You're offline — cached pages and worlds still work
Drishti Innovations logo
Drishti Innovations

Determinants

Comprehensive notes, formulas, and practice questions for Determinants.

Determinants

Determinants

What you'll learn

  • What a determinant measures for a square matrix — scaling factor of linear transformations and solvability of Ax = b.
  • To evaluate determinants of order 2 and 3 using Sarrus' rule and cofactor expansion.
  • To apply properties of determinants: row interchange, scalar multiplication, row operations, and triangular form.
  • To use determinants in Cramer's rule and to test whether a matrix is singular (|A| = 0).
  • To connect determinants with area of parallelogram and volume of parallelepiped in coordinate geometry.

Key concepts

Level 1 — Foundations

Verbal: The determinant of a square matrix A, written |A| or det(A), is a scalar that encodes whether the matrix is invertible and how it scales area/volume.

Order 2: For A = | a b |, det(A) = ad − bc. | c d |

Order 3 (Sarrus): Write the matrix and repeat first two columns; sum products along ↘ diagonals minus products along ↖ diagonals.

Singular vs non-singular: |A| = 0 → A is singular (no inverse, rows/columns linearly dependent). |A| ≠ 0 → non-singular.

Geometric meaning: |det| equals area (2D) or volume (3D) of the figure spanned by column vectors.

Level 2 — JEE / NEET depth

Properties (NCERT — use freely in JEE): | Operation | Effect on |A| | |-----------|-------------| | Interchange two rows | Sign changes: |A′| = −|A| | | Multiply a row by k | |A′| = k|A| | | Add multiple of one row to another | |A| unchanged | | A has a zero row/column | |A| = 0 | | Two identical rows | |A| = 0 |

Cofactor expansion: det(A) = Σⱼ aᵢⱼ Cᵢⱼ along any row i (or column). Cᵢⱼ = (−1)ⁱ⁺ʲ Mᵢⱼ where Mᵢⱼ is the minor.

Product rule: det(AB) = det(A)·det(B) for square matrices of same order.

Cramer's rule (3 equations): x = Δₓ/Δ, y = Δᵧ/Δ, z = Δ_z/Δ where Δ is coefficient determinant; replace one column with constants for Δₓ etc. Valid only when Δ ≠ 0.

Worked example

Find det of a 3×3 matrix by expansion

A = | 1   2   3 |
    | 0  −1   2 |
    | 2   1   0 |

Step 1 — Expand along row 1 (contains a zero in row 2, col 1 — often efficient):
         |A| = 1·|−1  2| − 2·|0  2| + 3·|0 −1|
                 | 1  0|     |2  0|     |2  1|
Step 2 — Minors: |−1  2| = (−1)(0) − (2)(1) = −2
                 | 1  0|
         |0  2| = 0,  |0 −1| = 0 − (−2) = 2
         |2  0|       |2  1|
Step 3 — |A| = 1(−2) − 2(0) + 3(2) = −2 + 6 = 4.

Use properties to simplify before expanding

B = | 1  2  3 |
    | 2  4  6 |
    | 1  0  1 |

Step 1 — Row 2 = 2 × Row 1 → two proportional rows.
Step 2 — Property: if two rows are proportional, |B| = 0.
Step 3 — Verify: R₂ ← R₂ − 2R₁ gives row of zeros → |B| = 0.
Step 4 — Conclusion: B is singular; system Bx = c may have no unique solution.

Common mistakes

MistakeWhy it happensFix
Expanding along worst rowRandom choicePick row/column with most zeros
ChangingAwhen adding kR₁ to R₂
Using Sarrus for 4×4Pattern only works for 3×3Use cofactor expansion or row reduction for order ≥ 4
Applying Cramer's when Δ = 0Mechanical formula useIf Δ = 0, Cramer's fails — use rank/Gaussian elimination

Quick check

  • Evaluate | 2 1 |.
  • Without full expansion, explain why | 1 2 3 | = 0.
  • If |A| = 5, find |2A| for 3×3 matrix A.
  • Find area of triangle with vertices (0,0), (3,0), (0,4) using determinants.
  • Stretch: Prove det(Aᵀ) = det(A) for a 3×3 matrix using cofactor definition.

NCERT Chapter 3 link: Determinants appear in Exercise 4.1–4.5 with emphasis on properties before brute expansion. Learn property-based reduction to triangular form — faster and less error-prone than full cofactor expansion on exam day.

Exam connections: JEE asks area of triangle using determinants, singularity of matrices with parameters (find k if |A| = 0), and proving collinearity of three points via zero area. CBSE often combines determinants with solving equations — state clearly when Δ = 0 implies no unique solution.

Study strategy: Memorise the effect of each elementary row operation on |A|. Create a checklist: interchange → sign flip; scale row → scale det; add row multiple → unchanged. For 3×3, expand along the row with most zeros.

Study workflow and exam preparation

When studying Determinants within Matrices & Determinants, start by listing every formula and definition on one page without looking at the textbook. Compare your list to NCERT — missing items indicate gaps to fix immediately. Work through at least two NCERT Examples for this section with steps written in full; examiners award method marks even when arithmetic slips.

For board exams (CBSE), long answers benefit from a clear structure: definition → explanation → diagram or formula → example → brief conclusion. Underline key terms. For JEE Main and NEET, prioritise conceptual traps and quick calculation paths; timed mixed quizzes of 10 questions after revision simulate exam pressure.

Cross-topic link: Coordinate geometry and vectors often combine with matrices; calculus links to physics kinematics problems.

Spaced revision: Review this note at 1 day, 3 days, and 7 days after first study. Attempt the Quick check questions closed-book, then open the Practice tab for graded reinforcement. Maintain an error log — repeated mistake patterns reveal whether the issue is concept, formula recall, or careless reading.

Diagram and terminology drill: For Mathematics, redraw key figures from memory and define every labelled part in one sentence. Vocabulary precision prevents mark loss in descriptive answers — use NCERT terms exactly as printed in the textbook.

Revision tip: Link this topic to adjacent Class 12 chapters before attempting mixed practice.

Open the Practice tab for graded questions on Determinants.

Key Takeaways (TL;DR)

  • What you'll learn
  • Key concepts
  • Worked example
  • Common mistakes

Master this topic with Drishti OS

Get unlimited mock tests, AI-powered mentorship, and complete video courses when you join.

Start Free Practice