Using properties of determinants, find the value of x for which |(4-"x",4+"x",4+"x"),(4+"x",4-"x",4+"x"),(4+"x",4+"x",4-"x")|= 0

प्रश्न

Using properties of determinants, find the value of x for which
`|(4-"x",4+"x",4+"x"),(4+"x",4-"x",4+"x"),(4+"x",4+"x",4-"x")|= 0`

बेरीज

उत्तर

Given:

$|\begin{matrix} 4 - x & 4 + x & 4 + x \\ 4 + x & 4 - x & 4 + x \\ 4 + x & 4 + x & 4 - x \end{matrix}| = 0 R_{1} \to R_{1} + R_{2} + R_{3} |\begin{matrix} 12 + x & 12 + x & 12 + x \\ 4 + x & 4 - x & 4 + x \\ 4 + x & 4 + x & 4 - x \end{matrix}| = 0 Take (12 + x) common (12 + x) |\begin{matrix} 1 & 1 & 1 \\ 4 + x & 4 - x & 4 + x \\ 4 + x & 4 + x & 4 - x \end{matrix}| = 0 C_{2} \to C_{2} - C_{1}, C_{3} \to C_{3} - C_{1} (12 + x) |\begin{matrix} 1 & 0 & 0 \\ 4 + x & - 2 x & 0 \\ 4 + x & 0 & - 2 x \end{matrix}| = 0 (12 + x) (- 2 x) (- 2 x) = 0 \Rightarrow x = 0, - 12$ `|(4-"x",4+"x",4+"x"),(4+"x",4-"x",4+"x"),(4+"x",4+"x",4-"x")|= 0`

R₁→ R₁+ R₂+R₃

`|(12+"x",12+"x",12+"x"),(4+"x",4-"x",4+"x"),(4+"x",4+"x",4-"x")|= 0`

Take (12 +x) common

`(12+"x")|(1,1,1),(4+"x",4-"x",4+"x"),(4+"x",4+"x",4-"x")|= 0`

C₂ → C₂- C₁, C₃ → C₃ - C₁

`(12+"x")|(1,0,0),(4+"x",-2"x",0),(4+"x",0,-2"x")|= 0`

(12 + x) (-2x) (-2x) = 0

⇒ x = 0, -12

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Properties of Determinants

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Q 20 Q 19.2 Q 21

2018-2019 (March) 65/4/3

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2018-2019 (March) 65/4/3 (with solutions)

Q 20 | 4 marks

Using properties of determinants, find the value of x for which |(4-"x",4+"x",4+"x"),(4+"x",4-"x",4+"x"),(4+"x",4+"x",4-"x")|= 0

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Using properties of determinants, find the value of x for which |(4-"x",4+"x",4+"x"),(4+"x",4-"x",4+"x"),(4+"x",4+"x",4-"x")|= 0

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