Find Focus of Parabola Calculator
Enter the parameters of the parabola in its standard form to find its focus, vertex, and directrix.
Vertex: (0, 0)
p = 1
Directrix: y = -1
Latus Rectum Length: |4|
Visual representation of the parabola, vertex, focus, and directrix.
| Component | Value |
|---|---|
| Vertex (h, k) | (0, 0) |
| Focus | (0, 1) |
| Directrix | y = -1 |
| p | 1 |
| 4p | 4 |
| Latus Rectum Length | 4 |
| Opens | Upwards |
What is a Find Focus of Parabola Calculator?
A find focus of parabola calculator is a tool designed to determine the coordinates of the focus, the vertex, and the equation of the directrix of a parabola, given its equation in standard form. Parabolas are U-shaped curves, and every point on a parabola is equidistant from a fixed point (the focus) and a fixed line (the directrix). This calculator simplifies the process of finding these key components by taking the values of h, k, and 4p from the standard equations `(x – h)² = 4p(y – k)` or `(y – k)² = 4p(x – h)`.
Students of algebra and calculus, engineers, physicists, and anyone working with parabolic shapes (like satellite dishes or reflectors) would find a find focus of parabola calculator very useful. It automates the calculations, reducing the chance of errors and saving time. Common misconceptions are that all U-shaped curves are parabolas or that the 'p' value is always positive; however, the sign of 'p' determines the direction the parabola opens.
Find Focus of Parabola Calculator Formula and Mathematical Explanation
The standard equations of a parabola with vertex (h, k) are:
- `(x – h)² = 4p(y – k)`: This parabola opens vertically.
- If `p > 0`, it opens upwards.
- If `p < 0`, it opens downwards.
- Vertex: (h, k)
- Focus: (h, k + p)
- Directrix: y = k – p
- Axis of Symmetry: x = h
- Latus Rectum Length: |4p|
- `(y – k)² = 4p(x – h)`: This parabola opens horizontally.
- If `p > 0`, it opens to the right.
- If `p < 0`, it opens to the left.
- Vertex: (h, k)
- Focus: (h + p, k)
- Directrix: x = h – p
- Axis of Symmetry: y = k
- Latus Rectum Length: |4p|
The value 'p' is the distance from the vertex to the focus and from the vertex to the directrix. The find focus of parabola calculator uses these formulas based on the selected equation form.
| Variable | Meaning | Unit | Typical Range |
|---|---|---|---|
| h | x-coordinate of the vertex | Units of length | Any real number |
| k | y-coordinate of the vertex | Units of length | Any real number |
| p | Distance from vertex to focus/directrix | Units of length | Any non-zero real number |
| 4p | Coefficient of the linear term, related to latus rectum | Units of length | Any non-zero real number |
Practical Examples (Real-World Use Cases)
Example 1: Satellite Dish
A satellite dish is shaped like a paraboloid (a 3D parabola). Its cross-section is a parabola. Suppose the dish is modeled by the equation `(x – 0)² = 12(y – 0)`, so x² = 12y, with x and y in meters. Here, h=0, k=0, and 4p=12, so p=3. Since it's x² form, it opens upwards.
- Vertex: (0, 0)
- Focus: (0, 0 + 3) = (0, 3)
- Directrix: y = 0 – 3 = -3
The receiver should be placed at the focus, 3 meters from the vertex along the axis of symmetry, to collect the signals.
Example 2: Headlight Reflector
A car headlight reflector has a parabolic cross-section designed to reflect light from a bulb placed at the focus into a parallel beam. If the equation is `(y – 0)² = 8(x – 0)`, so y² = 8x (in cm), then h=0, k=0, 4p=8, so p=2. It opens to the right.
- Vertex: (0, 0)
- Focus: (0 + 2, 0) = (2, 0)
- Directrix: x = 0 – 2 = -2
The light bulb should be placed 2 cm from the vertex at (2, 0).
How to Use This Find Focus of Parabola Calculator
- Select Equation Form: Choose the radio button corresponding to the standard form of your parabola's equation: `(x – h)² = 4p(y – k)` (opens up/down) or `(y – k)² = 4p(x – h)` (opens left/right).
- Enter h: Input the value of 'h', the x-coordinate of the vertex.
- Enter k: Input the value of 'k', the y-coordinate of the vertex.
- Enter 4p: Input the value of '4p', the coefficient of the `(y-k)` or `(x-h)` term. Ensure it's not zero. The calculator will determine 'p' from this.
- View Results: The calculator instantly updates the Focus, Vertex, 'p' value, Directrix, and Latus Rectum Length. The primary result (Focus) is highlighted.
- See the Graph: A visual representation of the parabola, vertex, focus, and directrix is drawn.
- Reset: Click "Reset" to return to default values.
- Copy Results: Click "Copy Results" to copy the key values to your clipboard.
The find focus of parabola calculator provides immediate feedback, helping you understand how changes in h, k, and 4p affect the parabola's position and shape.
Key Factors That Affect Parabola Results
- Value of h: Shifts the parabola horizontally. Increasing 'h' moves the vertex and the entire parabola to the right.
- Value of k: Shifts the parabola vertically. Increasing 'k' moves the vertex and the entire parabola upwards.
- Value of 4p (and p): Determines the "width" and opening direction.
- Sign of p: If the equation is `(x-h)²=4p(y-k)`, positive 'p' opens up, negative 'p' opens down. If `(y-k)²=4p(x-h)`, positive 'p' opens right, negative 'p' opens left.
- Magnitude of |p|: A larger |p| makes the parabola wider (further from focus to vertex), a smaller |p| makes it narrower.
- Equation Form: `(x-h)²=…` results in a vertical axis of symmetry, while `(y-k)²=…` results in a horizontal axis of symmetry.
- Vertex (h, k): The turning point of the parabola, directly determined by 'h' and 'k'.
- Focus Location: Determined by h, k, and p, and the orientation. It's the point from which all points on the parabola are equidistant to it and the directrix.