Often a good idea to draw a very quick and rough sketch to give you an idea of what you are having to deal with.
![Tony B]()
Set rarr as positive thus larr is negative
Set uarr as positive thus darr is negative
color(brown)("Consider the horizontal")
AB_h=+[7.4xxsin(45^o)]~~+5.23159..
BC_h=+[2.8xxcos(30^o)]~~+2.42487..
CD_h=-[5.2xxsin(22^o)]~~-1.94795..
Sum ~~+5.70950....
color(brown)("Consider the vertical")
AB_h=+[7.4xxcos(45^o)]~~-5.23259.....
BC_h=+[2.8xxsin(30^o)]=+1.4" "...
CD_h=-[5.2xxcos(22^o)]~~+4.82135...
Sum ~~+0.98876....
So we end up with:
![Tony B]()
beta =tan^(-1)(0.988765...)/(5.709507..)~~9.82497..."degrees East North"
"Resultant "r ~~ sqrt((0.988765..)^2+(5.709507..)^2)
r=5.794491212bar(12)
~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~
color(blue)("This is a repeating decimal so a rational number")
color(brown)("Converting to an exact fractional answer")
Set x_1=5.794491212bar(12)
Setx_2=0.794491212bar(12)
10000000x_2=7944912.1212bar(12)
ul(color(white)("d0")100000x_2=color(white)("00")79449.1212bar(12)larr" Subtract")
color(white)("d")9900000x_2=7865463
x_2=7865463/9900000
r=x_1 = 5 color(white)("d")7865463/9900000 color(red)(larr" What an awful number!!!")
color(red)("I'm sticking with the decimal!!")
