(1) (50%) We have discussed in class the fact that differentiation is easier tha
ID: 2886618 • Letter: #
Question
(1) (50%) We have discussed in class the fact that differentiation is easier than inte gration in the following sense: If a function of is given as a composition of the usual functions in our tool bag, like . logr. e'. cosr. sin and such, then you are in principle always able to differentiate this function in a systematic manner. However, this is not the case for integration, since there are easily stated integrals that cannot be evaluated in terms of our tool bag of functions. Some examples of integrals that cannot be evaluated are as follows: dr jurydz, jw.dz. /sinler)dz I. (30%) Using MATHEMATICA, evaluate the following indefinite inte- grals. Make MATHEMATICA simplify the analytic (precise) answer it pro- vides in each case. You will see that sometimes the answer it gives is in terms of functions that we know, other times it expresses its answer in strange functions that cannot be written in terms of functions from our tool bag.Explanation / Answer
1.>
z= integrate[(x^23)*((e^x)^2),x];
2.>
z= integrate[(x^24)*((e^x)^2),x];
3.>
z= integrate[(x^25)*((e^x)^2),x];
4.>
z= integrate[(x^26)*((e^x)^2),x];
i hope you understand the concept.
if you want any further clarification, please ask in the comment section.
thanking you
Related Questions
Navigate
Integrity-first tutoring: explanations and feedback only — we do not complete graded work. Learn more.