Help i have an examinatiation after 10 hours

  • Context: Graduate 
  • Thread starter Thread starter umut
  • Start date Start date
Click For Summary
SUMMARY

The integral INT(ê^(- a·x)·SIN(x)/x, x, 0, + inf) can be solved using substitution, leading to the result of pi·a/2. By letting u = -a·x, the integral transforms into INT(ê^u·SIN(-u/a)/(-a), u, 0, -inf), which simplifies to -a·INT(ê^u·SIN(u)/u, u, 0, -inf). Utilizing the known result INT(SIN(u)/u, u, 0, -inf) = -pi/2, the final answer is derived efficiently. Students are encouraged to utilize online resources and collaborate with peers for additional practice.

PREREQUISITES
  • Understanding of integral calculus, specifically improper integrals.
  • Familiarity with substitution methods in integration.
  • Knowledge of the integral INT(SIN(x)/x, x, 0, + inf) = pi/2.
  • Basic concepts of limits and convergence in calculus.
NEXT STEPS
  • Study advanced techniques in integral calculus, focusing on improper integrals.
  • Practice substitution methods with various functions in integration.
  • Explore the properties of exponential and trigonometric integrals.
  • Review resources on integral convergence and divergence criteria.
USEFUL FOR

Students preparing for calculus examinations, particularly those focusing on integral calculus and improper integrals. This discussion is beneficial for anyone seeking to enhance their problem-solving skills in advanced mathematics.

umut
Messages
3
Reaction score
0
help i have an examination 4 hours left

i need to solve the question

INT(ê^(- a·x)·SIN(x)/x, x, 0, + inf)

by using INT(SIN(x)/x, x, 0, + inf) = pi/2

ı haven't got so much time
 
Last edited:
Physics news on Phys.org
nock nock is there anybody there

:cry:
 
, what should i do

First of all, take a deep breath and try not to panic. You still have 4 hours left and that is enough time to prepare for your examination.

To solve the given question, you can use the substitution method. Let u = -a·x, then du = -a·dx and when x = 0, u = 0 and when x = +inf, u = -inf. So the integral becomes:

INT(ê^u·SIN(-u/a)/(-a), u, 0, -inf)

Using the substitution INT(SIN(u)/u, u, 0, -inf) = -pi/2, the integral becomes:

INT(ê^u·(-a)·SIN(u)/(-a·u), u, 0, -inf)

= -a·INT(ê^u·SIN(u)/u, u, 0, -inf)

= -a·(-pi/2)

= pi·a/2

Therefore, the final answer is pi·a/2.

Now, to save time and make sure you are well-prepared for your exam, you can also use the internet to find helpful resources and practice problems. You can also ask your friends or classmates for help and work together on solving practice questions.

Remember to stay calm and focused, and believe in yourself. Good luck on your examination!
 

Similar threads

Undergrad Having trouble understanding a seemingly simple u-substitution
  • · Replies 5 ·
Replies
5
Views
3K
Undergrad Did Math DF's integral calculator make a glaring mistake?
  • · Replies 8 ·
Replies
8
Views
4K
MHB 15.1.34 Evaluate triple integral
  • · Replies 2 ·
Replies
2
Views
2K
Undergrad Why is the integral of ##\arcsin(\sin(x))## so divisive?
  • · Replies 3 ·
Replies
3
Views
3K
High School Having trouble deriving the volume of an elliptical ring toroid
  • · Replies 4 ·
Replies
4
Views
5K
High School Calculating shaded area: I'm getting discrepancies between methods
  • · Replies 3 ·
Replies
3
Views
3K
High School Integration by Parts, an introduction I get confused with
  • · Replies 2 ·
Replies
2
Views
3K
Graduate Multiplying divergent integrals using Hardy fields approach
  • · Replies 3 ·
Replies
3
Views
3K
Undergrad Solving an Integral using Feyman's trick
  • · Replies 8 ·
Replies
8
Views
2K
Graduate Need help with an integral -- How to integrate velocity squared?
  • · Replies 3 ·
Replies
3
Views
3K