Chapter-03
Scalar
“Scalar quantity are those physical quantity which are completely
specified by their magnitude express with suitable unit. They do not require
any mention of the direction for complete their specificaton is called scalar quantity.”
OR
” Scalar quantity are those physical quantity which require magnitude ,
express with suitable unit only is called scalar quantity.”
Characteristics Of Scalar Quantity
1, Scalar quantity
can be added,subtracted,multiplied,divided according to the ordinary algebraic
rule.
2, Two scalars are
equal if they have same unit.
Representation
It can be represented by the numbers with decimals. (positive
negative)
Example
Mass,Distance,Temperature,volume,speed e.t.c
Vector
“VECTOR quantity are those physical quantity which do not require only
their magnitude express with suitable unit. But they also require a particular
direction for complete their specificaton is called vector quantity.”
OR
” vector quantity are those physical quantity which require magnitude ,
express with suitable unit as well as proper direction is called vector
quantity.”
Characteristics Of Vector Quantity
1, vector quantity
can not be added,subtracted,multiplied, divided according to the ordinary
algebraic rule.
2, It can be
added,subtracted,multiplied,divided according to the some speciall rules like
head and tail rule,Graphical method e.t.c.
3, vector always
treats as positive.
Representation
It can be
represented by an arrow with headline. The length of an arrow represents its
magnitude and the headline represents the direction of the vector(figure 1.1)
————————————->
(figure 1.1)
(figure 1.1)
Example
Weight,Displacement,Velocity,Acceleraton,Torque,Momentum e.t.c
Addition Of A Vector
“The process of combining of two or more vector to produce a signal
vector having the combinig effect of all the vector is called the resultant of
the vector and this process is known as the addition of a vector”.
Head And Tail Rule
Suppose we have two
vector A and B having the different magnitude and direction.
1, First of all
chose a suitable scale and representation of all the vector have been drawn on
the paper.
2, Put all the
vector for finding the resultant of given vector such that the head of the
first vector join the tail of the second vector.
3, Now join the
tail of the first vector with tail of the second vector such that it join the
two vector with head to head and tail to tail by another.
4, The new vector R
will be the resultant of the given vector.
5, It can be
measured by the Dee or any suitable mean.This method is called the head and
tail or tip to tail rule.
/\/\
/ |
/ |
/ |
/ |
R / | B
/ |
/ |
/ |
/ |
/———->
/ |
/ |
/ |
/ |
R / | B
/ |
/ |
/ |
/ |
/———->
Resolution Of A Vector
“The process of splitting up of a signal vector into two or more vector
is called the resolution of a vector”
OR
“The process of splitting up of a signal vector into its components is
called the resolution of a vector”
Rectangular Components
A vector which is not along x-axis or y-axis it can be resolved into infinite number, but generally a vector can be resolved into its components at a right angle to each other
MATHEMATICALLY PROVED: Suppose a vector F is denoted by a
line AB which makes an angle @ with horizontal surface OX. From a point A draw
perpendicular to the horizontal surface OX.
A
/\/\
/ |
/ |
/ |
/ |
F / | B Fy
/ |
/ |
/ |
/ @ | B
O /————> X
Fx
/\/\
/ |
/ |
/ |
/ |
F / | B Fy
/ |
/ |
/ |
/ @ | B
O /————> X
Fx
The line AB represents its vertical
component and it is denoted by Fy.The line OB represents its horizontal
component and it is denoted by Fx. Now in the triangle AOB
Sin@= AB/OA {sin@=
Perpendicular/Hypotonuse}
or sin@= Fy/F
or Fy= Fsin@
Similarly
Cos@= OB/OA {sin@= Base/Hypotonus}
or Cos@= Fx/F
or Fx= FCos@
For the triangle
Tan@= AB/OB {Tan@= per/hyp)
or Tan@= Fy/Fx
or @=Tan-1 =Fy/Fx
Subtraction Of A Vector
“It is defined as the Addition of A to the negative of a B is
called the subtraction of a vector (A-B)”
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