If `|z|=1a n dz!=+-1,`then all the values of `z/(1-z^2)`lie ona line not passing through the origin`|z|=sqrt(2)`the x-axis(d) the y-axisA. a line not passing through the originB. `|z|=sqrt(2)`C. the X-axiesD. the Y-axies

If `|z|=1a n dz!=+-1,`then all the values of `z/(1-z^2)`lie ona line n

1.	If `\|z\|=1a n dz!=+-1,`then all the values of `z/(1-z^2)`lie ona line not passing through the origin`\|z\|=sqrt(2)`the x-axis(d) the y-axisA. a line not passing through the originB. `\|z\|=sqrt(2)`C. the X-axiesD. the Y-axies
Answer» Correct Answer - D Let `z=cos theta + I sin theta` `rArr z/(1-z^2)=(cos theta + sin theta )/(1- (cos 2 theta + sin 2 theta))` `=(cos theta + I sin theta )/(2 sin ^2 theta - 2 I sin theta cos theta)` `=(cos theta +I sin theta)/(-2 I sin theta (cos theta +i sin theta))=i/(2 sin theta)` Hence `z/1-z^2 ` lies on the imaginary axis ie, y-axis . Alternate Solution Let `E=(z)/(1-z^2)=z/(zbarz-z^2)=1/(barz -z)` which is an imaginary

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If `|z|=1a n dz!=+-1,`then all the values of `z/(1-z^2)`lie ona line not passing through the origin`|z|=sqrt(2)`the x-axis(d) the y-axisA. a line not passing through the originB. `|z|=sqrt(2)`C. the X-axiesD. the Y-axies

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