, &
Q101/16
20 min /I problems
Content :
3 dim coord system (distance , Sphere
Vectors
Dot products
3 dim coordinate
system
I
Geometry Equation ,
coordinate ,
algebra
Point S
- (a b c)
, ,
on R3 (9 , b) on R2
Schere c) (y b) (z c)
2
- (x -
+ -
+ -
= ru
Center : (a, b , c)
Radius : r
E g
.
.
S (-1) y2
: + + z = 1 smallest distance A and
A 13 0 0
:
, ,
a point on Sphere S
i J
↑
(3 0 0 find distance between
S
,
center of S and A
,
↳
subtract radius
,Vectors :
directed line segment AB
terminal &
-B
point
"D
Magnitude (length) AB of
=
/A/
A
S
C
·
Two vectors AB & D
initial
point
are equal if they have same length and
direction
"Vector the standard position
"
-
in
initial point at origin
↳
-
"Component form"
i 0 = with 0 10 0 01 and lab, c) =
, ,
=
then the component form of < a b c > =
, ,
-
Eg
. .
#B =? component form ofis
↑ (1 2 3) B(2 3 4)
, , AB , ,
= <7 - 1 , 3-2 4-33
,
= [1 , 1 , 13
product
Not (Requires ICTORS] 7
i
= I/II COSE > & O-& T
i
-.
Mis
=
scalar NOT vector
distance
Why ?
& Properties : lik = T i
:
lulose i (i) =
T+ .
, The that
Projections
of in ontois parala
:
projection a vector is
B
F ProjB Projec
-
U = =
ii
F
3
D
component of i
IProjc) =
iCOSE Since Project has same direction
scar as i
Proje =
-Vector
Inos
=
= (i) =
More properties of dot product :
① (1 =
3 (l =
2 ② Dot product o
Can = 7 ? NO = I
= III cose
..
-
III
Q101/16
20 min /I problems
Content :
3 dim coord system (distance , Sphere
Vectors
Dot products
3 dim coordinate
system
I
Geometry Equation ,
coordinate ,
algebra
Point S
- (a b c)
, ,
on R3 (9 , b) on R2
Schere c) (y b) (z c)
2
- (x -
+ -
+ -
= ru
Center : (a, b , c)
Radius : r
E g
.
.
S (-1) y2
: + + z = 1 smallest distance A and
A 13 0 0
:
, ,
a point on Sphere S
i J
↑
(3 0 0 find distance between
S
,
center of S and A
,
↳
subtract radius
,Vectors :
directed line segment AB
terminal &
-B
point
"D
Magnitude (length) AB of
=
/A/
A
S
C
·
Two vectors AB & D
initial
point
are equal if they have same length and
direction
"Vector the standard position
"
-
in
initial point at origin
↳
-
"Component form"
i 0 = with 0 10 0 01 and lab, c) =
, ,
=
then the component form of < a b c > =
, ,
-
Eg
. .
#B =? component form ofis
↑ (1 2 3) B(2 3 4)
, , AB , ,
= <7 - 1 , 3-2 4-33
,
= [1 , 1 , 13
product
Not (Requires ICTORS] 7
i
= I/II COSE > & O-& T
i
-.
Mis
=
scalar NOT vector
distance
Why ?
& Properties : lik = T i
:
lulose i (i) =
T+ .
, The that
Projections
of in ontois parala
:
projection a vector is
B
F ProjB Projec
-
U = =
ii
F
3
D
component of i
IProjc) =
iCOSE Since Project has same direction
scar as i
Proje =
-Vector
Inos
=
= (i) =
More properties of dot product :
① (1 =
3 (l =
2 ② Dot product o
Can = 7 ? NO = I
= III cose
..
-
III
