Question: An entomologist studying pollination patterns models the number of flowers visited by bees as $ f(t) = -5t^2 + 30t + 100 $. What is the maximum number of flowers the bees visit in a day?

Understanding Bee Pollination Patterns: Finding the Maximum Number of Flowers Visited

Bees play a crucial role in ecosystems and agriculture through their pollination activity. To better understand and optimize their foraging efficiency, entomologists often model bee behavior using mathematical functions. One such model estimates the number of flowers visited by bees over time:

$$ f(t) = -5t^2 + 30t + 100 $$

Understanding the Context

Here, $ t $ represents time in hours, and $ f(t) $ represents the number of flowers visited at time $ t $. But what does this model truly reveal about bee behavior? And crucially, what is the maximum number of flowers bees visit in a single day according to this model?

The Mathematical Model Explained

The function $ f(t) = -5t^2 + 30t + 100 $ is a quadratic equation, and its graph forms a parabola that opens downward because the coefficient of $ t^2 $ is negative ($ -5 $). This means the function has a peak — a maximum point — which occurs at the vertex of the parabola.

Question: An entomologist studying pollination patterns models the number of flowers visited by bees as $ f(t) = -5t^2 + 30t + 100 $. What is the maximum number of flowers the bees visit in a day?

Key Insights

For a quadratic function in the form $ f(t) = at^2 + bt + c $, the time $ t $ at which the maximum (or minimum) occurs is given by:
$$ t = -rac{b}{2a} $$

Substituting $ a = -5 $ and $ b = 30 $:
$$ t = -rac{30}{2(-5)} = rac{30}{10} = 3 $$

So, the maximum number of flowers visited happens 3 hours after tracking begins.

Calculating the Maximum Number of Flowers Visited

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Final Thoughts

Now, substitute $ t = 3 $ back into the original function to find the maximum number of flowers visited:
$$ f(3) = -5(3)^2 + 30(3) + 100 $$
$$ f(3) = -5(9) + 90 + 100 $$
$$ f(3) = -45 + 90 + 100 $$
$$ f(3) = 145 $$

Therefore, the maximum number of flowers the bees visit in a day, according to this model, is 145 flowers.

Practical Implications for Pollination Research

This mathematical insight helps entomologists and ecologists understand the peak foraging period, guiding research on:

Optimal timing for bee conservation efforts
Understanding environmental factors affecting pollinator activity (such as temperature, floral abundance, and pesticide exposure)
Maximizing pollination efficiency in agricultural fields

The quadratic model confirms that bee visits follow a circular, time-limited foraging pattern, peaking in the mid-morning — a key finding for ecological studies.

Summary

The model $ f(t) = -5t^2 + 30t + 100 $ represents flower visits over time
It peaks at $ t = 3 $ hours
Maximum flower visits occur at 145 flowers per day
This model aids in understanding and enhancing pollination efficiency