The value of b is: 4 and -66
We are given distance between two points i.e. 25+bi and 13-31i as: 37 units.
We know that the point 25+bi is given in coordinate plane as: (25,b)
and 13-31i is given in coordinate plane as: (13,-31)
Since, any complex number is expressed in the form z=x+iy
Now we know that the distance between two points (a,b) and (c,d) is given by:
[tex]Distance=\sqrt{(c-a)^2+(d-b)^2}[/tex]
Here we have:
Distance=37 units.
(a,b)=(25,b) and (c,d)=(13,-31)
Hence, we have:
[tex]37=\sqrt{(13-25)^2+(-31-b)^2}\\\\\\37=\sqrt{12^2+(31+b)^2}\\\\\\37=\sqrt{144+(31+b)^2}[/tex]
Now on squaring both side we obtain:
[tex]1369=144+(31+b)^2\\\\\\1369-144=(31+b)^2\\\\\\(31+b)^2=1225\\\\\\(31+b)^2=(35)^2[/tex]
on taking square root both side we obtain:
[tex]31+b=\pm 35\\\\i.e.\\\\\\b=35-31\ and\ b=-35-31=-66\\\\\\i.e.\ b=4\ and\ b=-66[/tex]
Hence, the value of b is: 4 and -66
