Solution to review question 9.1.7
If, in these questions, you have done something like:‘∫
dx
x^2 + 2 x+ 2=1
2 x+ 2ln(x^2 + 2 x+ 2 )’which isincorrect, then you have probably misunderstood the idea of
substitution. ‘Dividing by the derivative of the denominator’ in this
way willonlywork for a linear denominator, when the derivative is
constant (261
➤
). You have only to differentiate the right-hand side
to see that it cannot possibly be the integral of the left-hand side. The
following solutions show the correct approach to such integrals.
A.In this case the denominator factorises and we don’t need to complete
the square – we can split into partial fractions:
∫
dx
x^2 +x− 2=∫
dx
(x− 1 )(x+ 2 )=∫ [
1
3 (x− 1 )−1
3 (x+ 2 )]
dx=1
3∫
dx
x− 1−1
3∫
dx
x+ 2+C=1
3ln(x− 1 )−1
3ln(x+ 2 )+Cusing ∫
dx
x−a=ln(x−a)+CWe can tidy the answer up and write:
∫
dx
x^2 +x− 2=1
3ln(
x− 1
x+ 2)
+CB.In this case the denominator does not factorise, and the only option is
to complete the square (66➤
). We have:
∫
dx
x^2 + 2 x+ 2=∫
dx
(x+ 1 )^2 + 1Now this looks like the inverse tan integral (256➤
), which we can
get by substitutingu=x+1,du=dx:
∫
dx
(x+ 1 )^2 + 1=∫
du
u^2 + 1=tan−^1 uso ∫
dx
x^2 + 2 x+ 2=tan−^1 (x+ 1 )