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Chapter 2 sequencess and series
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Chapter 2 sequencess and series
1.
FULLY WORKED SOLUTIONS 2 CHAPTER Focus
STPM 2 ACE AHEAD Mathematics (T) First Term Second Edition © Oxford Fajar Sdn. Bhd. 2015 1 SEQUENCES AND SERIES 1 u13 = 3, S13 = 234 a + 12d = 3 13 2 (a + u13 ) = 234 a = 3 – 12d ... 1 13 2 (a + 3) = 234 ... 2 From 2 , a = 33 When a = 33, 33 = 3 – 12d ⇒ d = – 5 2 S25 = 25 2 3(2)(33) + (24)1– 5 224 = 25 2 (66 – 60) = 75 2 (a) a = 1, r = 5 4 Sn = a(rn – 1) r – 1 = 15 42 n – 1 15 4 – 12 = 4315 42 n – 14 (b) Sn > 20 4315 42 n – 14 > 20 15 42 n – 1 > 5 15 42 n > 6 n lg 5 4 > lg 6 n > 8.03 The least number of terms is 9. 3 312 – 22 4 + 332 – 42 4 + … + 3(2n – 1)2 – (2n)2 4 = –3 – 7 – 11… a = –3, d = – 4 Sn = n 2 3–6 + (n – 1)(– 4)4 = n 2 (–6 – 4n + 4) = n 2 (– 4n – 2) = –n(2n + 1) [Shown] (a) 12 – 22 + 32 – 42 + … + (2n – 1)2 – (2n)2 + (2n + 1)2 = –n(2n + 1) + (2n + 1)2 = (2n + 1)(–n + 2n + 1) = (2n + 1)(n + 1) (b) 212 – 222 + 232 – 242 + … + 392 – 402 = (12 – 22 + 32 – 42 + … + 392 – 402 ) – (12 – 22 + 32 – 42 + … + 192 – 202 ) = S20 – S10 = –20(2(20) + 1) – [–10(2(10) + 1)] = –820 – (–210) = –610 4 d = 2 un = a + (n – 1)(2) = a + 2n – 2 When n = 20, u20 = a + 2(20) – 2 = a + 38 S20 = 1120 20 2 (a + u20 ) = 1120 10(a + a + 38) = 1120 2a = 74 a = 37 u20 = a + 38 = 37 + 38 = 75 5 (a) a = 3, d = 4, Sn = 820 Sn = n 2 [2a + (n – 1)d ] 820 = n 2 (6 + 4n – 4) 1640 = n(2 + 4n) n(1 + 2n) = 820 n + 2n2 – 820 = 0 (2n + 41)(n – 20) = 0 n = 20 since n = – 41 2 is not a solution. T20 = 3 + 19(4) = 79 Chapter 2.indd 1 6/24/2015 5:36:59 PM
2.
2 ACE AHEAD
Mathematics (T) First Term Second Edition © Oxford Fajar Sdn. Bhd. 2015 (b) Since they form an A.P., (p2 + q2 )2 – (p2 – 2pq – q2 )2 = (p2 + 2pq – q2 )2 – (p2 + q2 )2 (p2 + q2 – p2 – 2pq – q2 )(p2 + q2 – p2 + 2pq + q2 ) = (p2 + 2pq + q2 + p2 + q2 )(p2 + 2pq – q2 – p2 – q2 ) (2p2 – 2pq)(2q2 + 2pq) = (2p2 + 2pq) (2pq – 2q2 ) 4pq(p – q)(q + p) = 4pq(p + q)(p – q) LHS = RHS [Shown] 6 (a) Sn = pn + qn2 , S8 = 20, S13 = 39 (i) S8 = 8p + 64q 8p = 20 – 64q p = 5 2 – 8q … 1 S13 = 39 13p + 169q = 39 … 2 Substitute 1 into 2 , 1315 2 – 8q2 + 169q = 39 65 2 – 104q + 169q = 39 65q = 13 2 q = 1 10 p = 5 2 – 811 102 = 17 10 (ii) un = Sn – Sn – 1 = pn + qn2 – [p(n – 1) + q(n – 1)2 ] = p(n – n + 1) + q[n2 – (n – 1)2 ] = p + q[(n + n – 1)(n – n + 1)] = p + q(2n – 1)(1) = 17 10 + 1 10 (2n – 1) = 17 10 + n 5 – 1 10 = 8 + n 5 (iii) To show that it is an A.P., un = 1 5 (8 + n) un – 1 = 1 5 [8 + (n – 1)] = 1 5 (7 + n) un – un – 1 = 1 5 ⇒ Series is an A.P. with d = 1 5 = 0.2. 7 If J, K, M is a G.P., then K J = M K K 2 = MJ … 1 (ar k – 1 )2 = (ar m – 1 ) (ar j – 1 ) r2k – 2 = rm – 1 + j – 1 2k – 2 = m + j – 2 k + k = m + j k – m = j – k … 2 and 2k = m + j … 3 (k – m)lg J + (m – j)lg K + ( j – k)lg M = lg J k – m + lg Km – j + lg M j – k = lg J j – k + lg Km – j + lg M j – k [from 2 ] = ( j – k)(lg J + lg M) + lg K m – j = ( j – k)lg JM + lg K m – j = ( j – k)lg K2 + (m – j)lg K = 2( j – k)lg K + (m – j)lg K = (2j – 2k + m – j)lg K = ( j + m – 2k)lg K = (2k – 2k)lg K [from 3 ] = 0 [Proven] 8 (a) A.P., a = 200, d = 400 T a n d n n n = + −( ) = + − = + 1 2000 1 400 400 1600 ( )( ) = +400( 4)n (b) S n a l n n n n n = + = + +[ ] = + 2 2 2000 400 1600 2 400 3600 ( ) ( ) = +200 ( 9)n n (c) Sn 200 000 200n(n + 9) 200 000 n2 + 9n – 1000 0 n –36.44135, n 27.44135 ∴ n = 28 Chapter 2.indd 2 6/24/2015 5:37:02 PM
3.
ACE AHEAD Mathematics
(T) First Term Second Edition © Oxford Fajar Sdn. Bhd. 2015 3 9 S5 = 44, a(1 – r5 ) 1 – r = 44 … 1 S10 – S5 = – 11 8 a(1 – r10 ) 1 – r – a(1 – r5 ) 1 – r = – 11 8 a(1 + r5 )(1 – r5 ) 1 – r – a(1 – r5 ) 1 – r = – 11 8 … 2 a(1 – r5 ) 1 – r (1 + r5 – 1) = – 11 8 Substitute 1 into 2 , 44(r5 ) = – 11 8 r5 = – 1 32 r = – 1 2 [Shown] a31 – 1– 1 22 5 4 1 – 1– 1 22 = 44 a11 + 1 322 = 66 a = 64 Sn = a 1 – r = 64 1 – 1– 1 22 = 422 3 10 (a) r = 3 – 1 3 + 1 × 3 – 1 3 – 1 = 3 – 2 3 + 1 3 – 1 = 2 – 3 u3 = u2 r = ( 3 – 1)(2 – 3) = 2 3 – 3 – 2 + 3 = 3 3 – 5 u4 = u3 r = (3 3 – 5)(2 – 3) = 6 3 – 3(3) – 10 + 5 3 = 11 3 – 19 (b) r = 2 – 3 [ 1] S∞ = a 1 – r = 3 + 1 1 – (2 – 3 ) = 3 + 1 3 – 1 × 3 + 1 3 + 1 = 3 + 2 3 + 1 2 = 2 + 3 11 (a) S6 S3 = 7 8 , u2 = – 4 8S6 = 7S3 … 1 ar = – 4 a = – 4 r … 2 83a(1 – r6 ) 1 – r 4 = 73a(1 – r3 ) 1 – r 4 8(1 – r6 ) = 7(1 – r3 ) 8 – 8r6 = 7 – 7r3 8r6 – 7r3 – 1 = 0 (r3 – 1)(8r3 + 1) = 0 r3 = 1 or – 1 8 r = – 1 2 since r = 1 is not a solution. a = – 4 1– 1 22 = 8 (b) r = 8 5 × 1 2 = 4 5 , a = 2 Sn 9.9 a(1 – rn ) 1 – r 9.9 231 – 14 52 n 4 11 52 9.9 1 – 14 52 n 0.99 14 52 n 0.01 n lg 4 5 lg (0.01) n 20.64 The least number of terms is 21. 12 u3 = S2 ar2 = a(1 – r2 ) 1 – r ar2 (1 – r) = a(1 + r)(1 – r) ar2 = a(1 + r) r2 – r – 1 = 0 r = –(–1) ± (–1)2 – 4(1)(–1) 2 = 1 ± 5 2 a = 2 When r = 1 + 5 2 [|r| 1], S∞ doesn’t exist When r = 1 – 5 2 [|r| 1], Chapter 2.indd 3 6/24/2015 5:37:04 PM
4.
4 ACE AHEAD
Mathematics (T) First Term Second Edition © Oxford Fajar Sdn. Bhd. 2015 S∞ = a 1 – r = 2 1 – 1 – 5 2 = 2 12 – 1 + 5 2 2 = 4 1 + 5 × 1 – 5 1 – 5 = 4 – 4 5 1 – 5 = 5 – 1 13 a = 3, r = 0.4 (a) un 0.02 ar n – 1 0.02 3(0.4)n – 1 0.02 (0.4)n – 1 1 150 (n – 1)lg 0.4 lg 1 150 n – 1 5.47 n 6.47 The least number of terms is 7. (b) S∞ – Sn 0.01 a 1 – r – a(1 – rn ) 1 – r 0.01 a 1 – r (1 – 1 + r n ) 0.01 3 0.6 (r n ) 0.01 0.4n 2 × 10–3 n lg 0.4 lg (2 × 10–3 ) n 6.78 The least number of terms is 7. 14 Sn = a + ar + ar 2 + … + ar n – 2 + ar n – 1 … 1 rSn = ar + ar 2 + … + ar n – 2 + ar n – 1 + ar n … 2 1 – 2 , Sn – rSn = a – ar n Sn (1 – r) = a(1 – r n ) Sn = a(1 – r n ) 1 – r [Shown] For S∞ to exist, |r| 1, lim Sn = S∞ = a(1 – r ∞) 1 – r = a 1 – rn → ∞ S∞ – Sn S∞ = a 1 – r – a(1 – rn ) 1 – r a 1 – r = a 1 – r [1 – (1 – rn )] a 1 – r = rn [Shown] (a) u4 = 18, u7 = 16 3 ar3 = 18 … 1 ar6 = 16 3 … 2 2 1 , r3 = 116 3 2 × 1 18 r3 = 18 272 r = 12 32 a12 32 3 = 18 a = 243 4 S∞ = 1243 4 2 1 – 2 3 = 729 4 (b) S∞ – Sn S∞ 0.001 rn 0.001 12 32 n 0.001 n lg 2 3 lg 0.001 n 17.04 The least value of n is 18. 15 2r – 1 r(r – 1) – 2r + 1 r(r + 1) = (r + 1)(2r – 1) – (2r + 1)(r – 1) r(r – 1)(r + 1) = 2r2 – r + 2r – 1 – 2r2 + 2r – r + 1 r(r – 1)(r + 1) = 2r r(r – 1)(r + 1) = 2 (r – 1)(r + 1) [Verified] Σr = 2 n 2 (r – 1)(r + 1) = Σr = 2 n 3 2r – 1 r(r – 1) – 2r + 1 r(r + 1)4 Chapter 2.indd 4 6/24/2015 5:37:06 PM
5.
ACE AHEAD Mathematics
(T) First Term Second Edition © Oxford Fajar Sdn. Bhd. 2015 5 = Σr = 2 n [ f (r) – f (r + 1)] 3f (r) = 2r – 1 r(r – 1)4 = f (2) – f (n + 1) = 3 2 – 2n + 1 n(n + 1) [Proven] 1 2 Σr = 2 ∞ 2 (r – 1)(r + 1) = 1 2 lim 33 2 – 2n + 1 n(n + 1)4n → ∞ = 1 2 lim 33 2 – 2 n + 1 n2 1 + 1 n 4n → ∞ = 1 2 13 2 – 02 = 3 4 16 1 r(r + 1) – 1 (r + 1)(r + 2) = r + 2 – r r(r + 1)(r + 2) = 2 r(r + 1)(r + 2) [Shown] Σr = 1 n 1 r(r + 1)(r + 2) = 1 2 Σr = 1 n 2 r(r + 1)(r + 2) = 1 2 Σr = 1 n 3 1 r(r + 1) – 1 (r + 1)(r + 2)4 3f (r) = 1 r(r + 1)4 = 1 2 Σr = 1 n [ f (r) – f (r + 1)] = 1 2 [ f (1) – f (n + 1)] = 1 2 3 1 2 – 1 (n + 1)(n + 2)4 = 1 2 3 n2 + 3n + 2 – 2 2(n + 1)(n + 2)4 = n2 + 3n 4(n + 1)(n + 2) 17 (a) 1 (2r – 1)(2r + 1) ≡ A 2r – 1 + B 2r – 1 1 ≡ A(2r + 1) + B(2r – 1) Let r = – 1 2 , Let r = – 1 2 , l = B(–2) 1 = A(2) B = – 1 2 A = 1 2 1 (2r – 1)(2r + 1) = 1 2(2r – 1) – 1 2(2r + 1) = 1 21 1 2r – 1 – 1 2r + 12 (b) Σr = n 2n 1 (2r – 1)(2r + 1) = Σr = n 2n 3 1 2(2r – 1) – 1 2(2r + 1)4 = 1 2 Σr = n 2n [ f (r) – f (r + 1)] 3f (r) = 1 2r – 14, = 1 2 [ f (n) – f (2n + 1)] = 1 2 3 1 2n – 1 – 1 4n + 14 = 1 2 1 4n + 1 – 2n + 1 (2n – 1)(4n + 1)2 = n + 1 (2n – 1)(4n + 1) = an + b (2n – 1)(4n + 1) [Shown] a = 1, b = 1 (c) lim 3 n + 1 (2n – 1)(4n + 1)4n → ∞ = lim 3 1 n + 1 n2 8 – 2 n – 1 n2 4= 0n → ∞ 18 Let 1 (2r + 1)(2r + 3) ≡ A 2r + 1 + B 2r + 3 l ≡ A(2r + 3) + B(2r + 1) Let r = – 3 2 Let r = – 1 2 1 = B(–2) 1 = A(2) B = – 1 2 A = 1 2 1 (2r + 1)(2r + 3) = 1 2(2r + 1) – 1 2(2r + 3) Σr = 1 n 1 (2r + 1)(2r + 3) = 1 2 Σr = 1 n 3 1 2r + 1 – 1 2r + 34 = 1 2 Σr = 1 n [ f (r) – f (r + 1)] 3f (r) = 1 2r + 14 = 1 2 [ f (1) – f (n + 1)] = 1 2 31 3 – 1 2n + 34 = 1 6 – 1 2(2n + 3) Chapter 2.indd 5 6/24/2015 5:37:07 PM
6.
6 ACE AHEAD
Mathematics (T) First Term Second Edition © Oxford Fajar Sdn. Bhd. 2015 To test for the convergence, lim 31 6 – 1 2(2n + 3)4 = 1 6n → ∞ The series converges to 1 6 . S` = 1 6 19 Σn = 25 N 1 1 2n – 1 – 1 2n + 1 2 = Σn = 25 N [ f (n) – f (n + 1)] 3f (n) = 1 2n – 1 4 = f (25) – f (N + 1) = 1 50 – 1 – 1 2N + 1 = 1 7 – 1 2N + 1 Σn = 25 ∞ un = lim 11 7 – 1 2n + 1 2 = 1 7n → ∞ 20 1 r! – 1 (r + 1)! = (r + 1)! – r! r!(r + 1)! = (r + 1)r! – r! r!(r + 1)! = r (r + 1)! [Shown] Σr = 1 n r (r + 1)! = Σr = 1 n 31 r! – 1 (r + 1)!4 = Σr = 1 n [ f (r) – f (r + 1)], 3f (r) = 1 r!4 = f (1) – f (n + 1) = 1 – 1 (n + 1)! 21 r + 1 r + 2 – r r + 1 = (r + 1)2 – r(r + 2) (r + 1)(r + 2) = r2 + 2r + 1 – r2 – 2r (r + 1)(r + 2) = 1 (r + 1)(r + 2) [Shown] Σr = 1 n 1 (r + 1)(r + 2) = Σr = 1 n 3r + 1 r + 2 – r r + 14 = Σr = 1 n [ f (r) – f (r – 1)], 3f (r) = r + 1 r + 24 = f (n) – f (0) = n + 1 n + 2 – 1 2 = 2(n + 1) – (n + 2) 2(n + 2) = 2n + 2 – n – 2 2(n + 2) = n 2(n + 2) 22 f (r) – f (r – 1) = 1 (2r + 1)(2r + 3) – 1 (2r – 1)(2r + 1) = 2r – 1 – 2r – 3 (2r – 1)(2r + 1)(2r + 3) = – 4 (2r – 1)(2r + 1)(2r + 3) [Shown] Σr = 1 n 1 (2r – 1)(2r + 1)(2r + 3) = – 1 4 Σr = 1 n – 4 (2r – 1)(2r + 1)(2r + 3) = – 1 4 Σr = 1 n [ f (r) – f (r – 1)] 3f (r) = 1 (2r + 1)(2r + 3)4 = – 1 4 [ f (n) – f (0)] = – 1 43 1 (2n + 1)(2n + 3) – 1 34 = 1 12 – 1 4(2n + 1)(2n + 3) = 4n2 + 6n + 2n + 3 – 3 12(2n + 1)(2n + 3) = 4n2 + 8n 12(2n + 1)(2n + 3) = n2 + 2n 3(2n + 1)(2n + 3) 23 Let 1 (4n – 1)(4n + 3) ≡ A 4n – 1 + B 4n + 3 l ≡ A(4n + 3) + B(4n – 1) Let n = – 3 4 Let n = 1 4 1 = B(– 4) 1 = A(4) B = – 1 4 A = 1 4 1 (4n – 1)(4n + 3) = 1 41 1 4n – 1 – 1 4n + 32 Chapter 2.indd 6 6/24/2015 5:37:09 PM
7.
ACE AHEAD Mathematics
(T) First Term Second Edition © Oxford Fajar Sdn. Bhd. 2015 7 Let f (r) = 1 4r + 3 1 4 Σr = 1 n 1 1 4r – 1 – 1 4r + 32 = 1 4 Σr = 1 n [ f (r – 1) – f (r)] = 1 4 [ f (0) – f (n)] = 1 4 31 3 – 1 4n + 34 = 1 4 34n + 3 – 3 3(4n + 3)4 = n 3(4n + 3) 24 f (x) = x + x + 1 1 f (x) = 1 x + x + 1 × x – x + 1 x – x + 1 = x – x + 1 x – (x + 1) = x + 1 – x Σx = 1 24 1 f (x) = – Σx = 1 24 1 x – x + 12 = – ( 1 – 2 + 2 – 3 + … + 24 – 25) = – (1 – 5) = 4 25 Using long division, 1 x2 + 6x + 8 2 x2 + 6x + 0 x2 + 6x + 8 –8 x(x + 6) (x + 2)(x + 4) ≡ 1 – 8 (x + 2)(x + 4) Let 8 (x + 2)(x + 4) ≡ A (x + 2) + B (x + 4) , 8 ≡ A(x + 4) + B(x + 2) Let x = – 4, Let x = –2, 8 = B(–2) 8 = A(2) B = – 4 A = 4 x(x + 6) (x + 2)(x + 4) = 1 – 4 x + 2 + 4 x + 4 Σx = 1 n 31 – 4 x + 2 + 4 x + 44 = Σx = 1 n 1 – 4 Σx = 1 n 3 1 x + 2 – 1 x + 44 = n – 431 3 – 1 5 + 1 4 – 1 6 + 1 5 – 1 7 + … + 1 n + 1 – 1 n + 3 + 1 n + 2 – 1 n + 44 = n – 431 3 + 1 4 – 1 n + 3 – 1 n + 44 = n – 437 12 – 2n + 7 (n + 3)(n + 4)4 = n – 437(n2 + 7n + 12) – 12(2n + 7) 12(n + 3)(n + 4) 4 = n – 7n2 + 49n + 84 – 24n – 84 3(n + 3)(n + 4) = n – 7n2 + 25n 3(n + 3)(n + 4) = 3n(n + 3)(n + 4) – n(7n + 25) 3(n + 3)(n + 4) = n[3n2 + 7n + 12) – 7n – 25] 3(n + 3)(n + 4) = n[3n2 + 21n + 36 – 7n – 25] 3(n + 3)(n + 4) = n(3n2 + 14n + 11) 3(n + 3)(n + 4) = n(n + 1)(3n + 11) 3(n + 3)(n + 4) [Shown] 26 ( ) ( )( ) ( )( ) ( )( ) ( ) 2 3 2 4 2 3 6 2 3 4 2 3 3 16 96 216 4 4 3 2 2 3 4 + = + + + + = + + x x x x x x xx x x x x x 2 3 4 4 4 3 2 2 216 81 2 3 2 4 2 3 6 2 3 4 2 3 + + + -[ ] = + - + - + - ( ) ( )( ) ( )( ) ( )( xx x x x x x x x x ) ( ) ( ) ( ) 3 4 2 3 4 4 4 3 16 96 216 216 81 2 3 2 3 192 43 + - = - + - + + - + = + 22 2 2 3 2 2 3 2 192 2 432 2 1056 2 3 4 4 3 x xLet = + - + = + = , ( ) ( ) ( ) 27 (a) x x x x x x x x x x x x x x + = + + + + + = + 1 5 1 10 1 10 1 5 1 1 5 5 5 4 3 2 2 3 4 5 5 33 3 5 3 3 2 10 10 1 5 1 1 1 3 1 3 1 1 + + + + − = + − + − + − x x x x x x x x x x x x 3 Chapter 2.indd 7 6/24/2015 5:37:11 PM
8.
8 ACE AHEAD
Mathematics (T) First Term Second Edition © Oxford Fajar Sdn. Bhd. 2015 x x= + 55 33 3 5 3 3 2 10 10 1 5 1 1 1 3 1 3 1 1 + + + + − = + − + − + − x x x x x x x x x x x x 3 3 3 5 3 5 3 3 3 3 1 1 1 1 5 10 10 1 5 1 = − + − + − = + + + + x x x x x x x x x x x x x + × − + − 1 3 3 1 1 5 3 3 x x x x x Terms containing x4 = + −( )+ ( ) = − + = − x x x x x x x x x x 5 3 3 4 4 4 4 3 5 3 10 3 15 10 2 Coefficient of x4 = –2 (b) T n r a b r x x r x x r r n r r r r r r r + − − − − − = = ( ) ( ) = ( ) = 1 2 6 1 12 2 6 2 6 2 6 2 (( ) −r r x12 3 The term independent of x is the term where 12 – 3r = 0 r = 4 28 (a) 11 – 3 2 x2 5 (2 + 3x)6 = 31 + 5 C11– 3 2 x2 + 5 C21– 3 2 x2 2 + …4 [26 + 6 C1 (2)5 (3x) + 6 C2 (2)4 (3x)2 + … ] = 11 – 15 2 x + 45 2 x2 2(64 + 576x + 2160x2 ) = 64 + 576x + 2160x2 – 480x – 4320x2 + 1440x2 = –720x2 + 96x + 64 [Shown] (b) 29 (a) 1 + 10(3x + 2x2 ) + 10(9) 2 (3x + 2x2 )2 + 10(9)(8) 3! (3x + 2x2 )3 = 1 + 30x + 20x2 + 45(9x2 + 12x3 ) + 120(27x3 ) = 1 + 30x + 425x2 + 3780x3 Coefficient of x3 = 3780 (b) (1 + x)–1 (4 + x2 ) – 1 2 = 31 + –1 1! (x) + –1(–2) 2! (x)2 + –1(–2)(–3) 3! (x)3 + …4 14 – 1 2 2 31 + x2 4 4 – 1 2 = 1 2 (1 – x + x2 – x3 + …)1 + – 1 2 1! 1x2 4 2 + – 1 21– 3 22 2! 1x2 4 2 2 + … = 1 2 (1 – x + x2 – x3 + …) 11 – x2 8 + …2 1 3 2 1 3 2 1 5 3 2 10 3 2 10 2 5 5 2 2 3 − − = − + = − + + + − x x x x x x x x x 3 2 5 3 2 1 15 2 5 10 9 4 3 10 27 8 27 4 3 4 4 2 2 2 3 + + + = − − + + + − + x x x x x x x x x xx x x x x x x x x x + + + + = − − + + + − − 5 81 16 6 1 15 2 5 45 2 30 10 135 4 13 4 4 2 2 3 4 3 … 55 2 405 16 4 4 x x+ + = … 1 15 2 35 5 15 4 515 16 2 3 4 - + - -x x x x Chapter 2.indd 8 6/24/2015 5:37:13 PM
9.
ACE AHEAD Mathematics
(T) First Term Second Edition © Oxford Fajar Sdn. Bhd. 2015 9 = 1 2 11 – x2 8 – x + x3 8 + x2 – x3 2 = 1 2 11 – x + 7 8 x2 – 7 8 x3 + …2 where |x| 1 30 Let f (x) ≡ A 1 – x + Bx + C 1 + x2 1 + 2x + 3x2 ≡ A(1 + x2 ) + (Bx + C)(1 – x) Let x = 1, 1 + 2 + 3 = A(2) A = 3 Let x = 0, 1 = 3(1) + (0 + C)(1) C = –2 Let x = –1, 1 – 2 + 3 = 3(2) + [–B + (–2)](2) 2 = 6 – 4 – 2B B = 0 Hence, f (x) = 3 1 – x – 2 1 + x2 f (x) = 3(1 – x)–1 – 2(1 + x2 )–1 = 331 + –1 1! (–x) + –1(–2) 2! (–x)2 + –1(–2)(–3) 3! (–x)3 + …4 – 231 + –1 1! (x)2 + …4 = 3(1 + x + x2 + x3 + …) – 2(1 – x2 + …) = 3 + 3x + 3x2 + 3x3 – 2 + 2x2 = 1 + 3x + 5x2 + 3x3 where |x| 1 [Shown] 31 (a) ( 5 + 2)6 – ( 5 – 2)6 8 5 = [( 5 + 2)3 + ( 5 – 2)3 ][( 5 + 2)3 – ( 5 – 2)3 ] 8 5 = ( 5 + 2 + 5 – 2)[( 5 + 2)2 – ( 5 + 2)( 5 – 2) + ( 5 – 2)2 ] ( 5 + 2 – 5 + 2)[( 5 + 2)2 + ( 5 + 2)( 5 – 2) + ( 5 – 2)2 ] 8 5 = [2 5(5 + 4 5 + 4 – 1 + 5 – 4 5 + 4)] [(4)(5 + 4 5 + 4 + 1 + 5 – 4 5 + 4)] 8 5 = (17)(19) = 323 (b) (1 – 3x) 1 3 = 31 + 1 3 1! (–3x) + 1 31– 2 32 2! (–3x)2 + 1 31– 2 321– 5 32 3! (–3x)3 + …4 = 1 – x – x2 – 5 3 x3 – … where |x| 1 3 When x = 1 8 , (1 – 3x) 1 3 = 15 82 1 3 = 3 5 2 ≈ 1 – 1 8 – 11 82 2 – 5 311 82 3 – … 3 5 ≈ 1315 1536 (2) ≈ 1315 768 = 1.17 [2 decimal places] 32 ( ) ( ) ( )( ) ! ( ) ( 1 1 2 2 2 1 2 1 2 2 1 1 2 2 2 - = + - + - - + = + + -( ) + + y y n n y n n y ny n n y … … )) ( ) ( )( ) ! ( )- = + -( ) + - - - + = - + +( ) + 2 2 2 1 2 2 2 1 2 1 2 2 1 n n y n n y ny n n y … … 1 1 1 1 1 2 2 1 1 2 2 1 2 2 2 2 − + = −( ) +( ) = − + −( ) +( ) − + +( −y y y y ny n n y ny n n n n n … )) +( ) = − + + − + + −( ) = − + ∴ y ny n n y ny n y n n y ny n y 2 2 2 2 2 2 2 1 2 2 1 2 4 2 1 1 4 8 … ( ) 11 1 1 4 8 1 50 1 16 2 2 2− + = − + + = = y y ny n y y n n … Let , 1 1 50 1 1 50 1 4 1 16 1 50 8 1 10 1 50 49 51 79 601 80 00 1 8 2 2 1 8 - + » - + » 00 1 1 Chapter 2.indd 9 6/24/2015 5:37:15 PM
10.
10 ACE AHEAD
Mathematics (T) First Term Second Edition © Oxford Fajar Sdn. Bhd. 2015 33 (1 – x)10 = 1 – 10x + 45x2 + … (1 + 2x2 )3 = 1 + 6x2 + … (1 + ax)5 = 1 + 5ax + 10a2 x2 + … (1 + bx2 )4 = 1 + 4bx2 + … (1 – x)10 (1 + 2x2 )3 – (1 + ax)5 (1 + bx2 )4 = (1 – 10x + 45x2 + …)(1 + 6x2 + …) – (1 + 5ax + 10a2 x2 + …)(1 + 4bx2 + …) = 1 + 6x2 – 10x + 45x2 – 1 – 4bx2 – 5ax – 10a2 x2 + … –10 – 5a = 0 6 + 45 – 4b – 10a2 = 0 a = –2 6 + 45 – 4b – 40 = 0 b = 11 4 34 (a) 1x + 1 x2 5 1x – 1 x2 3 = 3x5 + 5(x)4 11 x2+ 10x3 11 x2 2+ 10x2 11 x3 2 + 5x11 x4 2+ 1 x5 43x3 + 3(x)2 1–1 x 2 + 3x1– 1 x2 2 + 1– 1 x2 3 4 = 1x5 + 5x3 + 10x + 10 x + 5 x3 + 1 x5 2 1x3 – 3x + 3 x – 1 x32 To obtain x4 term, = … + x5 13 x2+ 5x3 (–3x) + 10x(x3 ) + … = 3x4 – 15x4 + 10x4 = –2x4 The coefficient of x4 term is –2. (b) (1 + x) 1 5 – 5 + 3x 5 + 2x = 31 + 1 5 1! (x) + 1 51– 4 52 2! (x)2 + 1 51– 4 521– 9 52 3! (x)3 + …4 – (5 + 3x)(5 + 2x)–1 = 11 + 1 5 x – 2 25 x2 + 6 125 x3 2 – (5 + 3x)(5)–1 11 + 2 5 x2 –1 = 11 + 1 5 x – 2 25 x2 + 6 125 x3 2 – (5 + 3x)11 5231 + –1 1!12 5 x2 + –1(–2) 2! 12 5 x2 2 + –1(–2)(–3) 3! 12 5 x2 3 4 = 1 + 1 5 x – 2 25 x2 + 6 125 x3 – 1 5 (5 + 3x) 11 – 2 5 x + 4 25 x2 – 8 125 x3 2 = 1 + 1 5 x – 2 25 x2 + 6 125 x3 – 1 5 15 – 2x + 4 5 x2 – 8 25 x3 + 3x – 6 5 x2 + 12 25 x3 2 = 1 + 1 5 x – 2 25 x2 + 6 125 x3 – 1 – 1 5 x + 2 25 x2 – 4 125 x3 = 2 125 x3 where |x| 2 5 [Shown] Hence, p = 2 125 By using x = 0.02, (1.02) 1 5 – 1253 50 2 1252 50 2 = 2 125 (0.02)3 = 1.28 × 10–7 [Shown] 35 (1 + ax + bx2 )7 = [(1 + ax) + (bx2 )]7 = 7 Cr (1 + ax)7 – r (bx2 )r x term: = 7 C0 (1 + ax)7 = 7 C0 [7 C1 (ax)] = 7ax x2 term: = 7 C0 (1 + ax)7 + 7 C1 (1 + ax)6 (bx2 ) = 7 C0 [7 C2 (ax)2 ] + 7 C1 [6 C0 (ax)0 (bx2 )] = 21a2 x2 + 7bx2 = (21a2 + 7b)x2 7a = 1 21a2 + 7b = 0 a = 1 7 2111 72 2 + 7b = 0 7b = – 3 7 b = – 3 49 Let (1 + ax + bx2 )7 = 1 + x (1 + x) 1 7 = 1 + 1 7 x – 3 49 x2 + … where |x| 1 By using x = 0.014, 7 1.014 ≈ 1 + 1 7 (0.014) – 3 49 (0.014)2 ≈ 1.001988 [6 decimal places] 36 (1 + x)7 1 – 2x = (1 + x)7 (1 – 2x)–1 = [1 + 7x + 21x2 + 35x3 + …] 31 + –1 1! (–2x) + –1(–2) 2! (–2x)2 + –1(–2)(–3) 3! (–2x)3 + …4 Chapter 2.indd 10 6/24/2015 5:37:17 PM
11.
ACE AHEAD Mathematics
(T) First Term Second Edition © Oxford Fajar Sdn. Bhd. 2015 11 = (1 + 7x + 21x2 + 35x3 + …) (1 + 2x + 4x2 + 8x3 + …) = 1 + 2x + 4x2 + 8x3 + 7x + 14x2 + 28x3 + 21x2 + 42x3 + 35x3 + … = 1 + 9x + 39x2 + 113x3 + … where |x| 1 2 [Shown] Using x = –0.01, (0.99)7 (1.02) ≈ 1 + 9(–0.01) + 39(–0.01)2 + 113(–0.01)3 + … ≈ 0.914 [3 decimal places] 37 1 + x = (1 + x) 1 2 = 1 + 1 2 1! (x) + 1 21– 1 22 2! (x)2 + 1 21– 1 221– 3 22 3! (x)3 + 1 21– 1 221– 3 221– 5 22 4! (x)4 + … = 1 + x 2 – x2 8 + x3 16 – 5 128 x4 + … … 1 1 4 (6 + x) – (2 + x)–1 = 6 + x 4 – 2–1 31 + x 24 – 1 = 6 + x 4 – 1 231 + –1 1! 1x 22 + –1(–2) 2! 1x 22 2 + –1(–2)(–3) 3! 1x 22 3 + –1(–2)(–3)(– 4) 4! 1x 22 4 4 = 6 + x 4 – 1 211 – x 2 + x2 4 – x3 8 + x4 16 – …2 = 6 + x 4 – 1 2 + x 4 – x2 8 + x3 16 – x4 32 + … = 1 + x 2 – x2 8 + x3 16 – x4 32 … 2 To obtain the error, 1 – 2 , 11 + x 2 – x2 8 + x3 16 – 5 128 x4 2 – 11 + x 2 – x2 8 + x3 16 – x4 32 2 = – 5 128 x4 + x4 32 = – x4 128 The error is approximately x4 128 .[Shown] 38 ( )a b a b a a b a a b a a b + = + = + + = + 1 2 1 2 1 2 1 2 1 2 1 2 1 2 1 1 1 1 1 2 aa b a b a a + − + − − + = 1 2 1 2 1 2 1 2 1 2 1 1 2 2 3 2 3 1 2 ! ! … 11 2 8 16 1 1 2 8 2 2 3 3 1 2 1 2 1 2 2 2 2 + − + + −( ) = − = − − − b a b a b a a b a b a a b a b a … … bb a a b a b a b a b a a b a b a 3 3 1 2 1 2 1 2 3 3 1 2 3 3 16 2 2 2 16 8 + +( ) − −( ) = + = + … … Let a = 4, b = 1 5 3 4 1 4 1 8 4 129 256 1 2 3 - = + ( ) æ è ç ç ö ø ÷ ÷ = 5 3 5 3 5 3 2 129 256 5 3 2 5 3 2 256 129 512 129 -( ) +( )= - = +( )= +( )= ´ = 1 – 2 2 1 Chapter 2.indd 11 6/24/2015 5:37:19 PM
12.
12 ACE AHEAD
Mathematics (T) First Term Second Edition © Oxford Fajar Sdn. Bhd. 2015 39 y = 1 1 + 3x + 1 + x × 1 + 3x – 1 + x 1 + 3x – 1 + x = 1 + 3x – 1 + x 1 + 3x – (1 + x) = 1 2x 1 1 + 3x – 1 + x[Shown] 1 2x3(1 + 3x) 1 2 – (1 + x) 1 2 4 = 1 2x531 + 1 2 1! (3x) + 1 21– 1 22 2! (3x)2 + 1 21– 1 22 1– 3 22 3! (3x)3 + …4– 31 + 1 2 1! (x) + 1 2 1– 1 22 2! (x)2 + 1 21– 1 22 1– 3 22 3! (x)3 + …46 = 1 2x311 + 3 2 x – 9 8 x2 + 27 16 x3 + …2 – 11 + x 2 – x2 8 + x3 16 + …24 = 1 2x1x – x2 + 13 8 x3 + …2 = 1 2 – x 2 + 13 16 x2 Using x = 1 100 , y = 1 1 + 3x + 1 + x = 1 103 100 + 101 100 = 10 103 + 101 ≈ 1 2 – 1 1 1002 2 + 13 161 1 1002 2 ≈ 79 213 160 000 [Shown] 40 (a) 3 – 5x + 3x2 ≡ A(1 + x2 ) + (B + Cx)(1 – 2x) Let x = 1 2 , 5 4 = 5 4 (A) A = 1 Let x = 0, 3 = 1(1 + 0) + (B + 0)(1) B = 2 Let x = 1, 1 = 1(2) + (2 + C )(–1) C + 2 = 1 C = –1 (b) (1 – 2x)–1 = 31 + –1 1! (–2x) + –1(–2) 2! (–2x)2 + –1(–2)(–3) 3! (–2x)3 4 = 1 + 2x + 4x2 + 8x3 (1 + x2 )–1 = 31 + –1 1! (x2 ) + …4 = 1 – x2 (c) (3 – 5x + 3x2 )(1 – 2x)–1 (1 + x2 )–1 = 1 1 – 2x + 2 – x 1 + x2 = 1(1 – 2x)–1 + (2 – x)(1 + x2 )–1 = 1(1 + 2x + 4x2 + 8x3 ) + (2 – x)(1 – x2 ) = 1 + 2x + 4x2 + 8x3 + 2 – 2x2 – x + x3 = 3 + x + 2x2 + 9x3 ⇒ a = 1, b = 2, c = 9 41 (a) ur r r r r r = + = + = +( ) = + + − + + + 1 3 1 3 1 3 9 1 3 1 3 1 9 10 2 1 2 1 2 2 1 2 1 2 1 332 1r + (b) It is a G.P. with a = 10 27 and r = 1 9 S a r r S n n n n = −( ) − = − − = − =∞ 1 1 10 7 1 1 9 1 1 9 5 12 1 1 9 55 12 Chapter 2.indd 12 6/24/2015 5:37:22 PM
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