(-1) (1) The series Σk=1 is: k4/s A) conditionally convergent B) absolutely convergent (2) The sequence {(1 − 2)"}, A) converges to e7 (3)√3249 dx = B) converges to e-7 A) B) 플 dx √x²+2x+10 (4) The interval of convergence of the power series Ex=1 A) [0] B) (-/-) C) (-3, 3) for f B) x = 10 sin 0 (5) The appropriate substitution A) x+1=3 tan 8 (6) S (x+2)² dx = A)+In/x+3/+c B)₂+In/x+2/+c C) converges to -7 C) F B) x = ln(2), ln(-3) A) - 3 2 1* is: C) divergent D) (-∞0,00) (7) A formula for the general term starting with n = 1 of: A) B) {} c) {(-1) 3"} (8) The solutions of e²x + ex-6=0 are: A) x = ln(2), In(3) 2k-1 (9) The sum Ek-1 3k C) x 1 = 2 tan 0 39 4'16 D) {(-1)+131) 472 B) 12/12 27 81 64 256 C) x = 2,-3 D) Diverges C)+c D) In x + 2 + c x+2 D) D.N.E D) diverges C) 2 D) x-1= 3 tan 0 is: D) x = ln (2) 312 D) 2/2

(-1) (1) The series Σk=1 is: k4/s A) conditionally convergent B) absolutely convergent (2) The sequence {(1 − 2)"}, A) converges to e7 (3)√3249 dx = B) converges to e-7 A) B) 플 dx √x²+2x+10 (4) The interval of convergence of the power series Ex=1 A) [0] B) (-/-) C) (-3, 3) for f B) x = 10 sin 0 (5) The appropriate substitution A) x+1=3 tan 8 (6) S (x+2)² dx = A)+In/x+3/+c B)₂+In/x+2/+c C) converges to -7 C) F B) x = ln(2), ln(-3) A) - 3 2 1* is: C) divergent D) (-∞0,00) (7) A formula for the general term starting with n = 1 of: A) B) {} c) {(-1) 3"} (8) The solutions of e²x + ex-6=0 are: A) x = ln(2), In(3) 2k-1 (9) The sum Ek-1 3k C) x 1 = 2 tan 0 39 4'16 D) {(-1)+131) 472 B) 12/12 27 81 64 256 C) x = 2,-3 D) Diverges C)+c D) In x + 2 + c x+2 D) D.N.E D) diverges C) 2 D) x-1= 3 tan 0 is: D) x = ln (2) 312 D) 2/2

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter10: Sequences, Series, And Probability

Section10.3: Geometric Sequences

Problem 49E

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Question

calculus medium, please solve questionnnn 6

(-1)
(1) The series Σk=1 is:
k4/s
A) conditionally convergent B) absolutely convergent
(2) The sequence {(1 − 2)"},
A) converges to e7
(3)√3249 dx =
B) converges to e-7
A) B) 플
dx
√x²+2x+10
(4) The interval of convergence of the power series Ex=1
A) [0]
B) (-/-)
C) (-3, 3)
for f
B) x = 10 sin 0
(5) The appropriate substitution
A) x+1=3 tan 8
(6) S (x+2)²
dx =
A)+In/x+3/+c B)₂+In/x+2/+c
C) converges to -7
C) F
B) x = ln(2), ln(-3)
A) - 3
2
1* is:
C) divergent
D) (-∞0,00)
(7) A formula for the general term starting with n = 1 of:
A)
B) {} c) {(-1) 3"}
(8) The solutions of e²x + ex-6=0 are:
A) x = ln(2), In(3)
2k-1
(9) The sum Ek-1
3k
C) x 1 = 2 tan 0
39
4'16
D) {(-1)+131)
472
B) 12/12
27 81
64 256
C) x = 2,-3
D) Diverges
C)+c D) In x + 2 + c
x+2
D) D.N.E
D) diverges
C) 2
D) x-1= 3 tan 0
is:
D) x = ln (2)
312
D) 2/2

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