Integral sin(2x)cos(2x) | cos^2เนื้อหาที่เกี่ยวข้องล่าสุดทั้งหมด

7 thoughts on “Integral sin(2x)cos(2x) | cos^2เนื้อหาที่เกี่ยวข้องล่าสุดทั้งหมด”

1. 

   Simon Gonzalez says:

   if I use u=cos(2x); du=-2sin(2x) and the result is
   -1/4*cos^2(2x)
   I don't understand why are different 🙁

   19/06/2022 at 11:31 PM

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2. 

   NathSaeng Lee says:

   No entendí la explicación pero aun así pude comprender como se hacía
   Thanks😊

   19/06/2022 at 11:31 PM

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3. 

   MrYoungpianoplayer says:

   This is actually wrong. This would give you ambiguous answers. The answer is (-1/8)cos(4x)

   The correct way of answering this is using the Double-Angle identity formula
   2sin(x)cos(x) = sin(2x) But for this problem, you would rewrite it as:
   sin(x)cos(x) = sin(2x) / 2 (by moving the 2 to the other side)

   Now, because we want to find the integral of sin(2x)cos(2x), we part from our formula
   sin(x)cos(x) = sin(2x) / 2 to:
   sin(2x)cos(2x) = sin(2 * 2x) / 2 which would give us:
   sin(2x)cos(2x) = sin(4x) / 2

   So by trigonometrical identities, we have now rewritten our original integral to: ⌠sin(4x) / 2

   This is solved as follows
   1) The one half is a constant, so it is taken out the integral:
   ½⌠sin(4x) Now we solve
   2) The integral of sin(4x) is: -cos(4x) * ¼ So we are left with
   = (½)(¼) * -cos(4x)

   So our answer is: (-1/8)cos(4x)

   19/06/2022 at 11:31 PM

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4. 

   graciela torres says:

   this is wrong. Don't check your answer here 🙂

   19/06/2022 at 11:31 PM

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5. 

   petter Mollel says:

   Sorry teacher I get you well but i have one QUESTION how to integrate sin cubic of two x… Help me

   19/06/2022 at 11:31 PM

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6. 

   Alexander Nalog says:

   how will you know if sin(2x) must be used and not cos(2x). What if I used u=cos(2x)?

   19/06/2022 at 11:31 PM

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7. 

   Mobin Ahmad says:

   im confused as to why you integrate u, but not du?

   19/06/2022 at 11:31 PM

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