In an arithmetic progression, the difference between two consecutive terms is always:
In an arithmetic progression, the difference between two consecutive terms is always:
A)
Increasing
B)
Constant
C)
Decreasing
D)
Varying
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Answer:
B) Constant
An AP series follows the pattern a , a+d , a+2d, a+3d and so on
Difference between any two consecutive terms
= (a+d) - a
= (a+2d) - (a+d)
= (a+3d) - (a+2d)
= d
Hence proved
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