Evaluate: ∫-11|5x-3| dx

प्रश्न

Evaluate: `int_(-1)^1 |5x - 3| "d"x`

बेरीज

उत्तर

Let I = `int_(-1)^1 |5x - 3| "d"x`

|5x − 3| = − (5x − 3) when (5x − 3) < 0 i.e. x < `3/5`

= 5x – 3 when (5x – 3) > 0 i.e., x > `3/5`

∴ I = `int_(-1)^(3/5) |5x - 3| "d"x + int_(3/5)^1|5x - 3| "d"x`

= `int_(-1)^(3/5) -(5x - 3) "d"x + int_(3/5)^1 (5x - ) "d"x`

= `-5int_(-1)^(3/5)x "d"x + 3int_(-1)^(3/5) "d"x + 5 int_(3/5)^1x "d"x - 3int_(3/5)^1 "d"x`

= `-5/2[x^2/2]_(-1)^(3/5) + 3[x]_(-1)^(3/5) + 5[x^2/2]_(3/5)^1 - 3[x]_(3/5)^1`

= `-5/2[(3/5)^2 - (-1)^2] + 3[3/5 - (-1)] + 5/2[(1)^2 - (3/2)^2] - 3(1 -3/5)`

= `5/2(9/25 - 1) + 3(3/5 + 1) + 5/2(1 - 9/25) - 3(2/5)`

= `-5/2((-16)/25) + 3(8/5) + 5/2(16/25) - 6/5`

= `8/5 + 24/5 + 8/5 - 6/5`

= `34/5`

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Methods of Evaluation and Properties of Definite Integral

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पाठ 2.4: Definite Integration - Short Answers II

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एससीईआरटी महाराष्ट्र Mathematics and Statistics (Arts and Science) [English] 12 Standard HSC

पाठ 2.4 Definite Integration
Short Answers II | Q 6

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Evaluate: ∫-11|5x-3| dx

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Evaluate: ∫-11|5x-3| dx

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