(a) To determine Evaluate the integral ∫ 0 1 t 4 + 5 t d t by Substitution Formula. Explanation Given information: ∫ 0 1 t 4 + 5 t d t Theorem: Substitution in Definite Integrals If g ′ is continuous on the interval [ a , b ] and f is continuous on the range of g ( x ) = u , then ∫ a b f ( g ( x ) ) . g ' ( x ) d x = ∫ g ( a ) g ( b ) f ( u ) d u . Calculation: Write the integral as follows: ∫ 0 1 t 4 + 5 t d t (1) Consider u = 4 + 5 t ⇒ t = 1 5 ( u − 4 ) (2) t = 0 ⇒ u = 4 + 5 ( 0 ) = 4 t = 1 ⇒ u = 4 + 5 ( 1 ) = 9 Differentiate the Equation (2) with respect to t . d u = 5 d t 1 5 d u = d t (3) Substitute Equation (2) and Equation (3) in Equation (1) ∫ 0 1 t 4 + 5 t d t = ∫ 4 9 1 5 ( u − 4 ) u ( 1 5 d u ) = 1 25 ∫ 4 9 ( u 3 2 − 4 u 1 2 ) d u = 1 25 [ 2 5 (b) To determine Evaluate the integral ∫ 1 9 t 4 + 5 t d t by Substitution Formula.

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Author: WEIR

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Chapter 5.6, Problem 11E

(a)

To determine

Evaluate the integral ∫01t4+5tdt by Substitution Formula.

(b)

To determine

Evaluate the integral ∫19t4+5tdt by Substitution Formula.

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Chapter 5.6, Problem 10E

Chapter 5.6, Problem 12E

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