Understanding the Meaning of 'a' in Exponential Decay Model

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Homework Help Overview

The discussion revolves around the exponential decay model represented by the equation y=ab^x. Participants are exploring the meaning of the variable 'a' within this context, particularly its significance when x equals zero.

Discussion Character

  • Conceptual clarification, Mathematical reasoning

Approaches and Questions Raised

  • Participants are attempting to understand why 'a' represents the value of y when x=0. Questions about the implications of this relationship and the behavior of the function as x changes are raised.

Discussion Status

The discussion includes attempts to clarify the role of 'a' and its relationship to the initial value of the function. Some participants are exploring the implications of changes in x on the value of y, while others are questioning the decay factor represented by 'b'. There is an ongoing exploration of the definitions and roles of the variables involved.

Contextual Notes

Participants note that 'x' represents time and that 'b' is the decay factor, which influences the behavior of the function as x increases. There is a focus on understanding the initial conditions and the dynamics of the decay process.

shad0w0f3vil
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Homework Statement



In the standard model for exponential decay, y=ab^x , what does a represent and why?


The Attempt at a Solution



I know that a is the value of y when x=0, but I don't understand why this is the case. Any help would be appreciated, thanks.
 
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You mean b^(-x). And you've already answered the question yourself.
 
but i don't understand why though.
 
What is ab^{0} equal to? (As long as b \neq 0)
 
is it just a?
 
shad0w0f3vil said:
is it just a?

Yup. You get that part right?

In this kind of question you want to say what each variable or constant stands for. And then describe how the value of the function changes as x changes.
 
yeh, what else am I missing?
 
x stands for time, so when x=0 we know that y=a so that's why a is the initial value. As x increases what will happen to y=ab^{-x}? will it get smaller or larger? why?
 
actually in our case b represents the decay factor, as a result the x is positive. However, as x increases b would get smaller (for the model i just said), meaning that when it is multiplied to a, the value of y would decrease as x increases.
 

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