9.3.4 Choosing Effective Function Decompositions Flashcards
1
Q
Choosing Effective Function Decompositions
A
- Experiment with different choices for u when using integration by substitution. A good choice is one whose derivative is expressed elsewhere in the integrand.
- When working with integrands that include trigonometric expressions, it is sometimes necessary to rewrite those expressions using trig identities.
2
Q
note
A
- When applying integration by substitution to composite
functions, there may be several choices for u. - In the case of a rational function, the best choice is often the denominator.
- In this example, du/2 produces the expression in the
numerator. - You may want to express trigonometric integrands in terms of sine and cosine before integrating.
- Since the denominator has cosx raised to a power, choose u to be cosx. Then –du produces the expression in the numerator.
3
Q
Which of the following is the best choice for au-substitution for the integral∫2x(x^2−4)^6dx?
A
u = x ^2 − 4
4
Q
Which of these expressions is the best choice for making a u-substitution for the integral∫sin^32xcos2xdx?
A
u = sin 2x
5
Q
Which of the following expressions creates a working u-substitution that solves the following integral?
∫x^3sinx^2dx
A
u = x^ 2
6
Q
What is the best choice for a u-substitution for the integral ∫e^cotx csc^2x dx?
A
u = cot x
