Compare and contrast the “trig integrals” method with the “substitution” method.
- Compare and contrast union suppression and union substitution strategies
In the middle east or MENA region, compare and contrast the strategies of isi (import substitution industrialization). (Define both and explain their differences)
compare and contrast the marginal rate of substitution of perfect substitutes and perfect compliments. Use diagrams and algebra to aid your exposition.
1. Begin by making the substitution u=ex . The resulting
integral should be ripe for a trig substitution.
2. Make a choice of trig substitution based on the ±a2±b2u2 term
you see after the substitution. With the right choice, after
substituting and rewriting using sin/cos, you should again have
something fairly nice to solve as a trig integral.
3. The substitution sin(2θ)=2sin(θ)cos(θ) is useful after you
integrate.
4. Don’t forget to back substitute (through several
substitutions!) until everything is in...
Compare and contrast the current rate method and the temporal method of accounting for translation exposure.
Trig Substitution
х S 3 dx (1+x4)
Use Trip to evaluate the following integrals using Trig Sub
2. Use partial fractions to evaluate the following integrals dar 212 +12 3-4 dr:
7. Consider the following integral: J 36 - 22 (a) Use trig substitution to rewrite the integral as a new integral which involves only 0. You don't have to simplify this integral or finish evaluating the integral. Start by filling in the following blank: The trig substitution I'm using is x = Next, set up the appropriate reference triangle. (b) Using the same trig substitution from part (a), express tand in terms of x.
3. Use the u-substitution method to calculate the following indefinite Integrals a. S(x2 - 4)2x dx u= b. Sx?e**dx u= dur C. Sx sinx? dx U= dus
USING TRIG SUBSTITUTION:
Evaluate the integral 1 22 25dx 22x2 – 25