Maclaurin series for calc 2?

1 ANSWERS

1. 
   

   The Maclaurin series for sin(x) is
   
   ∞
   
   ∑ (-1)^n x^(2n+1) / (2n+1)!
   
   n=0
   
   Just replace x by 4x² to get the Maclaurin series for sin(4x²):
   
   ∞
   
   ∑ (-1)^n (4x²)^(2n+1) / (2n+1)!
   
   n=0
   
   which simplifies to
   
   ∞
   
   ∑ (-1)^n [4^(2n+1)][x^(4n+2)] / (2n+1)!
   
   n=0
   
   The integral of sin(4x²) equals the integral of this sum. Assuming that interchanging summation and integration is legitimate here (which it is), the integral of sin(4x²) is given by
   
   ∞
   
   ∑ ∫ {(-1)^n [4^(2n+1)][x^(4n+2)] / (2n+1)!} dx
   
   n=0
   
   which equals
   
   ∞
   
   ∑ (-1)^n [4^(2n+1)][x^(4n+3)] /[(4n + 3) (2n+1)!]
   
   n=0
   
   For the definite integral from 0 to 0.62, the value is
   
   ∞
   
   ∑ (-1)^n [4^(2n+1)][0.62^(4n+3)] /[(4n + 3) (2n+1)!]
   
   n=0
   
   since the infinite sum, evaluated at 0, is 0.
   
   Using only the first two terms.
   
   0.62
   
   ∫ sin(4x²) dx ≈
   
   0
   
   0.62
   
   ∫ (4x² - (32x^6)/3) dx
   
   0
   
   = (4/3)x³ - (32/21) x^7 (evaluated at 0 and 0.62)
   
   ≈ 0.264

   Report (0) (0)  |   earlier