Answer:
Approximately 1.2078566715...
Step-by-step explanation:
Very tricky question! Because the picture doesn't seem to be drawn to scale...
With point O being the center of the circle, construct segments KO, LO, and MO, all of them are the radius of the circle, thus, equivalent.
Since KL=LM, then triangle KLM is an isosceles triangle and angle K is equal to angle M.
[tex]m<K=m<M\\17=m<M[/tex]
(Yes that means "measure of angle")
And because both angles K and M are 17 degrees, then angle L must be 146 degrees.
Now, focus on triangle LOK, since KO=LO, triangle LOK is also an isosceles triangle, thus:
[tex]m<LKO=m<KLO\\m<LKO=73[/tex]
(Since half of angle L is 73)
Then m<KOL must be 34 degrees, and m<KOM will be 68 degrees.
After that, we can use the law of cosine to solve for KM:
[tex](KM)^2=1.08^2+1.08^2-2(1.08)(1.08)Cos(68)\\(KM)^2=1.1664+1.1664-2.3328(0.37460659341...)\\(KM)^2=2.3328-0.87388226112...\\(KM)^2=1.45891773888...\\KM=1.2078566715...[/tex]
The only thing that bothers me is angle KOM being 68 degrees because in the figure angle KOM is clearly an obtuse angle.
I hope I am not tripping.
