What is the intercept form of the equation of a plane formula and derivation
Equation of Plane in Intercept Form
In order to find the equation of a plane in intercept form, it is important to get a grip about the concept of vectors. The idea of position vectors and the general equation of a plane are combined to understand the intercept form of a plane. A vector is a quantity having both magnitude and direction, existing in a three-dimensional space. In 3-D Geometry, position vectors are used to denote the position of a point in space. This acts as a reference to the point in question that has an origin in 3-D Geometry.
An infinite number of planes can be perpendicular to a vector. This means, there can be multiple planes passing through a single point. But taking into consideration a specific point only one specific plane exists which is perpendicular to the point, going through the given area. There is only one plane that passes through a given point and is perpendicular to a given vector. The vector equation of such a plane is,
(\[\vec{r}\] - \[\vec{a}\]) . \[\vec{N}\] = 0
In the above equation, \[\vec{r}\] and \[\vec{a}\] are position vectors. \[\vec{N}\] is a normal vector. Such a vector is perpendicular to the plane in the given question. In order to write the same equation in the Cartesian form, it is important to know the direction ratios of the given plane. The equation of a plane whose direction ratios are by A, B and C respectively can be represented as:
A (x – x1) + B (y – y1) + C (z – z1) = 0
Equation of a Plane Based on Non-Collinearity
Now let us try to write the same equation of a plane that passes through three non-collinear points. Non-collinear points refer to the points that do not all lie on the same line. The three points can be denoted as (x1, y1), (x2, y2) and (x3, y3). The vector equation of a plane passing through the above three non-collinear points is:
(\[\vec{r}\] - \[\vec{a}\]) [(\[\vec{b}\] - \[\vec{a}\]) х (\[\vec{c}\] - \[\vec{a}\])] = 0
The three non-collinear points when referred from the origin, have position vectors of \[\vec{a}\], \[\vec{b}\] and \[\vec{c}\] respectively. The Cartesian form of the above equation is represented as:
(x - x\[_{1}\])(y - y\[_{1}\])(z - z\[_{1}\])(x\[_{2}\] - x\[_{1}\])(y\[_{2}\] - y\[_{1}\])(z\[_{2}\] - z\[_{1}\])(x\[_{3}\] - x\[_{2}\])(y\[_{3}\] - y\[_{2}\])(z\[_{3}\] - z\[_{2}\]) = 0
The above equation is the Cartesian form of the equation of a plane that passes through three non-collinear points in the three-dimensional space.
The Equation of a Plane in Intercept Form
According to the formula, the general equation of a plane is:
Ax + By + Cz + D = 0 , where D ≠ 0
The coordinates of the vector normal to the plane are represented by A, B, C. The plane passes through any point that has the coordinates (x, y, z) in a three-dimensional plane. The plane is considered to be having intercepts in three-dimensional space at points A, B, and C respectively on the x, y, and z-axes respectively. The coordinates of the points A, B and C on the x, y and z-axes respectively are (a, 0, 0), (0, b, 0) and (0, 0, c). On representing the above plane in three-dimensional space, we get the following projection:
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By: Dimensions
The points A (a, 0, 0), B (0, b, 0) and C (0, 0, c) are cut by the plane on the x-axis, y-axis and z-axis respectively. This shows that the plane also passes through each of these three points. Now substituting the points individually into the general equation of the plane and we have,
Aa + D = 0
Bb + D = 0
Cc + D = 0
Thus, the vectors normal to the plane can be represented by the general equation as,
A = - \[\frac{D}{a}\], C = - \[\frac{D}{c}\], B = - \[\frac{D}{b}\]
On substituting these values of A, B, and C in the general equation of the plane, we shall get the equation of a plane in intercept form, which is,
\[\frac{x}{a}\] + \[\frac{y}{b}\] + \[\frac{z}{c}\] = 1
The above equation is the requisite equation of the plane that forms intercepts on the three coordinate axes in the Cartesian system. Thus, it is easy to obtain the equation of a plane in its intercept form if the general equation of the same plane is known and the above concept is clear to you. Just making substitutions using the intercepts help in the derivation of the equation of a specific plane.
Did You Know
A straight line equation also called a linear equation can be represented as y = mx + b. This is a universal formula where b is the y-intercept and m is the slope of the straight line. b is the value of the y-intercept at the point where the y axis crosses the x-axis.
FAQs on Intercept Form of a Plane Equation Explained
1. What is the intercept form of the equation of a plane?
The intercept form of the equation of a plane is x/a + y/b + z/c = 1, where a, b, and c are the intercepts on the x-, y-, and z-axes respectively. This form directly shows where the plane cuts each coordinate axis.
- a = x-intercept (point (a, 0, 0))
- b = y-intercept (point (0, b, 0))
- c = z-intercept (point (0, 0, c))
2. How do you derive the intercept form of a plane?
The intercept form is derived by assuming the plane cuts the axes at (a, 0, 0), (0, b, 0), and (0, 0, c) and using the general plane equation. Starting with the general form Ax + By + Cz = D:
- Put x = a, y = 0, z = 0 → Aa = D
- Put y = b → Bb = D
- Put z = c → Cc = D
3. What do a, b, and c represent in the intercept form of a plane?
In the intercept form x/a + y/b + z/c = 1, the values a, b, and c represent the intercepts of the plane on the x-, y-, and z-axes respectively. Specifically:
- a is where the plane meets the x-axis
- b is where it meets the y-axis
- c is where it meets the z-axis
4. How do you convert the general form of a plane into intercept form?
To convert the general form Ax + By + Cz = D into intercept form, divide the entire equation by D (assuming D ≠ 0). The steps are:
- Start with Ax + By + Cz = D
- Divide both sides by D
- Rewrite as x/(D/A) + y/(D/B) + z/(D/C) = 1
5. Can you give an example of the intercept form of a plane?
An example of the intercept form of a plane is x/2 + y/3 + z/4 = 1. Here:
- The x-intercept is 2
- The y-intercept is 3
- The z-intercept is 4
6. When is the intercept form of a plane not possible?
The intercept form is not possible when the plane is parallel to one of the coordinate axes. In such cases:
- The plane does not intersect that axis
- The corresponding intercept becomes undefined or infinite
7. What is the difference between the general form and intercept form of a plane?
The general form of a plane is Ax + By + Cz = D, while the intercept form is x/a + y/b + z/c = 1. The key differences are:
- General form emphasizes the normal vector (A, B, C)
- Intercept form directly shows axis intercepts (a, b, c)
- Intercept form is mainly used for geometric interpretation
8. How do you find the intercepts of a plane from its equation?
To find the intercepts of a plane from Ax + By + Cz = D, set the other two variables to zero one at a time.
- x-intercept: set y = 0, z = 0 → x = D/A
- y-intercept: set x = 0, z = 0 → y = D/B
- z-intercept: set x = 0, y = 0 → z = D/C
9. Why is the intercept form of a plane useful in 3D geometry?
The intercept form is useful because it clearly shows where the plane cuts the coordinate axes. This makes it easier to:
- Sketch the plane in 3D space
- Understand its geometric position
- Identify intercepts quickly without solving equations
10. How do you graph a plane using the intercept form?
To graph a plane in intercept form x/a + y/b + z/c = 1, first plot its intercepts and then connect them.
- Plot (a, 0, 0) on the x-axis
- Plot (0, b, 0) on the y-axis
- Plot (0, 0, c) on the z-axis
- Draw a plane passing through these three points
