Question

To solve the equation \(2x(2x + 9)(16x^2 - 9) = 0\), we can set each factor equal to zero and solve for \(x\).

1. **First factor:**
\[
2x = 0
\]
Dividing both sides by 2 gives:
\[
x = 0
\]

2. **Second factor:**
\[
2x + 9 = 0
\]
Subtracting 9 from both sides:
\[
2x = -9
\]
Dividing by 2 gives:
\[
x = -\frac{9}{2}
\]

3. **Third factor:**
\[
16x^2 - 9 = 0
\]
Adding 9 to both sides gives:
\[
16x^2 = 9
\]
Dividing by 16:
\[
x^2 = \frac{9}{16}
\]
Taking the square root of both sides gives:
\[
x = \frac{3}{4} \quad \text{or} \quad x = -\frac{3}{4}
\]

Putting it all together, the solutions to the equation \(2x(2x + 9)(16x^2 - 9) = 0\) are:

\[
\boxed{0, -\frac{9}{2}, \frac{3}{4}, -\frac{3}{4}}
\]

To solve the equation

\[
-x(x + 6)(x^2 - 49) = 0,
\]

we can set each factor in the equation equal to zero:

1. **First factor:**
\[
-x = 0
\]
Dividing both sides by -1 gives:
\[
x = 0.
\]

2. **Second factor:**
\[
x + 6 = 0
\]
Subtracting 6 from both sides gives:
\[
x = -6.
\]

3. **Third factor:**
\[
x^2 - 49 = 0
\]
This can be factored as:
\[
(x - 7)(x + 7) = 0.
\]
Setting each factor equal to zero gives:
\[
x - 7 = 0 \quad \Rightarrow \quad x = 7,
\]
and
\[
x + 7 = 0 \quad \Rightarrow \quad x = -7.
\]

Putting it all together, the solutions to the equation \(-x(x + 6)(x^2 - 49) = 0\) are:

\[
\boxed{0, -6, 7, -7}.
\]

To solve the quadratic equation

\[
2k^2 + 11k + 12 = 0,
\]

we will use the quadratic formula, which is given by:

\[
k = \frac{-b \pm \sqrt{b^2 - 4ac}}{2a},
\]

where \(a\), \(b\), and \(c\) are the coefficients from the quadratic equation \(ax^2 + bx + c = 0\).

In this equation, we have:
- \(a = 2\),
- \(b = 11\),
- \(c = 12\).

Now we can calculate the discriminant:

\[
b^2 - 4ac = 11^2 - 4(2)(12) = 121 - 96 = 25.
\]

Now substitute \(b\), \(\sqrt{b^2 - 4ac}\), and \(a\) into the quadratic formula:

\[
k = \frac{-11 \pm \sqrt{25}}{2(2)}.
\]

Calculating \(\sqrt{25}\):

\[
\sqrt{25} = 5.
\]

Now plug this into the formula:

\[
k = \frac{-11 \pm 5}{4}.
\]

This gives us two possible solutions:

1. **Using the plus sign:**
\[
k = \frac{-11 + 5}{4} = \frac{-6}{4} = -\frac{3}{2}.
\]

2. **Using the minus sign:**
\[
k = \frac{-11 - 5}{4} = \frac{-16}{4} = -4.
\]

Thus, the solutions to the equation \(2k^2 + 11k + 12 = 0\) are:

\[
\boxed{-\frac{3}{2}, -4}.
\]

To solve the equation

\[
16c^2 - 24c + 4 = -1,
\]

first, we rearrange the equation to set it to zero:

\[
16c^2 - 24c + 4 + 1 = 0.
\]

This simplifies to:

\[
16c^2 - 24c + 5 = 0.
\]

Now we can use the quadratic formula, which is given by:

\[
c = \frac{-b \pm \sqrt{b^2 - 4ac}}{2a},
\]

where \(a\), \(b\), and \(c\) are the coefficients from the equation \(ax^2 + bx + c = 0\). In this case:

- \(a = 16\),
- \(b = -24\),
- \(c = 5\).

Next, we calculate the discriminant:

\[
b^2 - 4ac = (-24)^2 - 4(16)(5) = 576 - 320 = 256.
\]

Now we can substitute \(b\), \(\sqrt{b^2 - 4ac}\), and \(a\) into the quadratic formula:

\[
c = \frac{-(-24) \pm \sqrt{256}}{2(16)}.
\]

This simplifies to:

\[
c = \frac{24 \pm 16}{32}.
\]

Now we can evaluate the two possible solutions:

1. **Using the plus sign:**
\[
c = \frac{24 + 16}{32} = \frac{40}{32} = \frac{5}{4}.
\]

2. **Using the minus sign:**
\[
c = \frac{24 - 16}{32} = \frac{8}{32} = \frac{1}{4}.
\]

Thus, the solutions to the equation \(16c^2 - 24c + 4 = -1\) are:

\[
\boxed{\frac{5}{4}, \frac{1}{4}}.
\]

To graph the equation \( y = -x^2 + 14x - 48 \), we first need to analyze it by finding its roots and vertex which will allow us to plot the points accurately.

### 1. **Finding the roots:**
To find the roots, set \( y = 0 \):

\[
-x^2 + 14x - 48 = 0.
\]

Multiplying by -1 gives:

\[
x^2 - 14x + 48 = 0.
\]

Now, we can factor this quadratic equation. We are looking for two numbers that multiply to \( 48 \) and add to \( 14 \). These numbers are \( 6 \) and \( 8 \).

Thus, we can factor it as:

\[
(x - 6)(x - 8) = 0.
\]

So the roots are:

\[
x = 6 \quad \text{and} \quad x = 8.
\]

### 2. **Finding the vertex:**
The vertex \( x \)-coordinate can be found using the formula:

\[
x = -\frac{b}{2a},
\]

where \( a = -1 \) and \( b = 14 \):

\[
x = -\frac{14}{2 \cdot -1} = 7.
\]

Now calculate the corresponding \( y \) value by substituting \( x = 7 \) back into the equation:

\[
y = -7^2 + 14 \cdot 7 - 48 = -49 + 98 - 48 = 1.
\]

Thus, the vertex is at the point \( (7, 1) \).

### 3. **Plotting the points:**
We will now plot the following points:

- Roots: \( (6, 0) \) and \( (8, 0) \)
- Vertex: \( (7, 1) \)
- Additional points to get the shape of the graph. You can choose values around the vertex (for example \( x = 5 \) and \( x = 9 \)):
- For \( x = 5 \):
\[
y = -5^2 + 14 \cdot 5 - 48 = -25 + 70 - 48 = -3 \, \Rightarrow \text{(5, -3)}
\]
- For \( x = 9 \):
\[
y = -9^2 + 14 \cdot 9 - 48 = -81 + 126 - 48 = -3 \, \Rightarrow \text{(9, -3)}
\]

Now we have the points to plot:
- \( (6, 0) \)
- \( (8, 0) \)
- \( (7, 1) \)
- \( (5, -3) \)
- \( (9, -3) \)

### 4. **Axis of symmetry:**
The axis of symmetry for a parabola in the form \( y = ax^2 + bx + c \) is given by the equation \( x = h \), where \( h \) is the x-coordinate of the vertex. Since we found the vertex to be at \( (7, 1) \), the axis of symmetry is:

\[
\text{Axis of Symmetry: } x = 7.
\]

### Summary:

**Plot Points:**
- (6, 0)
- (8, 0)
- (7, 1)
- (5, -3)
- (9, -3)

**Axis of Symmetry:**
\[
\boxed{x = 7}
\]

You can now graph these points on a coordinate plane to visualize the parabola. The points should form a U-shaped curve opening downwards with the vertex at the highest point (7, 1) and passing through the roots at (6, 0) and (8, 0).

It seems like you're looking for a structured response in the form of clear, labeled points and the equation for the axis of symmetry.

### Key Points for the Graph of \( y = -x^2 + 14x - 48 \):

1. **Roots (x-intercepts)**:
- \( (6, 0) \)
- \( (8, 0) \)

2. **Vertex**:
- \( (7, 1) \)

3. **Additional Points**:
- \( (5, -3) \)
- \( (9, -3) \)

### Summary of the Axis of Symmetry:
- The axis of symmetry is given by the vertical line that passes through the vertex.

\[
\text{Axis of Symmetry: } x = 7
\]

### Final Presentation:
- **Points to Plot**:
- \( (6, 0) \)
- \( (8, 0) \)
- \( (7, 1) \)
- \( (5, -3) \)
- \( (9, -3) \)

- **Equation of the Axis of Symmetry**:
\[
\boxed{x = 7}
\]

You can plot these points on a graph to visualize the parabolic curve. If you need further graphics or visual representation, please let me know!