Asked by A Nony Moose

p = 4x + 15

Sure!

To find an equation that gives the city's population p (in thousands of people) x years after 2010, we need to consider the initial population in 2010 and how it changes over time.

We know that the population increases by 4,000 people each year. Since the population is given in thousands of people, we can say that the population increases by 4,000/1000 = 4 per year.

In 2010, the population is not mentioned, so we need to determine a constant term in the equation. We can calculate it by subtracting the population increase from the projected population in 2025.

450,000 - 4,000*15 = 450,000 - 60,000 = 390,000

So, in 2010, the population was 390,000 people (in thousands of people).

Now, let's write the equation using the slope-intercept form, which is y = mx + b, with y as the population, x as the number of years after 2010, m as the slope (rate of increase/ decrease), and b as the initial population.

Therefore, the equation becomes: p = 4x + 390 (where p represents the population and x represents the number of years after 2010).

To further simplify the equation, we can write it as p = 4x + 15 (since 390 = 4*15 + 15).

I hope this clarifies the reasoning behind the equation!

Certainly! The equation in point-slope form is:

p – 390 = 4(x – 0)

Alternatively, if you want to write the equation in point-slope form using 2010 as the starting point, it would be:

p – 390 = 4(x – 10)

If we use 2025 as the starting point, the equation in point-slope form would be:

p – 450 = 4(x – 15)

Apologies for the confusion. Yes, the equation p – 450 = 4(x – 15) can be considered as the answer to the question. It gives the city's population p (in thousands of people) x years after 2010, with 2025 as the starting point.