The sum of a finite geometric series S100=1−0.051001−0.05
can be expressed in sigma notation with the following variables:(2 points)
n=

, a=

, and r=

Remaining Attempts : 3

Question

The sum of a finite geometric series  S100=1−0.051001−0.05
  can be expressed in sigma notation with the following variables:(2 points)
n=
 
,  a=
 
, and  r=
 
Remaining Attempts : 3

GPT-5 mini · Answer

n = 100, a = 1, r = 0.05

(So S100 = sum_{k=0}^{99} 1*(0.05)^k = (1 − 0.05^{100})/(1 − 0.05).)

The sum of a finite geometric series S100=1−0.051001−0.05
can be expressed in sigma notation with the following variables:(2 points)
n=

, a=

, and r=

Remaining Attempts : 3

All Answers 1

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The sum of a finite geometric series S100=1−0.051001−0.05 can be expressed in sigma notation with the following variables:(2 points) n= , a= , and r= Remaining Attempts : 3

All Answers 1