Asked by nuh uhhhhhhhh

To determine how far the firework will travel before reaching the ground, we need to find the value of \( x \) that makes the function \( h = -\frac{25}{36}x^2 + \frac{1623}{100}x = 0 \).

This corresponds to finding the roots of the quadratic equation:

\[
-\frac{25}{36}x^2 + \frac{1623}{100}x = 0
\]

We can factor out \( x \):

\[
x\left(-\frac{25}{36}x + \frac{1623}{100}\right) = 0
\]

One solution is \( x = 0 \) (when the firework is launched). To find the other solution, we need to solve:

\[
-\frac{25}{36}x + \frac{1623}{100} = 0
\]

Rearranging gives us:

\[
-\frac{25}{36}x = -\frac{1623}{100}
\]

Multiply through by -1:

\[
\frac{25}{36}x = \frac{1623}{100}
\]

Now, we can solve for \( x \):

\[
x = \frac{1623}{100} \cdot \frac{36}{25}
\]

Calculating this step-by-step:

1. Compute \( \frac{1623 \cdot 36}{100 \cdot 25} = \frac{1623 \cdot 36}{2500} \).

Now, let's perform the multiplication:

\[
1623 \times 36 = 58428
\]

and now divide:

\[
x = \frac{58428}{2500} \approx 23.3712
\]

Since this value doesn't exactly match the numbers in our table, let's evaluate the values provided:

1. For \( x = 12 \):

\[
h = -\frac{25}{36}(12^2) + \frac{1623}{100}(12) = -\frac{25}{36}(144) + \frac{1623}{100}(12)
\]

2. For \( x = 24 \):

\[
h = -\frac{25}{36}(24^2) + \frac{1623}{100}(24)
\]

3. For \( x = 36 \):

\[
h = -\frac{25}{36}(36^2) + \frac{1623}{100}(36)
\]

4. For \( x = 48 \):

\[
h = -\frac{25}{36}(48^2) + \frac{1623}{100}(48)
\]

We can find which values produce 0. However, as expected from the derivations:

The approximate value we calculated for \( x \) is indeed closest to 24 feet, as it is near to 23.3712.

Thus, the answer to how far the firework will travel before reaching the ground is:

**24 feet.**