If one root of the quadratic equation `ix^2-2(i+1)x +(2-i)=0,i =sqrt(-1)` is `2-i`, the other root is

If one root of the quadratic equation ix^2-2(i+1)x +(2-i)=0,i =sqrt(-1) is 3-i , the other root is

Two roots of the quadratic equation ix^(2) -10x -21i=0 is-

Two roots of the quadratic equation x^(2) +(i -5)x +18 +i =0 are -

If one root of the equation ix^2-2(i+1)x+(2-i)=0 is 2-i, then the other root is

Which of the following is/are CORRECT . A) If one root of the equation x^(2)-sqrt(5)x-19=0 is (9-sqrt(5))/(2) ,then the other root is (-9+sqrt(5))/(2) B) If one root of the equation x^(2)-sqrt(5)x-19=0 is (9-sqrt(5))/(2) ,then the other root is (9+sqrt(5))/(2) C) If one root of the equation x^(2)-ix-(1+i)=0 , (i=sqrt(-1)) is 1+i find the other root -1 D) If one root of the equation x^(2)-ix-(1+i)=0 , (i=sqrt(-1)) is 1+i find the other root 1-i

If one of the roots of the quadratic equation be x^2 - (1+b)x+6 = 0 be 2, then find the other root.

If one root of the equation x^(2)-ix-(1+i)=0,(i=sqrt(-1)) is 1+i , find the other root.

If one root of the equation x^(2)-ix-(1+i)=0,(i=sqrt(-1)) is 1+i , find the other root.

If one root of the equation x^(2)-ix-(1+i)=0,(i=sqrt(-1)) is 1+i , find the other root.