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Ncert Solutions Maths class 11th Maths Class 11th Complex Numbers and Quadratic Equations

37. Find the real numbers x and y if (x – iy) (3 + 5i) is the conjugate of –6 – 24i.

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Payal Gupta | Contributor-Level 10

4 months ago

37. Let z = (x – iy) (3 + 5i)

= 3x + 5xi – 3yi – 5yi²

= (3x + 5y) + (5x – 3y)i

Given, $\bar{z}$ = –6 – 24i

=> (3x + 5y) – (5x – 3y)i = –6 – 24i

Equating real and imaginary part,

3x + 5y = –6 - (1)

5x – 3y = 24 - (2)

Multiplying (1) by 3 and (2) by 5 and adding them, we get

9x + 15y + 25x – 15y = –18 + 120

=> 34x = 102

=>x = 102/34 = 3

Putting x = 3 in (1) we get,

3 × 3 + 5y = –6

=> 9 + 5y = –6

=> 5y = –6 – 9

=> 5y = –15

=>y = –15/5 = –3

Hence, the values of x and y are 3 and –3 respectively.

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37. Find the real numbers x and y if (x – iy) (3 + 5i) is the conjugate of –6 – 24i.

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