* Vector is the quantity which has * Vector is the quantity which has magnitude and direction magnitude and direction *Vector is symbolyzed by the shape of an *Vector is symbolyzed by the shape of an arrow arrow *Vector can be added, subtracted *Vector can be added, subtracted and multiplied and multiplied Head / end point Tail / initial point
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* Vector is the quantity which has magnitude and * Vector is the quantity which has magnitude and directiondirection*Vector is symbolyzed by the shape of an arrow*Vector is symbolyzed by the shape of an arrow
*Vector can be added, subtracted and *Vector can be added, subtracted and multipliedmultiplied
1. Make the 1. Make the parallelogram shape parallelogram shape by draw the vectors by draw the vectors again in same size again in same size and directionand direction
A
B
PARALLELOGRAM METHODPARALLELOGRAM METHOD
1. Make the 1. Make the parallelogram shape parallelogram shape by draw the vectors by draw the vectors again in same size again in same size and directionand direction
A
B
PARALLELOGRAM METHODPARALLELOGRAM METHOD
1. Make the 1. Make the parallelogram shape parallelogram shape by draw the vectors by draw the vectors again in same size again in same size and directionand direction
A
B
PARALLELOGRAM METHODPARALLELOGRAM METHOD
1. Make the 1. Make the parallelogram shape parallelogram shape by draw the vectors by draw the vectors again in same size again in same size and directionand direction
2.The vector sum is 2.The vector sum is the line that connect the line that connect the central point to the central point to the its front cornerthe its front corner
A
B
R
COSINE METHODCOSINE METHOD
1. The vector sum is 1. The vector sum is
R= R= √ A√ A22 + B + B22 + 2AB cos + 2AB cos αα
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B
αα
COSINE METHODCOSINE METHOD
1. The vector sum is 1. The vector sum is
R= R= √ A√ A22 + B + B22 + 2AB cos + 2AB cos αα
2. The direction is 2. The direction is
Sin Sin ββ = A . Sin = A . Sin αα / R / R
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B
αα ββ
R
POLYGON METHODPOLYGON METHOD(for more than 2 vectors)(for more than 2 vectors)
1.Connect all the 1.Connect all the vectors orderly from vectors orderly from initialpoint to endpoint initialpoint to endpoint of each vectorof each vector A
B
C
POLYGON METHODPOLYGON METHOD(for more than 2 vector)(for more than 2 vector)
1.Connect all the 1.Connect all the vectors orderly from vectors orderly from initialpoint to endpoint initialpoint to endpoint of each vectorof each vector A
BC
POLYGON METHODPOLYGON METHOD(for more than 2 vector)(for more than 2 vector)
1.Connect all the 1.Connect all the vectors orderly from vectors orderly from initialpoint to endpoint initialpoint to endpoint of each vectorof each vector A
B
C
POLYGON METHODPOLYGON METHOD(for more than 2 vector)(for more than 2 vector)
1.Connect all the 1.Connect all the vectors orderly from vectors orderly from initialpoint to endpoint initialpoint to endpoint of each vectorof each vector
2. The resultant is the 2. The resultant is the line that connecting line that connecting from initialpoint to from initialpoint to endpointendpoint
A
B
C
R
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectorsvectors
A
B
C
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectors at cartesian’s vectors at cartesian’s coordinatecoordinate A
B
C
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectors at cartesian’s vectors at cartesian’s coordinatecoordinate
A
B
C
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectors at cartesian’s vectors at cartesian’s coordinatecoordinate
A
B
C
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectors at cartesian’s vectors at cartesian’s coordinatecoordinate
A
B
C
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectors at cartesian’s vectors at cartesian’s coordinatecoordinate
2. Find the component 2. Find the component along the x and y axisalong the x and y axis
A
B
C
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectors at cartesian’s vectors at cartesian’s coordinatecoordinate
2. Find the component 2. Find the component along the x and y axisalong the x and y axis
A
B
C
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectors at cartesian’s vectors at cartesian’s coordinatecoordinate
2. Find the component 2. Find the component along the x and y axisalong the x and y axis
A
B
C
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectors at cartesian’s vectors at cartesian’s coordinatecoordinate
2. Find the component 2. Find the component along the x and y axisalong the x and y axis
A
B
C
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectors at cartesian’s vectors at cartesian’s coordinatecoordinate
2. Find the component 2. Find the component along the x and y axisalong the x and y axis
A
B
C
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectors at cartesian’s vectors at cartesian’s coordinatecoordinate
2. Find the component 2. Find the component along the x and y axisalong the x and y axis
A
B
C
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectors at cartesian’s vectors at cartesian’s coordinatecoordinate
2. Find the component 2. Find the component along the x and y axisalong the x and y axis
A
B
C
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectors at cartesian’s vectors at cartesian’s coordinatecoordinate
2. Find the component 2. Find the component along the x and y axisalong the x and y axis
(you can neglect the (you can neglect the vector)vector)
A
B
C
ANALYTIC METHODANALYTIC METHOD
1.Connect all the 1.Connect all the initialpoint of the initialpoint of the vectors at cartesian’s vectors at cartesian’s coordinatecoordinate
2. Find the component 2. Find the component along the x and y axisalong the x and y axis
(you can neglect the (you can neglect the vector)vector)
ANALYTIC METHODANALYTIC METHOD
3. Use the table to find 3. Use the table to find the resultant of each the resultant of each axisaxis
X-AXISX-AXIS Y-AXISY-AXIS
AA AXAX AYAY
BB BXBX -BY-BY
CC -CX-CX CYCY
RR RRXX RRYY
A
B
C
ANALYTIC METHODANALYTIC METHOD
X-AXISX-AXIS Y-AXISY-AXIS
AA AAXX AAYY
BB BBXX -B-BYY
CC -C-CXX CCYY
RR RRXX RRYY
4. Based on R4. Based on RX X andand RRYY calculate the vector sum calculate the vector sum
using formula: R = using formula: R = √ √ RRX X 22
++ RRYY22
the resultant’s direction is: Tg the resultant’s direction is: Tg αα = = RRY Y / R/ RXX
PRACTICEPRACTICE
Find the vector resultant of these vectors Find the vector resultant of these vectors using polygon and analytic methods. using polygon and analytic methods. F1+F2+F3 = …F1+F2+F3 = …