- Noise is removed using projections
- Dimensionality is reduced
PCA is fundamentally projection-based.
Projection in Machine Learning
Machine learning uses projections in:
- Linear regression
- Least squares problems
- Feature extraction
Predictions are projections onto model spaces.
Least Squares and Projections
Least squares finds the vector in a subspace that is closest to a given data vector.
That closest vector is an orthogonal projection.
This is a core ML idea.
Projections in Competitive Exams
Exams often test:
- Projection formula
- Geometric interpretation
- Orthogonality conditions
Understanding beats memorization here.
Common Mistakes to Avoid
Students often make these mistakes:
- Forgetting dot product in formula
- Projecting onto wrong vector
- Confusing projection with component subtraction
Always check direction and formula.
Practice Questions
Q1. What does a projection represent?
Q2. What operation is central to projection?
Q3. Why are projections important in ML?
Quick Quiz
Q1. Is an orthogonal projection the closest point?
Q2. Are projections used in regression?
Quick Recap
- Projections measure components along directions
- Computed using dot products
- Orthogonal projection minimizes distance
- Core idea in least squares and ML
- Connects geometry to data science
With projections mastered, you are now ready to learn orthogonality, which explains perpendicular structure in spaces.