NCERT Solutions for Class 12 Maths Chapter 4 Miscellaneous Exercise Determinants
Class 12 Maths Chapter 4 focuses on Determinants, an important part of algebra that helps students understand advanced mathematical ideas. Determinants are used to solve systems of linear equations, find the inverse of a matrix, check consistency of equations, and study linear transformations. The miscellaneous exercise Class 12 Chapter 4 brings together all these ideas in one place and helps students apply the concepts they learned throughout the chapter. The Determinants Miscellaneous Exercise includes mixed questions based on properties of determinants, cofactor and adjoint, applications in solving equations, and understanding how determinants behave in different situations. This misc ch 4 Class 12 exercise is very useful because it gives you a complete revision of the chapter in one set of questions. It also prepares you for board exams by strengthening your calculation skills and logical thinking.
Students often look for a clear and step-by-step Class 12 Maths Chapter 4 Miscellaneous Solution to understand each type of problem. With the right approach, the Class 12 Maths Ch 4 Miscellaneous exercise becomes easy to solve and gives you confidence to handle complex numerical questions. These solutions explain every step in simple language so that you can revise quickly before exams. The Class 12 Determinants Miscellaneous Exercise helps you practice important topics such as minors and cofactors, evaluation of determinants, and applications in coordinate geometry and matrices. The Ch 4 Miscellaneous Class 12 set of problems is great for testing your overall understanding and improving your accuracy.
Overall, the Miscellaneous Exercise Chapter 4 Class 12 is an essential part of your preparation. It brings together all major concepts of determinants and helps you gain clarity, speed, and confidence. You can find the complete NCERT Solutions for Class 12 Maths Chapter 4 Miscellaneous Exercise Determinants below to support your exam preparation.
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NCERT Solutions for Class 12 Maths Chapter 4 Miscellaneous Exercise Determinants
Here are NCERT Solutions for Class 12 Maths Chapter 4 Miscellaneous Exercise Determinants below:-
Question 1. Prove that the determinant
Solution :
Hence, Δ is independent of θ.
Question 2. Without expanding the determinants, prove that:
Solution :
Question 3. Evaluate:
Solution :
Question 4. If a,b and c are real numbers and
Show that either a + b + c = 0 or a = b = c.
Solution :
Question 5. Solve the equation:
Solution :
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Question 6. Prove that:
Solution :
Question 7. If
Solution :
Question 8.
Solution :
Question 9. Evaluate:
Solution :
Question 10. Evaluate:
Solution :
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Using properties of determinants in Exercises 11 to 15, prove that:
Question 11.
Solution :
Question 12.
Solution :
Question 13.
Solution :
Question 14.
Solution :
Question 15.
Solution :
Question 16. Solve the system of the following equations: (Using matrices):
Solution :
Choose the correct answer in Exercise 17 to 19.
Question 17. If a,b,c are in A.P., then the determinant
(A) 0
(B) 1
(C) x
(D) 2x
Solution :
Here, all the elements of the first row (R1) are zero.
Hence, we have Δ = 0.
The correct answer is A.
Question 18. If x,y,z are non-zero real numbers, then the inverse of matrix A = 
(A)
(B)
(C)
(D)
Solution :
Therefore, option (A) is correct.
Question 19. Let
(A) Det (A) = 0
B. Det (A) ∈ (2, ∞)
C. Det (A) ∈ (2, 4)
D. Det (A)∈ [2, 4]
Solution :
Therefore, option (D) is correct.
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Class 12 Maths Chapter 4 Miscellaneous Exercise Determinants Summary
The Miscellaneous Exercise in Chapter 4 of Class 12 Mathematics focuses on determinants. This exercise includes a wide range of problems that test your understanding of the properties and applications of determinants. Here is a summary of what you will encounter:
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Basic Properties: Questions involving the basic properties of determinants, such as linearity, the effect of row and column operations, and the impact of swapping rows or columns.
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Calculations: Problems that require calculating the determinant of matrices of various sizes, often involving multiple steps and properties to simplify the process.
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Adjoint and Inverse: Exercises that involve finding the adjoint and inverse of a matrix using determinants, reinforcing the connection between these concepts.
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Systems of Equations: Questions that use determinants to solve systems of linear equations, typically applying Cramer's rule or other determinant-based methods.
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Applications: Real-world applications of determinants, such as finding the area of triangles using vertices' coordinates or understanding linear transformations.
Class 12 Maths Chapter 4 Miscellaneous Exercise Determinants FAQs
Q1. What are some properties of determinants?
Ans. Key properties include:
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The determinant of a product of matrices is the product of their determinants.
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Swapping two rows or columns changes the sign of the determinant.
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If a row or column is multiplied by a scalar, the determinant is multiplied by that scalar.
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A matrix with two identical rows or columns has a determinant of zero.
How do row and column operations affect the determinant?
Ans. Row and column operations can simplify the calculation of determinants. However, you need to adjust the determinant accordingly (e.g., swapping rows changes the sign).
What is Cramer's Rule?
Ans. Cramer's Rule is a method for solving systems of linear equations using determinants. Each variable is found by dividing the determinant of a matrix with one column replaced by the constants by the determinant of the coefficient matrix.
How do you find the inverse of a matrix using determinants?
Ans. The inverse of a matrix AAA can be found if det(A)≠0\det(A) \neq 0det(A)=0. It is given by A−1=1det(A)⋅adj(A)A^{-1} = \frac{1}{\det(A)} \cdot \text{adj}(A)A−1=det(A)1⋅adj(A), where adj(A)\text{adj}(A)adj(A) is the adjugate of AAA.
What are some real-world applications of determinants?
Ans. Determinants are used in various fields such as physics, engineering, computer graphics, and economics. For example, they can be used to calculate the area of a triangle given its vertices' coordinates.
How do you find the adjoint of a matrix?
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The adjoint of a matrix is the transpose of its cofactor matrix. Each element of the cofactor matrix is the determinant of the submatrix obtained by deleting the corresponding row and column, multiplied by (−1)i+j(-1)^{i+j}(−1)i+j.
