Question

The mathematical model \(O=\frac{t^{2}-t+1}{t^{2}+1}, \quad t \geq 0\) gives the percent of the normal level of oxygen in a pond, where \(t\) is the time in weeks after organic waste is dumped into the pond. Sketch a bar graph showing the oxygen level of the pond when \(t=0,1,2,3,4\), and 5 weeks. What conclusions can you make from your bar graph?

Short answer

The graph and calculations will show how the oxygen levels change over time weeks after the organic waste is dumped into the pond. This should provide insights into the pond's overall oxygen levels and the effect of organic waste dumping.

Step-by-step solution

Calculate Oxygen Levels

Plug in each of the given time values (t = 0,1,2,3,4, and 5) into the equation \[O=\frac{t^{2}-t+1}{t^{2}+1}\] to calculate the percent of oxygen level. Calculate these values.

Create the Bar Graph

Once the oxygen levels for each time interval are calculated, plot these calculated oxygen levels on a bar graph. The x-axis will represent time in weeks and the y-axis will represent oxygen level in percent.

Analyze the Bar Graph

Analyze the bar graph to understand the variation in oxygen levels over time. Looking for any patterns or trends can provide insights into how the oxygen level changes over weeks.

Key concepts

Algebraic Functions

Algebraic functions are expressions that involve operations like addition, subtraction, multiplication, division, and power raising, applied to variables. They play a critical role in creating mathematical models, such as the one used to calculate oxygen levels in the pond. The given function \(O=\frac{t^{2}-t+1}{t^{2}+1}\), illustrates a typical algebraic function. Here, \(t\) is the independent variable that represents time measured in weeks.

Let's break down how this function works:

• The numerator \(t^{2}-t+1\) indicates how oxygen changes considering the time passed.
• The denominator \(t^{2}+1\) ensures that division by zero does not occur for all values of \(t\geq0\).
• As \(t\) increases, the relation of these polynomial components helps us understand how the oxygen level behaves over time.

The structure of this function helps model real-world phenomena, making it a valuable example of algebraic functions in environmental science. By substituting specific time values into this equation, you can predict complex ecological dynamics efficiently.

Graphical Analysis

Graphical analysis involves interpreting data by visualizing it in a way that is easy to understand. Creating a bar graph from calculated oxygen levels provides a clear visual of how these levels change over time in response to the organic waste.

Here’s a simple approach to graphing these values:

• Create axes where the x-axis represents time (in weeks) and the y-axis represents the percentage of oxygen levels.
• Plot the computed oxygen levels at each time point (\(t=0, 1, 2, 3, 4, 5\)) and draw bars that reach up to these values on the graph.

Analyzing the resulting graph helps detect trends, such as whether oxygen levels are dropping or rising over time. This can suggest how quickly the pond is recovering or deteriorating, providing insights into the immediate environmental impact of the waste dump.

Environmental Science

Environmental science often involves understanding how ecological processes respond to various changes. The mathematical model in our exercise highlights a typical environmental scenario, where human activities impact natural resources. Modeling the oxygen levels asks critical questions about ecological health.

Consider the real-world application:

• Organic waste in ponds leads to oxygen depletion, affecting aquatic life.
• The mathematical model helps predict how oxygen levels fall, vital for planning interventions.
• Insights from such studies help in developing environmental policies for waste management.

This model thus forms a bridge between mathematics and ecology, showcasing the power of algebraic functions in ecological modeling. Understanding these concepts can be powerful in advocating for environmental protection informed by data.