Find the following indefinite integral using the by parts method. ptsint xexdxint udvuvint vdu First give the parts: So we let u and dv Then du and v Now finish and solve the definite integral using the by parts method and simplify your final the expression if possible and put your final answer in terms of x Directions: Neatly show all of your work on problems. Record your final answers in the spaces provided. Use correct notation and terminology at all times. Include units feet seconds, $ etc. when appropriate. Provide explanations if requested. take home part
If you solve a problem graphically you MUST provide the following information:
Give the equations you graphed. And Sketch the graphs of your equations
Indicate the specific portion of the graph which gives the solution to your problem.
If its an area show this graph with the proper portion shaded with the correct bounds labeled.
Give an integrals or formulas needed to solve the problem
Then give the final solution of the problem with units if needed.
When finding a definite integral be sure to give the integral with the correct notation of the fundamental theorem of calculus that is used to solve them then give the final solution.
SHOW THAT or lose points. SEE how I solve the problems in the notes of keys to worksheets pts
Failure to follow directions and failure to show work will result in missed points.
