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Maths Determinants

6. If A= ,find | A |

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Vishal Baghel

Contributor-Level 10

= 1 [1* (−9) – 4* (−3)]–1 [2* (–9)–5* (– 3)]– 2 [2*4 −5*1]

= 1 [− 9 + 12] −1 [− 18+15] − 2 [8 − 5]

= 3 + 3 −6

= 0

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10 months ago

Maths Determinants

5. Evaluate the determinants

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Vishal Baghel

Contributor-Level 10

$= 3 [0 (- 5) (- 1)] + 1 (0 - 3 (- 1) - 2 [0 * (- 5) - 0 * 3]$

= 15 + 3

= 12

=3 [1*1− (−2)*3]+4 [1*1− (−2)*2]+5 [3*1−2*1]

= 3 [1+6]+4 [1+4]+5 (3−2)

= 3*7+4*5+5*1

= 21+20+5

= 46

= 0 –1 [ − 1*0 – (−2)* (−3)] + 2 [−1*3 – (−2)*0]

= (− 1)* ( − 6)+2 (− 3)

= 6 – 6

= 0

= 2 [2*0− ( − 5)* (−1)]+3 [ (−1)* (− 1) – (− 2)*2]

= 2 (−5)+3 (1+4)

= 2 (−5) + 3* (5)

= −10+15

= 5

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10 months ago

Maths Determinants

4. If A= ,then show that | 3 A | = 27 | A |

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Vishal Baghel

Contributor-Level 10

=3 [36 – 6*0]

= 108

RHS = 27. |A| = 27 4 = 108

∴ LHS = RHS

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Maths Determinants

3. If $[\begin{matrix} 1 & 2 \\ 4 & 2 \end{matrix}]$ , then show that | 2A | = 4 | A |

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Vishal Baghel

Contributor-Level 10

Given, A= $[\begin{matrix} 1 & 3 \\ 4 & 2 \end{matrix}]$

So, 2A= 2 $[\begin{matrix} 1 & 4 \\ 4 & 2 \end{matrix}]$

= $[\begin{matrix} 2 & 4 \\ 8 & 4 \end{matrix}]$ .

L.H.S. = $| 2 |$ = $| \begin{matrix} 2 & 4 \\ 8 & 4 \end{matrix} |$ = 2*4 – 4*8 = 8−32 = −24

R.H.S. = 4 $| |$ = 4 $| \begin{matrix} 1 & 2 \\ 4 & 2 \end{matrix} |$ = 4 (1*2 – 2*4)

= 4 [2 − 8]

= 4 [−6] = 24.

LHS = RHS

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10 months ago

Maths Determinants

2. (i) $| \begin{matrix} c o s θ & - s i n θ \\ s i n θ & c o s θ \end{matrix} |$ (ii) $| \begin{matrix} x^{2} - x + 1 & x - 1 \\ x + 1 & x + 1 \end{matrix} |$

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Vishal Baghel

Contributor-Level 10

(i) $| \begin{matrix} c o s θ & - s i n θ \\ s i n θ & c o s θ \end{matrix} |$

$= c o s θ * c o s θ - (- s i n θ) * s i n θ$

= cos²θ + sin²θ

(ii) $| \begin{matrix} x^{2} - x + 1 & x - 1 \\ x + 1 & x + 1 \end{matrix} |$

$= (x^{2} - x + 1) (x + 1) - (x - 1) (x + 1)$

= $x^{3}$ + $x^{2}$ − $x^{2}$ − $x$ + $x$ +1 – $x^{2}$ + 1

= $x^{3}$ - $x^{2}$ + 2

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10 months ago

Maths Determinants

1.Evaluate the determinants in Exercises 1 and 2.

$| \begin{matrix} 2 & 4 \\ - 5 & - 1 \end{matrix} |$

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Vishal Baghel

Contributor-Level 10

$| \begin{matrix} 2 & 4 \\ - 5 & - 1 \end{matrix} | =$ 2* (−1) – 4* (−5) = −2+20 = 18

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10 months ago

Maths Class 10th

Where can I get Class 10th Maths previous year question paper?

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New answer posted

10 months ago

Maths Matrices

77. If A is square such that A² = A, then (I + A)³ – 7A is equal to

(A) A (B) I – A (C) I (D) 3A

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Vishal Baghel

Contributor-Level 10

Given, A²= A.

(E) we need to calculate,

(I + A)³- 7A = I³ + A³ + 3IA (I + A) - 7A { (x + y)³ = x³ + y³ + 3xy (a + y)}

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10 months ago

Maths Matrices

76.If the matrix A is both symmetric and skew symmetric, then

(A) A is a diagonal matrix (B) A is a zero matrix

(C) A is a square matrix (D) None of these

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Vishal Baghel

Contributor-Level 10

Given, A is both symmetric and skew-symmetric.

(E) Then, A' = A ____ (1) and A' = -A ____ (2)

So using (2), A' = -A.

A = -A {eqⁿ (I)}

A + A = 0

2A = 0

A = 0.

A is a zero matrix

So, option B is correct.

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10 months ago

Maths Matrices

Kindly Consider the following

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Vishal Baghel

Contributor-Level 10

Kindly go through the solution

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