Evaluate the following. ∫x2 ⋅e3xdx - Mathematics and Statistics

Question

Evaluate the following.

`int "x"^2 *"e"^"3x"`dx

Sum

Solution

Let I = `int "x"^2 "e"^"3x"`dx

`= "x"^2 int "e"^"3x" "dx" - int["d"/"dx" ("x"^2) int "e"^"3x" "dx"]` dx

`= "x"^2 * ("e"^"3x"/3) - int 2"x" * "e"^"3x"/3` dx

`= ("x"^2)/3 "e"^"3x" - 2/3 int "x" * "e"^"3x"` dx

`= ("x"^2)/3 "e"^"3x" - 2/3 ["x" int "e"^"3x" "dx" - int ("d"/"dx" ("x") int "e"^"3x" "dx") "dx"]`

`= ("x"^2 * "e"^"3x")/3 - 2/3 ["x" * "e"^"3x"/3 - int 1 * "e"^"3x"/3 "dx"]`

`= ("x"^2 * "e"^"3x")/3 - 2/3 [1/3 "xe"^"3x" - 1/3 int "e"^"3x" "dx"]`

`= ("x"^2 * "e"^"3x")/3 - 2/3 [1/3 "xe"^"3x" - 1/3 * "e"^"3x"/3]` + c

∴ I = `1/3 "x"^2 * "e"^"3x" - 2/9 "xe"^"3x" + 2/27 "e"^"3x" + "c"`

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Notes

The answer in the textbook is incorrect.

Methods of Integration: Integration by Parts

Is there an error in this question or solution?

Q 3)Q 2)Q 4)

Chapter 5: Integration - EXERCISE 5.5 [Page 133]

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Balbharati Mathematics and Statistics 1 (Commerce) [English] Standard 12 Maharashtra State Board

Chapter 5 Integration
EXERCISE 5.5 | Q 3) | Page 133

2024-2025 (July) Official Board Paper (with solutions)

Q 3. (B) i. | 4 marks

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Evaluate the following. ∫x2 ⋅e3xdx - Mathematics and Statistics

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