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JEE Main 2026 Preparation: Question Papers, Solutions, Mock Tests & Strategy Unacademy » JEE Study Material » Mathematics » Vector Equation of a line and a Plane
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Vector Equation of a line and a Plane

Vector equations are used to represent the equation of a line or a plane with the help of the variables x, y, and z in order to simplify the equation. The vector equation specifies where a line or a plane should be placed in a three-dimensional space using a mathematical formula.

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Vector equations are used to represent lines or planes in a three-dimensional framework, and they are also known as vector algebra. When considering a three-dimensional plane, three coordinates with respect to three axes are required, and here vectors are useful in representing the vector equation of a line or plane more easily than they would be otherwise. In a three-dimensional framework, the unit vector along the x-axis is denoted by the letter i∧ the unit vector along the y-axis is denoted by the letter j∧, and the unit vector along the z-axis is denoted by the letter k∧. The vector equations are written in the three-dimensional plane using the symbols i∧ j∧, and k∧, and they can be represented geometrically in the three-dimensional plane. The simplest form of the vector equation of a line is r→ = a + λb→, and the simplest form of the vector equation of a plane is r→. n∧ = d. The vector equation of a line is represented by the symbol r→.

Vector Equation of a Line: r→ = a + λb→

Vector Equation of a Plane:  r→. n∧ = d

In order to find the vector equations of a line, two methods are used, and four methods are used in order to find the vector equations of a plane.

Vector equation of a line

It is possible to compute vector equations for a line by using any two points on the line, or by using a point on the line and a parallel vector. The following are the two methods for forming a vector form of the equation of a line in vector form:

  • In mathematics, the vector equation of a line passing through a point and having a position vector a, while also being parallel to a vector line b, is denoted by the notation r→ = a + λb→ .
  • This is the vector equation of a line passing through two points with the position vector a and the position vector b: r→ = a→ + λ(b→ – a→).

Vector equation of a plane

The vector equation of a plane is a vector form of the equation of a plane in a cartesian coordinate system, and it can be computed using a variety of methods depending on the values of the plane that are available as inputs. The four different expressions for the equation of a plane in vector form are shown in the following list.

  • Normal Form: The equation of a plane located at a perpendicular distance d from the origin and having a unit normal vector n is denoted by the symbol R. The normal vector n equals the distance between the origin and the plane.
  • Through a point and perpendicular to a given Line, we have In the case of a plane that is perpendicular to one of the two given vectors N→ and passes through point a→, the equation is (r→₋a→).N→=0.
  • Through three non-collinear lines: It is equal to zero when a plane passes through three non-collinear points (e.g., a→, b→, and c→) is (r→₋a→) [ (b→₋a→) ×  ( c→₋a→)] =0.
  • The intersection of two planes: It is represented by the symbol When a plane passes through the intersection of two planes, r→.n∧1 = d1 and r→.n∧ = d2, the equation for the plane passing through the intersection is (r→.n∧1 + λn∧2) = d1 +λ d2.

Example:

1 Find the vector equation of the line that passes through the points (3, 5, -2), and that is parallel to the vectors 5 i∧ + j∧ + 4 k∧.

Solution  The given point is (3, 5, -2), and the given vector is (5 i∧ +  j∧ + 4k∧).

a = 3i∧ + 5j∧ – 2k∧ and b = 5i∧ + j∧ + 4k∧ are two ways to represent these functions, respectively.

The vector equation of a line passing through a point id a and parallel to a vector line b→ is given by r→ = a→ + λb→.

Conclusion:

Vector equations are used to represent the equation of a line or a plane with the help of the variables x, y, and z in order to simplify the equation. Vector equations are used to represent lines or planes in a three-dimensional framework, and they are also known as vector algebra. The vector equation specifies where a line or a plane should be placed in a three-dimensional space using a mathematical formula. 

In a three-dimensional framework, the unit vector along the x-axis is denoted by the letter I∧ the unit vector along the y-axis is denoted by the letter j∧, and the unit vector along the z-axis is denoted by the letter k∧.

In mathematics, the vector equation of a line passing through a point and having a position vector a, while also being parallel to a vector line b, is denoted by the notation r→ = a + λb→.

This is the vector equation of a line passing through two points with the position vector a and the position vector b: r→ = a→ + λ(b→ – a→).

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What is the vector equation of a plane in mathematical terms?

Ans : If you know the normal vector of a plane and a point pa...Read full

What is the vector equation of a line?

Ans : -\ This form of ...Read full

What is a vector formula, and how does it work?

Ans : Vector formulas are a collection of formulas that are ...Read full

What is the best way to find a vector that is parallel to a plane?

Ans : To find a vector parallel to the plane, we only need to...Read full

Ans : If you know the normal vector of a plane and a point passing through the plane, you can establish the equation of the plane as a (x – x1) + b (y – y1) + c (z –z1) = 0.

Ans : -\ This form of vector equation for a line is denoted by the symbol = 0 + t, in which zero is the position vector of a particular point on the line, the scalar parameter, is a vector that explains the direction of the line, and is the position vector of the point on the line that corresponds to the value of t are all denoted by the symbol = 0 + t.

 

Ans : Vector formulas are a collection of formulas that are useful for performing a large number of arithmetic operations on a single vector, as well as between two vectors. Scalars and vectors are both components of vectors, which means that the formulas for vectors can be used to perform a wide range of operations on vectors in a systematic and straightforward manner.

Ans : To find a vector parallel to the plane, we only need to find two points on the plane that are on the same side of the plane. Because these two points are on the plane, the vector v is also on the plane and, as a result, is parallel to the plane.

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  • Root mean square velocities
  • Fehling’s solution
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