5

Without evaluating the integral, prove } < J/' T+anzdr < &Taylor scrics PL Fiud the Tarlor Series of the followiug fctions f(r) centered at fo: (#) f...

Question

Without evaluating the integral, prove } < J/' T+anzdr < &Taylor scrics PL Fiud the Tarlor Series of the followiug fctions f(r) centered at fo: (#) fW)=x-?+r-]at Io = 0 (W) f() =? #+I-]at Io = [ (c) f(r) = cos(2r?) #t ro = 0 (d) f(r) = In(r + [) at Io = 0

Without evaluating the integral, prove } < J/' T+anzdr < & Taylor scrics PL Fiud the Tarlor Series of the followiug fctions f(r) centered at fo: (#) fW)=x-?+r-]at Io = 0 (W) f() =? #+I-]at Io = [ (c) f(r) = cos(2r?) #t ro = 0 (d) f(r) = In(r + [) at Io = 0



Answers

Evaluate the iterated integral. $$ \int_{0}^{\pi} \int_{0}^{1+\cos \theta} r d r d \theta $$

In this problem of line integral. We have to evaluate F. Daughter there along the patsy. And now we have given the function F. Of X. Y. And Z. Is equal to X. Is square. I. Plus why is square J. Plus 30 square K. And The courtesy. It's such that artie is equals two two scientists I plus the cost TJ to cause T. J. Bliss one divided with two which is half the square K. And the value of T. is wearing from 0 to Pi. Now first we have to evaluate dear. That means we have to differentiate itself differences of sinus costs. So this is to cost I. The transition of course is minus sign. So we have to Ready this -2 aside. Did you? And differences in of T. Square is to T. So this is where they would be half multiplied with two T. Z equals two T. So plus tiki. Now FDR data from here we say that X. Is equal to to 70. Why is equal to two costea. And that is equal to one divide with two T square half of X. Wiser. So F. Of X, Y. And Z is equal to X square. That means to scientific Holy Square. Which is equal to four science quality. Why is square? So this is here to coast the holy square. So which is four Courses Square. T. and 30 square. So this way you would be That is equal to one divide with two T square. So there's one divide with food T. To the powerful and this is I. And they said G. And this is key Now F. Daughter dear that means here also term but we didn? T that in four. Sine squared is multiple. Early to cost is so they said equals to four. Sign is square. T. Multiplied by two. So this way they will be four multiplied by two which is eight. So eight Sinus Square T. And cost -2 signed a multiple with four. So they said -8 course is square T. scientists and one divide with 42. The powerful is multiple. Pretty so this is What they were with 42. The power five and DT now we have the integration limit we can replace it with zero to pi. So this is zero to pi. Now we have to integrate it. So integration of eight. Sinus square T. Cost differentiation of Sinus cost. So we can write it as it divided with three signed QB. And yeah And differentiation of course is minus sign. So this way they would be -8 divide with three cause Q. T. So this will be minus minus plus and one divide with four. So this value would be When they were with four T. to the power six divide with six. Now limits limits are from 0 to bye. And now when we put upper limit so sign pi is equal to zero and caused by is equals two minus one. So this valuable b minus one cube. That means minus eight divide with three. Now this is t putting the value pie so this value will reply to the power six. This age Try to the power six divided with 24 and minus lower limit, putting the value 0700 and cost zero is equal to one. So this age It divided with three and putting tichkule 200. Now when we evaluated so minus eight w three minus 80 value three. So this really would be pi to the power 60 were with 24 minus 16 divided with three, which is the right answer. Yeah.

I have to evaluate this year Phoenix Article 20 then try and create I'm fine. five x. and phone love line 21 they got here directly one over. Well finance the victims signs better Last to sign three playing in last food find private play next time. Go on. We have to nine going to want it finance with the on board here but we have to be won over to cynics. We had this two times correct positive to find finance started giving a so all the links negative goals for it. Next to find by bit finding that is announced last four reporting make it there for six seconds and so on without blood Both 20 in negative. Oh right to it. Mr and guardian. My calculations here discusses with this discovered the strong and just kind of this blast so coming out to be we have and then uh who's and correct the Cuban are the one over to sign next this will be one negative close to it Last 4-8 negative or let me do it. So it's very hard to be we know one negative cost for into wells or to my next that is giving Who's buying for 11 x. Over to sign next can talk and we get signed with 11 it's over spanish water now an integral over the river and gigolo fine where 11 Next Door World by next year we know that 10-11 to my next that has given us we having people of science positive for the most part find the eggs for the deadline violet and form last time 21 X. And here we have. Yeah that's coming up to the negative politics. So we are negative politics and negative, Both free and over three negative. Well play that over fine and so negative polls 41 x 441 and Andrea plus it has gone. So thank you.

This question. We have trouble integration for or science eater, he said. You are, he's either and the limits are See you are forced to you call sign Sita and zero for you oversell if we take the first integration when we have bubble integration off all 43 sign Zifa the or thes either. If we take another indication, we will have 1/4 designed for four seater sign. See the these either, which is equal to 1/20. Thank you.

This problem we'd like to evaluate the given. Iterate an integral the integral from zero to pI over two of the integral. From zero to co sign data. Even assigned data. DRD data This question is challenging understanding of multiple intervals in particular is challenging an understanding of how to evaluate Multivariate calculus into girls to do so. We're going to use single variable integration technique step by step and step. When we evaluate our inner integral here. That's integral. Zero to go stay to either the science data D. R. And step two. We plug the result of step one into our outer integral that zero to pi over two D. Data which we saw. So proceeding to step one or inner integral is integral to Costa. You signed dated? Er as you mentioned, This evaluates as East nine data times are from 0 to cost data plugging in our balance transforms our outer integral to the form and real zero to pi over two close to either the same data data. Now integrating out out of integral, even the sign data has derivative coast data. Either assigned data that are integral, evaluate simply even assigned data from zero pilot too. This evaluates each of the first one is either zero or E -1.


Similar Solved Questions

5 answers
ZE Whelkez Zhe FeLLauiag fedies CeAViges Lzaly XE LezL n
ZE Whelkez Zhe FeLLauiag fedies CeAViges Lzaly XE LezL n...
5 answers
4 Examine z2 _ I . Are there any attracting fixed points when p == 4.
4 Examine z2 _ I . Are there any attracting fixed points when p == 4....
5 answers
Alkyl halides and alcohols synthesized through addition reactions cAn be transforied into Tariery of products usiug substirution reactions Consider these alkyl chlorides:Which of the following reaction conditions would result in the highest rate of substitution for compound B?All conditions will produce the same reaction rate[Br-]-0.1 M[I-J-0.1 M[Br-J-0.2 M
Alkyl halides and alcohols synthesized through addition reactions cAn be transforied into Tariery of products usiug substirution reactions Consider these alkyl chlorides: Which of the following reaction conditions would result in the highest rate of substitution for compound B? All conditions will p...
1 answers
A fisheries researcher wishes to conclude that there is a difference in the mean weights of three species of fish (A,B,C) caught in a large lake. The data are shown in Table $5.42$. Using ANOVA method, test the hypothesis at $\alpha=0.05$ level. $$ \begin{array}{l} \text { Table 5.42 Data for Problem } 5.37\\ \begin{array}{l|l|l} \hline \text { A } & \text { B } & \text { C } \\ \hline 1.5 & 1.5 & 6 \\ \hline 4 & 1 & 4.5 \\ \hline 4.5 & 4.5 & 4.5 \\ \hline 3 &
A fisheries researcher wishes to conclude that there is a difference in the mean weights of three species of fish (A,B,C) caught in a large lake. The data are shown in Table $5.42$. Using ANOVA method, test the hypothesis at $\alpha=0.05$ level. $$ \begin{array}{l} \text { Table 5.42 Data for Proble...
5 answers
Calculata tna mass (n grams) of PCIs gas roquutod lo produco 750 KJ of onorqy in tho prosonce 0l oxcoss P4010 P401o (S) PCIs (9) 10 ClgPo (9)AriallJ (1Zpl
Calculata tna mass (n grams) of PCIs gas roquutod lo produco 750 KJ of onorqy in tho prosonce 0l oxcoss P4010 P401o (S) PCIs (9) 10 ClgPo (9) Ariall J (1Zpl...
5 answers
Ra) Let 1 < pi < C, i = 1,2, LPi (0 , p) . Prove thatnsatisfy Ci_1 =1, and fi pif1f2 fndp] < Ilfillpi Ilf2llpzfnB Pn
Ra) Let 1 < pi < C, i = 1,2, LPi (0 , p) . Prove that n satisfy Ci_1 =1, and fi pi f1f2 fndp] < Ilfillpi Ilf2llpz fnB Pn...
1 answers
Generalize Exercise 7 to transform an $n$ th-order linear equation $$ y^{(n)}+a_{n-1}(x) y^{(n-1)}+a_{n-2}(x) y^{(n-2)}+\dots+a_{0}(x) y=f(x) $$ into an $n \times n$ first-order system.
Generalize Exercise 7 to transform an $n$ th-order linear equation $$ y^{(n)}+a_{n-1}(x) y^{(n-1)}+a_{n-2}(x) y^{(n-2)}+\dots+a_{0}(x) y=f(x) $$ into an $n \times n$ first-order system....
5 answers
() LAacly three of them scored above 640. 25. The annual rainfall (in inches) in certain p 40,6 = 4. What is the region is normally distributed with probability that in 2 of the rainfall will exceed 50 next 4 years the inches? Assume that the rainfalls in different independent: years are
() LAacly three of them scored above 640. 25. The annual rainfall (in inches) in certain p 40,6 = 4. What is the region is normally distributed with probability that in 2 of the rainfall will exceed 50 next 4 years the inches? Assume that the rainfalls in different independent: years are...
5 answers
Solve each compound inequality. Use graphs to show the solution set to each of the two given inequalities, as well as a third graph that shows the solution set of the compound inequality. Except for the empty set, express the solution set in interval notation.$$x>3$ and $x>6$$
Solve each compound inequality. Use graphs to show the solution set to each of the two given inequalities, as well as a third graph that shows the solution set of the compound inequality. Except for the empty set, express the solution set in interval notation. $$x>3$ and $x>6$$...
5 answers
The graph of each equation is a parabola. Find the vertex of the parabola and sketch its graph. See Examples I through 4.$$y=x^{2}+4 x-5$$
The graph of each equation is a parabola. Find the vertex of the parabola and sketch its graph. See Examples I through 4. $$ y=x^{2}+4 x-5 $$...
5 answers
If > =cos (Ktwhere A. and are constants; find dy/&.
if > = cos (Kt where A. and are constants; find dy/&....
5 answers
What are the salient features of secondary structure of proteins?
what are the salient features of secondary structure of proteins?...
5 answers
Calculate the formula weight for CopperlIl) sulfate using the periodic tableQuestion 4Calculate the formula weight for Nickel(ll) chloride using the periodic table
Calculate the formula weight for CopperlIl) sulfate using the periodic table Question 4 Calculate the formula weight for Nickel(ll) chloride using the periodic table...
5 answers
8 40 ev: 5.0ev: = 34e" 8 1.96 0.51 1 Question d tott langer wave 077ins Org " sunace when nan phoiont aaveletunctbn Donmhes shoneeJulace Lu
8 40 ev: 5.0ev: = 34e" 8 1.96 0.51 1 Question d tott langer wave 077ins Org " sunace when nan phoiont aaveletunctbn Donmhes shonee Julace Lu...
3 answers
0-3 (25 pts:) Orthogonal Frequency Division Multiplexing The following bit sequence will be transmitted using the OFDM technique that has sub-carriers Assume that the signab has symbol rate of and sampling frequency is sample per symbol: Draw the waveform of each subeaurrier if BPSK modulation scheme is preferred for generaling the OFDM signal. Show your calculations and explain your drawing clearly.-1,-1,
0-3 (25 pts:) Orthogonal Frequency Division Multiplexing The following bit sequence will be transmitted using the OFDM technique that has sub-carriers Assume that the signab has symbol rate of and sampling frequency is sample per symbol: Draw the waveform of each subeaurrier if BPSK modulation schem...
5 answers
7.8 Exercises 03: Determine whether cach integral convergent divergent. Evaluate those that are convergent.dx 218/2 Solutiondx N1 + XJz e-bp dp
7.8 Exercises 03: Determine whether cach integral convergent divergent. Evaluate those that are convergent. dx 218/2 Solution dx N1 + X Jz e-bp dp...

-- 0.020403--