Question 892700
1)
Use {{{ 180/pi = 1 }}} degrees/radian as a multiplier
{{{ ( 3/2)*pi*( 180/pi ) }}}
{{{ 3*90 = 270}}} degrees
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2)
{{{ pi/48 }}} radians
{{{ ( pi/48 )*( 180/pi ) }}}
{{{ 3.75 }}} degrees
and
{{{ .75*( 60/1 ) }}} minutes/degree
{{{ 45 }}} minutes
adding:
{{{ 3 }}} degrees {{{ 45 }}} min
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3)
{{{ 2*(5/6) }}} radians
{{{ 2*(5/6)*( 180/pi ) }}}
{{{ 2*(5/6)*( 180/3.14159 ) }}} degrees
you can finish
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4)
{{{ 1.236 }}} radians
{{{ 1.236*( 180/pi ) }}}
{{{ 1.236*( 180/3.14159 ) }}}
{{{ 222.48 / 3.14159 }}}
{{{ 70.81758 }}}
and
use
{{{ 60/1 }}} minutes/degree 
{{{ .81758*( 60/1 ) }}} 
{{{ 49.0548 }}} minutes
and
{{{ .0548*( 60/1 ) seconds/minute
{{{ 3.288 }}} seconds
adding:
70 degrees 49 minutes 3 seconds
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hope this helps- check my math