Calculus 5e_Part270

# Does it appear that x1 t x d x is convergent b use

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Unformatted text preview: s convergent. dt x3 s y 2, 0 ; 47. (a) If t x v 4 dv 1 0 36. sec x d x 0 dx x 0 2 1, 0 { x, y ; 46. S 8. 7. s ex 41. S ; 45. S Determine whether each integral is convergent or divergent. Evaluate those that are convergent. |||| s Sketch the region and ﬁnd its area (if the area is ﬁnite). ; 43. S 5–40 s 6 dx 1 sx 1 x dx is improper for two reasons: The interval 0, is inﬁnite and the integrand has an inﬁnite discontinuity at 0. Evaluate it by expressing it as a sum of improper integrals of Type 2 and Type 1 as follows: 1 1 1 1 y0 s x 1 x d x y0 s x 1 x d x y1 s x 1 x d x s S ECTION 7.8 IMPROPER INTEGRALS 56. Evaluate 1 x sx 2 y 2 by the same method as in Exercise 55. 57–59 |||| Find the values of p for...
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## This note was uploaded on 12/27/2013 for the course MATHEMATIC 135 taught by Professor Lam during the Fall '07 term at University of Toronto- Toronto.

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