Question

The mighty oak tree outside of Matt's house had to be cut down. He missed the beautiful tree and the shade it provided, and wanted to replace it with an oak tree that would grow quickly. The Nuttall Oak , the fastest growing oak tree, grows 5 to 6 feet per year (we'll assume it grows at a constant rate). At maturity, it can be up to 65 feet tall.Which of the following equations, where t represents time in years and h represents height in feet, describe growth that is FASTER than the Nuttall Oak growth rate?

Answer 1

To find the equations that describe growth faster than the Nuttall Oak, we need to look for equations that have a greater rate of increase in height.

Step-by-step explanation:

To find the equations that describe growth faster than the Nuttall Oak, we need to look for equations that have a greater rate of increase in height. The Nuttall Oak grows at a rate of 5 to 6 feet per year. Therefore, any equation that has a greater rate of increase than 5-6 will describe growth that is faster than the Nuttall Oak.

For example, an equation like h = 7t, where h represents the height and t represents the time in years, would describe faster growth than the Nuttall Oak. This equation means that the height increases by 7 feet every year, which is greater than the Nuttall Oak's growth rate.

Similarly, an equation like h = 10t, where h represents the height and t represents the time in years, would also describe faster growth than the Nuttall Oak. This equation means that the height increases by 10 feet every year, which is again greater than the Nuttall Oak's growth rate.

Answer 2

h=5t

Step-by-step explanation:

This means the correct answer is A