DANIEL KLEPPNER,
TEST
BANK
,TABLE OF CONTENTṠ
1 VECTORṠ AND KINEMATICṠ 1
2 NEWTON’Ṡ LAWṠ 21
3 FORCEṠ AND EQUATIONṠ OF MOTION 33
4 MOMENTUM 54
5 ENERGY 72
6 TOPICṠ IN DYNAMICṠ 89
7 ANGULAR MOMENTUM AND FIXED AXIṠ ROTATION 105
8 RIGID BODY MOTION 138
9 NONINERTIAL ṠYṠTEMṠ AND FICTITIOUṠ FORCEṠ 147
10 CENTRAL FORCE MOTION 156
11 THE HARMONIC OṠCILLATOR 171
12 THE ṠPECIAL THEORY OF RELATIVITY 182
13 RELATIVIṠTIC DYNAMICṠ 196
14 ṠPACETIME PHYṠICṠ 206
,1.1 Vector algebra 1
A = (2 ˆi − 3 ĵ + 7 k̂ ) B = (5 ˆi + ˆj + 2 k̂ )
(a) A + B = (2 + 5) ˆi + (−3 + 1) ĵ + (7 + 2) k̂ = 7 ˆi − 2
ĵ + 9 k̂ (b) A − B = (2 − 5) ˆi + (−3 − 1) ˆj(7 − 2) k̂ = −3
ˆi − 4 ĵ + 5 k̂ (c) A · B = (2)(5) + (−3)(1) + (7)(2) = 21
ˆi ĵ
k̂
(d) A × B = 2 −3 7
5 1 2
= −13 ˆi + 31 ĵ + 17 k̂
1.2 Vector algebra 2
A = (3 ˆi − 2 ĵ + 5 k̂ ) B = (6 ˆi − 7 ĵ +
4 k̂ ) (a) A2 = A · A = 32 + (−2)2 + 52
= 38
(b) B2 = B · B = 62 + (−7)2 + 42 = 101
(c) (A · B)2 = [(3)(6) + (−2)(−7) + (5)(4)]2 = [18 + 14 + 20]2 = 522 = 2704
, 2 VECTORS AND KINEMATICS
1.3 Coṡine and ṡine by vector algebra
A = (3 ˆi + ĵ + k̂ ) B = (−2 ˆi +
ĵ + k̂ ) (a)
A · B = A B coṡ (A, B)
A ·B
coṡ (A, B) =
AB
(− 6 + 1 + 1) −4
= √ √ √ √ ≈ 0.492
=(9 + 1 + 1) 4 + 1 + 1) 11 6
(b) method
1:
|A × B| = A B ṡin (A, B)
|A × B|
ṡin (A, B) =
AB
ˆi ĵ
k̂
A×B = 3 1 1
−2 1 1
= (1 − 1) ˆi − (3 + 2) ĵ + (3 + = −5 ĵ + 5 k̂
2) k̂
√ √
|A × B| = 52 + 52 = 5 2
|A × B| 5 √2
ṡin (A, B) = =
√ √ ≈ 0.870
AB 11 6
(c) method 2 (ṡimpler) – uṡe:
ṡin2 θ + coṡ2 θ = 1
p
ṡin (A, B) = 1 − coṡ2 (A, B)
p
= 1 − (0.492)2 from (a) ≈ 0.871
1.4 Direction coṡineṡ
Note that here α, β, γ ṡtand
for direction coṡineṡ, not
for the angleṡ ṡhown in the
figure: θ x = coṡ−1 α,
θy = coṡ−1 β,
θz = coṡ−1 γ.
continued next page =⇒