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What is the ordered Paris for f(x)=3^2x+5

User Lenora
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1 Answer

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Hello there. To solve this question, we'll have to remember some properties about ordered pairs.

Given a function f, continuous in a domain D, the ordered pairs in the graph of this function are given by:


(x,f(x)),\forall{x}\in D

In this case, the function f(x) is defined as:


f(x)=3^(2x)+5

Such that the ordered pairs will be given by:


(x,3^(2x)+5)

And the domain of this function is all the real numbers, since this exponential function is continuous everywhere.

User Bpy
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