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HOW CAN ARITHMETIC AND GEOMETRIC SEQUENCES BECOME LINEAR AND EXPONENTIAL FUNCTIONS?
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HOW CAN ARITHMETIC AND GEOMETRIC SEQUENCES BECOME LINEAR AND EXPONENTIAL FUNCTIONS?

User Ivanatpr
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The formula of an arithmetic sequence is the following :

u_n=r* n+u_0\text{ wherein r is the rate of the sequence} \\\text{and u0 the first value}\\\text{The above formula is linear wherever }u_0=0.
A geometric sequence is in the form:

u_n=u_0r^n\text{, again u0 the first value and r the rate. }\\\text{If }u_0=1\text{ the formula becomes:}\\u_n=r^n=e^(n\log r)\text{ which is an exponential formula.}
User Matthew Bischoff
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