Show that a real value of `x` will satisfy the equation `(1-i x)//(1+i x)=a-i b` if `a^2+b^2=1,w h e r ea ,b` real.

Show that a real value of x will satisfy the equation (1-ix)/(1+ix)=a-ibquad if a^(2)+b^(2)=1 ,when a,b are real.

A real value of x satisfies the equation (3-4i x)/(3+4i x)=a-i b(a , b in RR), if a^2+b^2= a. 1 b. -1 c. 2 d. -2

Find the real values of x and y which satisfy the equation (3+i)x+(1-2i)y+7i=0

The sum of all the real values of x satisfying the equation 2^((x-1)(x^(2)+5x-50))=1 is

The relation between the real numbers a and b ,which satisfy the equation (1-ix)/(1+ix)=a-ib, for some real value of x, is

The set of real values of x satisfying ||x-1|-1|le 1 , is

The set of real values of x satisfying the equation |x-1|^(log_(3)(x^(2))-2log_(x)9)=(x-1)^(7)

Find the real values of x and y,quad if quad :(1+i)(x+iy)=2-5i