As she picks up her riders, a bus driver traverses four successive displacements represented by the expression (–6.30 b) i ^ – (4.00 b cos 40°) i ^ – (4.00 b sin 40°) j ^ + (3.00 b cos 50°) i ^ – (3.00 b sin 50°) j ^ – (5.00 b) j ^ Here b represents one city block, a convenient unit of distance of uniform size; i ^ is east; and j ^ is north. The displacements at 40° and 50° represent travel on roadways in the city that are at these angles to the main east-west and north-south streets, (a) Draw a map of the successive displacements, (b) What total distance did she travel? (c) Compute the magnitude and direction of her total displacement. The logical structure of this problem and of several problems in later chapters was suggested by Alan Van Heuvelen and David Maloney, American Journal of Physics 67(3) 252-256, March 1999.
As she picks up her riders, a bus driver traverses four successive displacements represented by the expression (–6.30 b) i ^ – (4.00 b cos 40°) i ^ – (4.00 b sin 40°) j ^ + (3.00 b cos 50°) i ^ – (3.00 b sin 50°) j ^ – (5.00 b) j ^ Here b represents one city block, a convenient unit of distance of uniform size; i ^ is east; and j ^ is north. The displacements at 40° and 50° represent travel on roadways in the city that are at these angles to the main east-west and north-south streets, (a) Draw a map of the successive displacements, (b) What total distance did she travel? (c) Compute the magnitude and direction of her total displacement. The logical structure of this problem and of several problems in later chapters was suggested by Alan Van Heuvelen and David Maloney, American Journal of Physics 67(3) 252-256, March 1999.
Solution Summary: The diagram for given condition is shown below. The distance between the origin and the Cartesian coordinates is 2.23m
As she picks up her riders, a bus driver traverses four successive displacements represented by the expression
(–6.30 b)
i
^
– (4.00 b cos 40°)
i
^
– (4.00 b sin 40°)
j
^
+ (3.00 b cos 50°)
i
^
– (3.00 b sin 50°)
j
^
– (5.00 b)
j
^
Here b represents one city block, a convenient unit of distance of uniform size;
i
^
is east; and
j
^
is north. The displacements at 40° and 50° represent travel on roadways in the city that are at these angles to the main east-west and north-south streets, (a) Draw a map of the successive displacements, (b) What total distance did she travel? (c) Compute the magnitude and direction of her total displacement. The logical structure of this problem and of several problems in later chapters was suggested by Alan Van Heuvelen and David Maloney, American Journal of Physics 67(3) 252-256, March 1999.
Given the displacement vectors A (2.00 -9.00j+ 5.00 k) m and B= (4.00 1 + 9.00 -4.00 k) m, find the magnitudes of the following vectors and express each in
m
terms of its rectangular components.
(a) C-A+B
IC) =
2-(
atu tu
(b) D-2A-B
IDI
m
1+
m
j+
3+
m
Given the displacement vectors A = (4.00 î - 8.00 j + 5.00 k) m and B = (1.00 î + 9.00 j – 6.00 k) m, find the magnitudes of the following vectors and express each in terms of its rectangular components.
(a) C = Ã +B
iC =
C = (
m
k) m
(b) D = 2Ã -B
DI =
D = |
m
k) m
What is the sum of the following four vectors in unit vector notation and as a magnitude and angle?
A= (3.00 m) i+(5.00 m) j B:3.00 m, at +178.0°
C= (4.00 m) i+(−2.00 m) j D:4.00 m, at −28.0°
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