Problem: The first three terms of an arithmetic progression are xβ1,x+1,2x+3, in the order shown. The value of x is:
Answer Choices:
A. β2
B. 0
C. 2
D. 4
E. undetermined
Solution:
Let d be the common difference
d=(x+1)β(xβ1)=2, and
d=(2x+3)β(x+1)=x+2
β΄x+2=2β΄x=0
or
2(x+1)=(xβ1)+(2x+3)
2x+2=3x+2
x=0