Answer:
110
Step-by-step explanation:
There is a theorem that says "The measure of an angle formed by a secant and a tangent drawn from a point outside the circle is HALF the difference of the intercepted arcs "
Hence we can say:
[tex]70=\frac{1}{2}(arcALB-arcAB)[/tex]
We can say:
[tex]140=(arcALB-arcAB)[/tex]
Also, we know that circle's degree measure is 360, thus we can say:
[tex](arcALB+arcAB)=360[/tex]
To find Arc AB, we can use the two equations and add, thus we get:
[tex]140=(arcALB-arcAB)\\360=(arcALB+arcAB)\\-------------\\500=2*arcALB\\arcALB=250[/tex]
Thus, arc AB = 360 - 250 = 110
2nd answer choice is right.
