Complete The Table For The Following Function $y=3^x$.$\[ \begin{array}{|c|c|c|c|c|c|c|c|} \hline x & -3 & -2 & -1 & 0 & 1 & 2 & 3 \\ \hline y & & & \frac{1}{3} & 1 & 3 & & \\ \hline \end{array} \\]Graph The Function And Describe What

Exploring the Exponential Function: Completing the Table and Graphing $y=3^x$

The exponential function $y=3^x$ is a fundamental concept in mathematics, describing a relationship between two variables where the rate of change is proportional to the current value. In this article, we will delve into completing the table for the given function and graphing it to gain a deeper understanding of its behavior.

The table provided is incomplete, with missing values for $x=-3, -2, 2,$ and $3$. To complete the table, we will substitute each value of $x$ into the function $y=3^x$ and calculate the corresponding value of $y$.

$x$	$y$
-3	1/27
-2	1/9
-1	1/3
0	1
1	3
2	9
3	27

Explanation of the Calculations

To calculate the value of $y$ for each $x$, we simply substitute the value of $x$ into the function $y=3^x$. For example, to find the value of $y$ when $x=-3$, we calculate $3^{-3} = 1/27$.

To graph the function $y=3^x$, we can use a graphing calculator or software. The graph will show an exponential curve that increases rapidly as $x$ increases.

Key Features of the Graph

• The graph passes through the point $(0, 1)$, which is the y-intercept.
• The graph is an exponential curve that increases rapidly as $x$ increases.
• The graph has a horizontal asymptote at $y=0$, which means that as $x$ approaches negative infinity, $y$ approaches 0.
• The graph has a vertical asymptote at $x=-\infty$, which means that as $x$ approaches negative infinity, $y$ approaches 0.

The graph of the function $y=3^x$ is an exponential curve that increases rapidly as $x$ increases. This is because the base of the exponent, 3, is greater than 1, which means that the function will increase exponentially as $x$ increases.

Real-World Applications

Exponential functions like $y=3^x$ have many real-world applications, including:

• Population growth: Exponential functions can be used to model population growth, where the rate of growth is proportional to the current population.
• Financial modeling: Exponential functions can be used to model financial growth, where the rate of growth is proportional to the current value.
• Science and engineering: Exponential functions can be used to model many scientific and engineering phenomena, including chemical reactions, electrical circuits, and population dynamics.

In conclusion, completing the table for the function $y=3^x$ and graphing it provides a deeper understanding of its behavior. The graph shows an exponential curve that increases rapidly as $x$ increases, with a horizontal asymptote at $y=0$ and a vertical asymptote at $x=-\infty$. Exponential functions like $y=3^x$ have many real-world applications, including population growth, financial modeling, and science and engineering.

For further learning, we recommend the following resources:

• Math textbooks: "Calculus" by Michael Spivak and "Differential Equations and Dynamical Systems" by Lawrence Perko.
• Online resources: Khan Academy, MIT OpenCourseWare, and Wolfram Alpha.
• Software and calculators: Desmos, GeoGebra, and TI-83/84 calculators.

By exploring the exponential function $y=3^x$ and its graph, we can gain a deeper understanding of its behavior and its many real-world applications.
Frequently Asked Questions: Exploring the Exponential Function $y=3^x$

In our previous article, we explored the exponential function $y=3^x$, completing the table and graphing it to gain a deeper understanding of its behavior. In this article, we will answer some frequently asked questions about the exponential function $y=3^x$.

Q: What is the domain of the function $y=3^x$?

A: The domain of the function $y=3^x$ is all real numbers, $(-\infty, \infty)$.

Q: What is the range of the function $y=3^x$?

A: The range of the function $y=3^x$ is all positive real numbers, $(0, \infty)$.

Q: Is the function $y=3^x$ continuous?

A: Yes, the function $y=3^x$ is continuous for all real numbers.

Q: Is the function $y=3^x$ differentiable?

A: Yes, the function $y=3^x$ is differentiable for all real numbers.

Q: What is the derivative of the function $y=3^x$?

A: The derivative of the function $y=3^x$ is $y'=3^x \ln(3)$.

Q: What is the integral of the function $y=3^x$?

A: The integral of the function $y=3^x$ is $\int 3^x dx = \frac{3^x}{\ln(3)} + C$.

Q: How does the function $y=3^x$ compare to the function $y=2^x$?

A: The function $y=3^x$ grows faster than the function $y=2^x$ because the base of the exponent, 3, is greater than 2.

Q: Can the function $y=3^x$ be used to model real-world phenomena?

A: Yes, the function $y=3^x$ can be used to model many real-world phenomena, including population growth, financial growth, and scientific and engineering phenomena.

Q: How can the function $y=3^x$ be used in finance?

A: The function $y=3^x$ can be used to model financial growth, where the rate of growth is proportional to the current value. This can be used to calculate compound interest, investment returns, and other financial metrics.

Q: How can the function $y=3^x$ be used in science and engineering?

A: The function $y=3^x$ can be used to model many scientific and engineering phenomena, including chemical reactions, electrical circuits, and population dynamics.

In conclusion, the exponential function $y=3^x$ is a fundamental concept in mathematics that has many real-world applications. By understanding the properties and behavior of this function, we can gain a deeper understanding of its applications in finance, science, and engineering.

For further learning, we recommend the following resources:

• Math textbooks: "Calculus" by Michael Spivak and "Differential Equations and Dynamical Systems" by Lawrence Perko.
• Online resources: Khan Academy, MIT OpenCourseWare, and Wolfram Alpha.
• Software and calculators: Desmos, GeoGebra, and TI-83/84 calculators.

By exploring the exponential function $y=3^x$ and its applications, we can gain a deeper understanding of its behavior and its many real-world applications.