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In Problems 1-20, determine the Laplace transform of the given function using Table 7.1 on page 356 and the properties of the transform given in Table 7.2. [Hint: In Problems 12-20, use an appropriate trigonometric identity.] 1. t² + e¹ sin 2t 3. e¹cos 3t+e6t1 5. 2t²e¹t+ cos 4t 7. (t-1)4 9. et sin 2t 11. cosh bt 13. sin² t 15. cos³ t 17. sin 2t sin 5t 19. cos nt sin mt, m # n 2. 31²-21 4. 3t2t² + 1 6. e 2¹ sin2t + e³4² 8. (1+e¯¹)² 10. te²¹ cos 5t 12. sin 3t cos 3t t 14. etsin² 16. t sin² t 18. cosnt cos mt, mn 20. t sin 2t sin 5t 21. Given that L{cos bt} (s) = s/(s² + b²), use the trans- lation property to compute L{e" cos bt}. 22. Starting with the transform L{1}(s) 1/s, use for- mula (6) for the derivatives of the Laplace transform to show that L{t}(s) = 1/s², L{t²} (s) = 2!/s³, and, by using induction, that L{f} (s) = n!/s"+¹, n = 1, 2, .... = 23. Use Theorem 4 on page 362 to show how entry 32 fol- lows from entry 31 in the Laplace transform table on the inside back cover of the text. 24. Show that Leªth} (s) = n!/(s-a)"+¹ in two ways: (a) Use the translation property for F(s). (b) Use formula (6) for the derivatives of the Laplace transform.