How do i answer this? int_2^4 \ (2x)/(x^2+1) via a Riemann sum.
1 Answer
A = lim_(n rarr oo) \ sum_(i=1)^n 2/n \ (2((2n+2i)/n)) / (( (2n+2i)^2/n^2 + 1)
\ \ \ = lim_(n rarr oo) \ sum_(i=1)^n (4(2n+2i)) / ( (2n+2i)^2+n^2)
Explanation:
We seek:
int_2^4 \ (2x)/(x^2+1)
via a Riemann sum. So, we have:
A = lim_(n rarr oo) \ sum_(i=1)^n f(x_i) Delta x
\ \ \ = lim_(n rarr oo) \ sum_(i=1)^n f(a+iDelta x) Delta x
\ \ \ = lim_(n rarr oo) \ sum_(i=1)^n f(2+((4-2)i)/n) (4-2)/n
\ \ \ = lim_(n rarr oo) \ sum_(i=1)^n f(2+(2i)/n) (2)/n
\ \ \ = lim_(n rarr oo) \ sum_(i=1)^n 2/n \ f( (2n+2i )/n )
Then using the definition of
A = lim_(n rarr oo) \ sum_(i=1)^n 2/n \ (2((2n+2i)/n))/(((2n+2i)/n)^2+1)
for a 1 mark question this answer is probably sufficient, but it could be simplified further if required:
A = lim_(n rarr oo) \ sum_(i=1)^n 2/n \ (2((2n+2i)/n)) / (( (2n+2i)^2/n^2 + n^2/n^2)
\ \ \ = lim_(n rarr oo) \ sum_(i=1)^n (4((2n+2i)/n^2)) / (( (2n+2i)^2+n^2)/n^2)
\ \ \ = lim_(n rarr oo) \ sum_(i=1)^n (4(2n+2i)) / ( (2n+2i)^2+n^2)
