Math, asked by Disha1622, 6 months ago

(x^4+2xi)-(3x^2+yi)=(3-5i)+(1+2yi) find the real value of x and y

please help

Answers

Answered by karansaw14366

3

(x^4 + 2xi) - (3x² + yi) = (3 - 5i) + (1 + 2yi)

x^4 + 2xi - 3x² - yi = 3 - 5i + 1 + 2yi

x^4 + 2xi - 3x² - yi = 4 - 5i + 2yi

x^4 + 2xi - 3x² - yi - 4 + 5i - 2yi = 0

x^4 + 2xi - 3x² - 3yi - 4 + 5i = 0

x^4 - 3x² - 4 + 2xi - 3yi + 5i = 0

(x^4 - 3x² - 4) + i(2x - 3y + 5) = 0

real value = (x^4 - 3x² - 4)

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