Problem: The angles of a pentagon are in arithmetic progression. One of the angles, in degrees, must be:
Answer Choices:
A. 108108108
B. 909090
C. 727272
D. 545454
E. 363636 Solution:
Let the degree measurement of the angles be represented by aβ2d,aβd,a,a+d,a+2da-2 d, a-d, a, a+d, a+2 daβ2d,aβd,a,a+d,a+2d. Then 5a=540β5 \mathrm{a}=540^{\circ}5a=540β and a=108β\mathrm{a}=108^{\circ}a=108β.