class 12th math ka Three Dimensions Geometry ka introduction
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Any idea what does Geometry mean? This word is actually derived from the Greek word ‘geometron’. Here, ‘geometron’ is actually made of two words – Geo and Metron. So geometry is the mathematical study of all shapes and figures. In this following chapter let us study in detail about three dimensional geometry.
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MathsMath ArticleThree Dimensional Geometry For Class 12
Three Dimensional Geometry For Class 12
Three Dimensional Geometry for class 12 covers few of the most important topics such as direction cosine and direction ratios of a line joining two points and also discusses the equation of lines and planes in space under different condition, the angle between line and plane, between two lines etc. You need to practice many Three Dimensional Geometry questions to understand the topic better, based on the formulas as well.
In real-world, almost all the objects are in a three-dimensional shape. To understand the different types of shapes and figures, this topic has been introduced in Maths. For example, there are many objects at home such as a table, chair, bed, kitchen utensils, etc. which have 3D geometry. In our primary classes, we have learned the basics of three-dimension geometry, but in 12th standard, we will learn the advanced version of it.
Three-dimensional Geometry
Equation of Plane in 3 Dimensional Space
Important Questions Class 12 Maths Chapter 11 Three Dimensional Geometry
Direction Cosine and Direction Ratios of a line
Consider a line L passing through origin makes an angle of α, β, γ with x, y, and z-axes respectively, then the cosine of these angles is the direction cosine of the directed line L.
Any three numbers which are proportional to the direction cosines of a line are called the direction ratios of the line. Consider the direction cosine of line L be l, m, n and direction ratio a, b, c then a = λl, b = λm, c = λn, for non-zero λ ∈ R.
la=mb=nc=k
Then the direction cosine are:
l=±aa2+b2+c2, m=±ba2+b2+c2, n=±ca2+b2+c2
Note: If the given line in space does not pass through the origin, then, in order to find its direction cosines, we draw a line through the origin and parallel to the given line. Now take one of the directed lines from the origin and find its direction cosines as two parallel line have same set of direction cosines.
Three Dimensional Geometry Formulas
Let us discuss some important formulas of three-dimensional geometry, based on which we will solve problems.
Relation between the direction cosines of a line
For a given line RS with direction cosines l, m, n, the relation between the direction cosines of a line RS is given by;
l2 + m2 + n2 = 1
Direction cosines of a line passing through two points
The direction cosines of the line segment joining the points P(x1, y1, z1) and Q(x2, y2, z2) are:
x2-x1/PQ, y2-y1/PQ, z2-z1/PQ
where PQ = √[(x2-x1)2+(y2-y1)2+(z2-z1)2]