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Class 12 Mathematics
Chapter 4 Solutions — Determinants
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Step-by-step NCERT solutions for Determinants (Chapter 4, CBSE Class 12 Mathematics) — every question and answer worked out in full, not just the final result. You can also read the Determinants textbook chapter.
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All 61 questions in Determinants are solved in the PDF. Here's what's inside, exercise by exercise:
Exercise 4.1
- Evaluate the determinant: |2 4| |-5 -1|
- Evaluate the determinants:
- (i) |cos θ −sin θ| |sin θ cos θ|
- (ii) |x^2 − x + 1 x − 1| |x + 1 x + 1|
- If A = [[1, 2], [4, 2]], then show that |2A| = 4|A|.
- If A = [[1, 0, 1], [0, 1, 2], [0, 0, 4]], then show that |3A| = 27|A|.
- Evaluate the determinants:
- (i) |3 −1 −2| |0 0 −1| |3 −5 0|
- (ii) |3 −4 5| |1 1 −2| |2 3 1|
- (iii) |0 1 2| |−1 0 −3| |−2 3 0|
- (iv) |2 −1 −2| |0 2 −1| |3 −5 0|
- If A = [[1, 1, −2], [2, 1, −3], [5, 4, −9]], find |A|.
- Find values of x, if:
- (i) |2 4| = |2x 4| |5 1| |6 x|
- (ii) |2 3| = |x 3| |4 5| |2x 5|
- If |x 2 | = |6 2|, then x is equal to |18 x| |18 6| (A) 6 (B) ±6 (C) −6 (D) 0
Exercise 4.2
- Find area of the triangle with vertices at the point given in each of the following:
- (i) (1, 0), (6, 0), (4, 3)
- (ii) (2, 7), (1, 1), (10, 8)
- (iii) (−2, −3), (3, 2), (−1, −8)
- Show that points A(a, b+c), B(b, c+a), C(c, a+b) are collinear.
- Find values of k if area of triangle is 4 sq. units and vertices are:
- (i) (k, 0), (4, 0), (0, 2)
- (ii) (−2, 0), (0, 4), (0, k)
- Find equation of line joining (1, 2) and (3, 6) using determinants. (ii) Find equation of line joining (3, 1) and (9, 3) using determinants.
- If area of triangle is 35 sq units with vertices (2, −6), (5, 4) and (k, 4). Then k is (A) 12 (B) −2 (C) −12, −2 (D) 12, −2
Exercise 4.3
- Write Minors and Cofactors of the elements of following determinants:
- (i) |2 −4| |0 3|
- (ii) |a c| |b d|
- Write Minors and Cofactors of the elements of following determinants:
- (i) |1 0 0| |0 1 0| |0 0 1|
- (ii) |1 0 4| |3 5 −1| |0 1 2|
- Using Cofactors of elements of second row, evaluate ∆ = |5 3 8| |2 0 1| |1 2 3|
- Using Cofactors of elements of third column, evaluate ∆ = |1 x yz| |1 y zx| |1 z xy|
- If ∆ = |a11 a12 a13| |a21 a22 a23| and A_ij is Cofactors of a_ij, then value of ∆ is given by |a31 a32 a33| (A) a11·A31 + a12·A32 + a13·A33 (B) a11·A11 + a12·A21 + a13·A31 (C) a21·A11 + a22·A12 + a23·A13 (D) a11·A11 + a21·A21 + a31·A31
Exercise 4.4
- Find adjoint of each of the matrices: [[1, 2], [3, 4]]
- Find adjoint of each of the matrices: [[1, −1, 2], [2, 3, 5], [−2, 0, 1]]
- Verify A(adj A) = (adj A)A = |A|I for A = [[2, 3], [−4, −6]].
- Verify A(adj A) = (adj A)A = |A|I for A = [[1, −1, 2], [3, 0, −2], [1, 0, 3]].
- Find the inverse of the matrix (if it exists): [[2, −2], [4, 3]]
- Find the inverse of the matrix (if it exists): [[−1, 5], [−3, 2]]
- Find the inverse of the matrix (if it exists): [[1, 2, 3], [0, 2, 4], [0, 0, 5]]
- Find the inverse of the matrix (if it exists): [[1, 0, 0], [3, 3, 0], [5, 2, −1]]
- Find the inverse of the matrix (if it exists): [[2, 1, 3], [4, −1, 0], [−7, 2, 1]]
- Find the inverse of the matrix (if it exists): [[1, −1, 2], [0, 2, −3], [3, −2, 4]]
- Find the inverse of the matrix (if it exists): [[1, 0, 0 ], [0, cos α, sin α ], [0, sin α, −cos α]]
- Let A = [[3, 7], [2, 5]] and B = [[6, 8], [7, 9]]. Verify that (AB)^−1 = B^−1 A^−1.
- If A = [[3, 1], [−1, 2]], show that A^2 − 5A + 7I = O. Hence find A^−1.
- For the matrix A = [[3, 2], [1, 1]], find the numbers a and b such that A^2 + aA + bI = O.
- For the matrix A = [[1, 1, 1], [1, 2, −3], [2, −1, 3]], show that A^3 − 6A^2 + 5A + 11I = O. Hence find A^−1.
- If A = [[2, −1, 1], [−1, 2, −1], [1, −1, 2]], verify that A^3 − 6A^2 + 9A − 4I = O and hence find A^−1.
- Let A be a nonsingular square matrix of order 3×3. Then |adj A| is equal to (A) |A| (B) |A|^2 (C) |A|^3 (D) 3|A|
- If A is an invertible matrix of order 2, then det(A^−1) is equal to (A) det(A) (B) 1/det(A) (C) 1 (D) 0
Exercise 4.5
- Examine the consistency of the system of equations: x + 2y = 2 2x + 3y = 3
- Examine the consistency of the system of equations: 2x − y = 5 x + y = 4
- Examine the consistency of the system of equations: x + 3y = 5 2x + 6y = 8
- Examine the consistency of the system of equations: x + y + z = 1 2x + 3y + 2z = 2 ax + ay + 2az = 4
- Examine the consistency of the system of equations: 3x − y − 2z = 2 2y − z = −1 3x − 5y = 3
- Examine the consistency of the system of equations: 5x − y + 4z = 5 2x + 3y + 5z = 2 5x − 2y + 6z = −1
- Solve system of linear equations using matrix method: 5x + 2y = 4 7x + 3y = 5
- Solve system of linear equations using matrix method: 2x − y = −2 3x + 4y = 3
- Solve system of linear equations using matrix method: 4x − 3y = 3 3x − 5y = 7
- Solve system of linear equations using matrix method: 5x + 2y = 3 3x + 2y = 5
- Solve system of linear equations using matrix method: 2x + y + z = 1 x − 2y − z = 3/2 3y − 5z = 9
- Solve system of linear equations using matrix method: x − y + z = 4 2x + y − 3z = 0 x + y + z = 2
- Solve system of linear equations using matrix method: 2x + 3y + 3z = 5 x − 2y + z = −4 3x − y − 2z = 3
- Solve system of linear equations using matrix method: x − y + 2z = 7 3x + 4y − 5z = −5 2x − y + 3z = 12
- If A = [[2, −3, 5], [3, 2, −4], [1, 1, −2]], find A^−1. Using A^−1 solve the system of equations: 2x − 3y + 5z = 11 3x + 2y − 4z = −5 x + y − 2z = −3
- The cost of 4 kg onion, 3 kg wheat and 2 kg rice is ₹60. The cost of 2 kg onion, 4 kg wheat and 6 kg rice is ₹90. The cost of 6 kg onion, 2 kg wheat and 3 kg rice is ₹70. Find cost of each item per kg by matrix method.
Miscellaneous Exercise
- Prove that the determinant |x sin θ cos θ| |−sin θ −x 1 | |cos θ 1 x | is independent of θ.
- Evaluate: |cos α cos β cos α sin β −sin α| |−sin β cos β 0 | |sin α cos β sin α sin β cos α|
- If A^−1 = [[3, −1, 1], [−15, 6, −5], [5, −2, 2]] and B = [[1, 2, −2], [−1, 3, 0], [0, −2, 1]], find (AB)^−1.
- Let A = [[1, 2, 1], [2, 3, 1], [1, 1, 5]]. Verify that:
- (i) [adj A]^−1 = adj(A^−1)
- (ii) (A^−1)^−1 = A
- Evaluate: |x y x+y| |y x+y x | |x+y x y |
- Evaluate: |1 x y | |1 x+y y | |1 x x+y|
- Solve the system of equations: 2/x + 3/y + 10/z = 4 4/x − 6/y + 5/z = 1 6/x + 9/y − 20/z = 2
- If x, y, z are nonzero real numbers, then the inverse of matrix A = [[x, 0, 0], [0, y, 0], [0, 0, z]] is (A) [[x^−1, 0, 0], [0, y^−1, 0], [0, 0, z^−1]] (B) xyz · [[x^−1, 0, 0], [0, y^−1, 0], [0, 0, z^−1]] (C) (1/xyz) · [[x, 0, 0], [0, y, 0], [0, 0, z]] (D) (1/xyz) · [[1, 0, 0], [0, 1, 0], [0, 0, 1]]
- Let A = [[1, sin θ, 1], [−sin θ, 1, sin θ], [−1, −sin θ, 1]], where 0 ≤ θ ≤ 2π. Then (A) Det(A) = 0 (B) Det(A) ∈ (2, ∞) (C) Det(A) ∈ (2, 4) (D) Det(A) ∈ [2, 4]
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