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ANGLE BETWEEN TWO LINES | 3-DIMENSIONAL
GEOMETRY | NCERT CLASS 12 MATHS
In accordance with NCERT Class 12 Maths, 3D geometry alludes to the mathematics of
shapes in three-dimensional space and comprises of 3 coordinates. These 3 coordinates are
x-coordinate, y-coordinate, and z-coordinate. In three-dimensional space, there is a
necessity of three parameters to locate the specific area of a point. Dimension, in like
manner speech, signifies the proportion of an item's size, for example, a box, generally
given as height, length, and breadth. In geometry, the thought of dimension is an
augmentation of the possibility that a line speaks to one-dimensional, a plane happens to
be two-dimensional, and space is three-dimensional.
The arrangement of a three-dimensional Cartesian coordinate system is referred to as the
origin just as a premise including three mutually perpendicular vectors with respect to
NCERT Class 12 Maths. These vectors appropriately clarify the three coordinate axes which
are: the x-, y-, and z-axis. Specialists additionally call them as abscissa, ordinate and
applicate pivot, separately.
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ANGLE BETWEEN TWO LINES
According to NCERT Class 12 Maths, Angle between two lines alludes to the angle between
two intersecting lines. This is because the angle between the two perpendicular lines is 90°
and that angle between two parallel lines will be 0°. Thus, we will presently take a gander
at how the angle between two lines is determined.
CARTESIAN FORM
Let ܮ and ܮ be two lines passing through the origin and with direction ratios
ଵ ଶ
ܽ ,ܾ ,ܿ andܽ ,ܾ ,ܿ , respectively. Let P be a point on ܮ and Q be a point onܮ . Consider the
ଵ ଵ ଵ ଶ ଶ ଶ ଵ ଶ
directed lines OP and OQ as given in the following figure. Let θ be the acute angle between
OP and OQ. Now recall that the directed line segments OP and OQ are vectors with
components ܽ ,ܾ ,ܿ and ܽ ,ܾ ,ܿ , respectively. Therefore, the angle between two lines
ଵ ଵ ଵ ଶ ଶ ଶ
formula is given by:
ANGLE BETWEEN TWO LINES FORMULA:
ࢇ ࢇ +࢈ ࢈ +ࢉ ࢉ
ተ ተ
ࣂ=
ተ ተ
܋ܗܛ
ටࢇ +࢈ +ࢉ ටࢇ +࢈ +ࢉ
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Here, equations of the two lines are of form:
ܠ−ܠ ܡ−ܡ ܢ−ܢ
= =
܉ ܊ ܋
ܠ−ܠ ܡ−ܡ ܢ−ܢ
= =
܉ ܊ ܋
VECTOR FORM
ሬሬሬ⃗ ሬሬሬሬ⃗
Let the equations of two lines be ݎ⃗ = ܽሬሬሬሬ⃗ + ߣܾ and ݎ⃗ = ܽሬሬሬሬ⃗ + ߣܾ such that ߠ denotes angle
between the two lines. ଵ ଵ ଶ ଶ
Then, Angle between two lines formula will be:
࢈ ⋅࢈
܋ܗܛࣂ = ฬ ฬ
ሬሬሬሬ⃗ ሬሬሬሬ⃗
ห࢈ หห࢈ ห
VECTOR AND CARTESIAN EQUATIONS OF A LINE
ሬሬሬ⃗ ሬ⃗
1. Equation of a line through a given point and parallel to a given vector ܾ is given by
ሬ⃗
ݎ⃗ = ܽ⃗ + ߣܾ where ߣ denotes any parameter.
In Cartesian Form:
( )
Let the coordinates of the given point A be ݔ ,ݕ ,ݖ and the direction ratios of the line are
ଵ ଵ ଵ
a, b, c. Consider the coordinates of any point P be (x, y, z). Then the Cartesian Equation of a
line is
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ܠିܠ = ܡିܡ = ܢିܢ
܉ ܊ ܋
2. Equation of a line passing through two given points:
ሬ⃗
Therefore, ݎ⃗ = ܽ⃗ + ߣ(ܾ − ܽ⃗).
In Cartesian Form, the Cartesian Equation will be:
࢞ି࢞ = ࢟ି࢟ = ࢠିࢠ
࢞ି࢞ ࢟ି࢟ ࢠିࢠ
IMPORTANT FORMULAE OF 3-DIMENSIONAL GEOMETRY WITH RESPECT
TO NCERT CLASS 12 MATHS
1. If ܽ, ܾ,ܿ denote direction ratios of line then direction cosines are:
ܔ = ± ܉ , ܕ = ± ܊ , ܖ = ± ܋
√ √ √
܉ +܊ +܋ ܉ +܊ +܋ ܉ +܊ +܋
2. If ݈, ݉, ݊ denote direction ratios of the line then ݈ଶ + ݉ଶ + ݊ଶ = 1
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