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The exponential function [tex]\( p(x) \)[/tex] increases at a rate of [tex]\( 25 \% \)[/tex] through the ordered pair [tex]\( (0,10) \)[/tex] and is shifted down 5 units. Use a graph of the function to determine the range.

A. [tex]\( (5, \infty) \)[/tex]
B. [tex]\( (-\infty, 5) \)[/tex]
C. [tex]\( (-\infty, -5) \)[/tex]
D. [tex]\( (-5, \infty) \)[/tex]

Sagot :

GinnyAnsweridn
To determine the range of the exponential function [tex]\( p(x) \)[/tex] that increases at a rate of [tex]\( 25\% \)[/tex], given it includes the point [tex]\((0,10)\)[/tex] and is shifted down 5 units, follow these steps:

1. Base Function Analysis:
The exponential function that increases at a rate of [tex]\( 25\% \)[/tex] can be written as [tex]\( f(x) = 10 \cdot 1.25^x \)[/tex], where [tex]\( f(0) = 10 \)[/tex].

2. Vertical Shift:
If we shift the function down by 5 units, the new function becomes [tex]\( g(x) = 10 \cdot 1.25^x - 5 \)[/tex].

3. Determining the Range:
Original exponential functions of the form [tex]\( 10 \cdot 1.25^x \)[/tex] have a range of [tex]\((0, \infty)\)[/tex]. When we subtract 5 from the output, the range shifts downward by 5 units.

Therefore, the range of our transformed function [tex]\( g(x) = 10 \cdot 1.25^x - 5 \)[/tex], changes accordingly:
[tex]\[ \text{Range of } g(x) = \left(0 - 5, \infty - 5\right) \][/tex]
[tex]\[ \text{Range of } g(x) = (-5, \infty) \][/tex]

Thus, the range of the function [tex]\( p(x) \)[/tex] is [tex]\( (-5, \infty) \)[/tex].

Therefore, the correct option is:
[tex]\[ (-5, \infty) \][/tex]
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