(a) To determine Find the area under the curve y = sin x on [ 0 , π 2 ] by calculating upper sum U . Explanation Given information: The curve is y = sin x on [ 0 , π 2 ] . The formula is as follows: sin h + sin 2 h + sin 3 h + ... + sin m h = cos ( h 2 ) − cos ( ( m + 1 2 ) h ) 2 sin ( h 2 ) . Formula: Upper sum of a partition If P is a partition of [ a , b ] into n subintervals ( a = x 0 < x 1 < x 2 < x 3 < ... < x n − 1 < x n = b ) and each subinterval has equal length Δ x = ( b − a ) n , then the upper sum is U = ∑ k = 1 n f ( x k ) Δ x . Calculation: Write the function. y = sin x on [ 0 , π 2 ] . Subdivide the interval [ 0 , π 2 ] into subintervals with n − 1 points as { x 1 , x 2 , x 3 , ...... x n − 1 } such that 0 = x 0 < x 1 < x 2 < x 3 < ... < x n − 1 < x n = π 2 and each of length is Δ x = π 2 n . Since the function y = sin x is increasing on [ 0 , π 2 ] . The area of the circumscribed rectangles. f ( x 1 ) Δ x = ( sin Δ x ) Δ x f ( x 2 ) Δ x = ( sin 2 Δ x ) Δ x f ( x 3 ) Δ x = ( sin 3 Δ x ) Δ x ... f ( x n ) Δ x = ( sin n Δ x ) Δ x Therefore, upper sum is as follows; U = f ( x 1 ) Δ x + f ( x 2 ) Δ x + f ( x 3 ) Δ x + (b) To determine Find the area under the curve y = sin x from x = 0 to x = π 2 by the limit of U as n → ∞ and Δ x = ( b − a ) n → ∞ .

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Question

Chapter 5.3, Problem 85E

(a)

To determine

Find the area under the curve y=sinx on [0,π2] by calculating upper sum U.

(b)

To determine

Find the area under the curve y=sinx from x=0 to x=π2 by the limit of U as n→∞ and Δx=(b−a)n→∞.

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Chapter 5.3, Problem 84E

Chapter 5.3, Problem 86E

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