5

Find the differential dy of the function y = Xv2+x...

Question

Find the differential dy of the function y = Xv2+x

Find the differential dy of the function y = Xv2+x



Answers

Find the differential dy of each function. $$ y=\frac{e^{-x}}{x} $$

Again it has to take the differential of a bunch of different functions. So we just need to basically take the derivative of the function. Uh So here's the first one we have is either the minus X. Where the derivative E. To the minus X. Is minus E. To the minus X. So driven of E to the X is either the X. And then we need to take the derivative of minus X. And that's just minus one. So we get the Y equals minus E. To the minus X. Dx. Mhm. Now here we have Y equals either the sine of X. So f of X equals either the sine of X. So the derivative of this is either the sine of X. And then we need to take the derivative of this which is a co signer Becks and that's the derivative of that. And then dx So we have cosine of X. Either the sine of X. Dx the differential. Why? Now we have let's see here, I should actually write this. Um So we can see the derivative a little better. Uh So here we have um Y equals X times E. To the X. So we have to use the product rule. So X Derivative X is one. So then we get multiplied by this term. The second term is either the X. And then we get there first term, the times the derivative of the second term and the deliver their second term is either the act. So we get plus X. Either either the X. And so that's the F. Prime. So we get the Y equals this times dx or simplifying. We get Y equals one plus X times either the X. Dx And this last one here we have F of X. I just rewrote it. Like this is either the minus X times E to the minus X to the minus one. So we take the first term And take the derivative of the second term. The director of this is -1 X to the -2. And then we take this term times the derivative of this and derivative. This was just minus E to the minus x. And so we get this left over And then we can factor some stuff out. We have a -1, both both terms. We have a one over x in both sides in both terms. And we haven't even the minus X in both terms. And that leaves us over here with one over X. And that leaves us over here with one. So we get the Y equals minus one over X times the quantity 11 over X plus one times E. To the minus x. Dx. And so there's the differential for that.

Again it has to take the differential of a bunch of different functions. So we just need to basically take the derivative of the function. Uh So here's the first one we have is either the minus X. Where the derivative E. To the minus X. Is minus E. To the minus X. So driven of E to the X is either the X. And then we need to take the derivative of minus X and that's just minus one. So we get the Y equals minus E to the minus X. Dx. Mhm. Now here we have Y equals either the sine of X. So f of X equals either the sine of X. So the derivative of this is either the sine of X. And then we need to take the derivative of this, which is a co signer Becks and that's the derivative of that. And then dx So we have co sign of X. Either the sine of X dx. It's the differential. Why? Now we have, let's see here, I should actually write this. Um So we can see the derivative a little better. Uh So here we have um Y equals X times E. To the X. So we have to use the product rule. So X Derivative X is one. So then we get multiplied by this term. The second term is either the X. And then we get there first term, the times the derivative of the second term and the deliver their second term is either the X. And we get plus X. Either the either the X. And so that's the F. Prime. So we get the Y equals this times dx or simplifying. We get Y equals one plus X times either the X. Dx. And this last one here we have F of X. I just rewrote it. Like this is either the minus X times E to the minus X to the minus one. So we take the first term And take the derivative of the second term. The director of this is -1 X to the -2. And then we take this term times the derivative of this and derivative. This was just minus E to the minus x. And so we get this left over And then we can factor some stuff out. We have a -1, both both terms. We have a one over x in both sides in both terms, and we haven't even the minus X in both terms. And that leaves us over here with one over X. And that leaves us over here with one. So we get the y equals minus one over X times the quantity 11 over X plus one times E to the minus x. Dx. And so there's the differential for that.

This probable were given any question. And whereas isn't transition time there itself? Why X So we're gonna take their took old terms with respect. Ex starting from likeness that you have each of the excellent boy. But by buying narrative Oh, he function Excell. Why now? They're right inside. So we have won by this by the ex. He have you i d x. Because why the bunch of next? All right, so for this term right here, we're going to use caution. But also, we have each of the ex awhile mudslide by, um, the 1st 1 chin looks like by fortune the denominator y minus first function both blocked by the function you nominator divided by function that is equal to or minus D by he X. So let's group old terms with divine e X on one side. Um, less bird strike this morning as each of the excellent Why multiply by one Weisberg minus X over. Wife spirit must buy. Buy each of that. So why he won? Yes, that is equal to one months. He Why the X? Okay, so now we are ready to group over time. Do you have any eggs on one side. So we had you mind? Yes. Oh, um X over wine sprayed each of the excellent. Why? Minus one. And that is equal to each of the excellent wine or water minus one. All right, we can then, right? Do you want guys to be equal to, um, e to the X over? Why, minus one? There's something you wanted by. Why divide this by X times Each of the excellent wine minus voice. Greg, you like? Why spread? This was just, like ever went up for so that we will find the answer to be you want. The X is equal to Why times you to the exit awhile. But it's more spirit you want, but x times seated Excellent boy minus warrants for

This question asks us to solve the differential equation. D y over DX is act square root of Why not first things First we need to get the wise on one side and the exes on one side. Therefore, divide both sides by scored of why and we get d y over scored of Why now multiply both sides by DX and we get equals X dx Take the intro of both sides integral of one over squirt of Why choose words? Why? And then increase the exported by one to integrate and divide by the new exponents. And don't forget our CR.


Similar Solved Questions

5 answers
32 11 At 0 8 3 3 Praduct rule
32 11 At 0 8 3 3 Praduct rule...
5 answers
Solve equationx2 + Mlx + 184X 5) ~2x + 15 X=6 4) [-7, -3]B) |-7}C1-31Solve_ 6) [3* + 4 + 4 ^&-4 0 7) /7x- 8' - 8 <-1B{t}of-}B64)
Solve equation x2 + Mlx + 18 4 X 5) ~2x + 15 X=6 4) [-7, -3] B) |-7} C1-31 Solve_ 6) [3* + 4 + 4 ^&-4 0 7) /7x- 8' - 8 <-1 B{t} of-} B64)...
5 answers
Point) Let r and $ be unknown constants and consider the linear system:6x + 8y = r Tx + sy = 7This system has a unique solution wheneverIf the above condition does not hold, then the system will have no solutions whenand infinitely many solutions when
point) Let r and $ be unknown constants and consider the linear system: 6x + 8y = r Tx + sy = 7 This system has a unique solution whenever If the above condition does not hold, then the system will have no solutions when and infinitely many solutions when...
5 answers
DxVor+1) ~ 1)?0 2/3 f6 dx T+1
dx Vor+1) ~ 1)? 0 2/3 f6 dx T+1...
5 answers
Sclereids and fibers are examples of which plant tissue? (a) parenchyma (b) collenchyma (c) sclerenchyma(d) xylem (e) epidermis
Sclereids and fibers are examples of which plant tissue? (a) parenchyma (b) collenchyma (c) sclerenchyma (d) xylem (e) epidermis...
5 answers
W 1 ] 8 J 1 | [ MVNXI RMRHaNKHaKi UD €UDOwdKI
W 1 ] 8 J 1 | [ MVNXI R MR HaN K Ha Ki UD € U D Owd KI...
5 answers
Descriptives plots1,.31.21.1 1 1.0 0.90.80.7single marriedivorcewvidowed marital
Descriptives plots 1,.3 1.2 1.1 1 1.0 0.9 0.8 0.7 single marriedivorcewvidowed marital...
5 answers
Question 4Suppose you buy home and 10 Polnts finance 5170,000 at $1,247,40 per month for 30 years: What Is the amount = of interest Use the editor to forrat your _ Paid? answer
Question 4 Suppose you buy home and 10 Polnts finance 5170,000 at $1,247,40 per month for 30 years: What Is the amount = of interest Use the editor to forrat your _ Paid? answer...
5 answers
Polnd) Comoule the Iollowig Imts Ushg / HMaptar $ nte # aoproptiate Usa NF t0 denofe & Md MiF (0 denoto -0 Ima- (-h
polnd) Comoule the Iollowig Imts Ushg / HMaptar $ nte # aoproptiate Usa NF t0 denofe & Md MiF (0 denoto -0 Ima- (-h...
5 answers
To specify better stopping guidelines in the protocol forclinical trials, the clinical investigators and trial statisticianshould carefully consider how the relative importance of thetreatment benefits versus hazards are assessed.True or false?
To specify better stopping guidelines in the protocol for clinical trials, the clinical investigators and trial statistician should carefully consider how the relative importance of the treatment benefits versus hazards are assessed. True or false?...
5 answers
Determine, simplifique hasta donde sea posible:a) (f.g)(x) = b) (x)(g f)(x) =III Dominio de Ias Funciones Dadas Ias siguientes funciones 4 h(x) =x2, p(x) = Vi-x, j6x) = x+z Determine el dominio de: Dominio de h:b) Dominio de p:c) Dominio de ;: Dominio de (p + f)(x):
Determine, simplifique hasta donde sea posible: a) (f.g)(x) = b) (x) (g f)(x) = III Dominio de Ias Funciones Dadas Ias siguientes funciones 4 h(x) =x2, p(x) = Vi-x, j6x) = x+z Determine el dominio de: Dominio de h: b) Dominio de p: c) Dominio de ;: Dominio de (p + f)(x):...
5 answers
Assume C is circle centered at the origin , oriented counterclockwise, that encloses disk R in the plane. Complete the following steps for the vector field F = (8x,Sy)Calculate the two-dimensional curl of F b. Calculate the two-dimensional divergence of F. Is F irrotational on R? d. Is F source free on R?The two-dimensional curl of F is
Assume C is circle centered at the origin , oriented counterclockwise, that encloses disk R in the plane. Complete the following steps for the vector field F = (8x,Sy) Calculate the two-dimensional curl of F b. Calculate the two-dimensional divergence of F. Is F irrotational on R? d. Is F source fre...
5 answers
The individual actually had the disease Yes Ho Positive 120 Negative 121
The individual actually had the disease Yes Ho Positive 120 Negative 121...
5 answers
Round How Rouod at How unsrers[U Amount of fencing much answers of sod(grass) much sod Aplayground is being fencing 2 decimal would 2 decimal place (grass) would built 1 nced Gs needed "PJpa1as SD need the shape to be bought to t0 be bought t0 3 enclose 1 sides L Iicalcuton involving314
Round How Rouod at How unsrers[U Amount of fencing much answers of sod(grass) much sod Aplayground is being fencing 2 decimal would 2 decimal place (grass) would built 1 nced Gs needed "PJpa1as SD need the shape to be bought to t0 be bought t0 3 enclose 1 sides L Ii calcuton involving 314...
5 answers
Which of the following would be comreci interpretation .999 confidence intorval such as 4.1 <1 < 5.6?Choose the correct answer below:.It means that 99%0 of all data values are between and There 99% chance that belvreen - and 5,6means Ihal 9926 sample means Iall between We are 99% confident Ihat Ihe interval fromand 5.6 actually does contain Ihe Irue valuc of /
Which of the following would be comreci interpretation . 999 confidence intorval such as 4.1 <1 < 5.6? Choose the correct answer below:. It means that 99%0 of all data values are between and There 99% chance that belvreen - and 5,6 means Ihal 9926 sample means Iall between We are 99% confident...
5 answers
For which of the following functions is the domain x? + y} < 4 (shown below)?fx,y) = In(4 - x2 - y) hlx,y) = Vx+y gkx,Y) = Inkx? + y _ 4)Kxy) = V4-x-y Kxy) = Vx+y+4
For which of the following functions is the domain x? + y} < 4 (shown below)? fx,y) = In(4 - x2 - y) hlx,y) = Vx+y gkx,Y) = Inkx? + y _ 4) Kxy) = V4-x-y Kxy) = Vx+y+4...
5 answers
THREE_ Determine when the following power series converge oredicerge 3. Pick radius Of convergence R and the open interval of convergence Find their (-1)(r_Anl (-)xzn (~)"x" b) Eo-0 c)ET=0 a) CR=o n+l (x+322 d) En=o-
THREE_ Determine when the following power series converge oredicerge 3. Pick radius Of convergence R and the open interval of convergence Find their (-1)(r_Anl (-)xzn (~)"x" b) Eo-0 c)ET=0 a) CR=o n+l (x+322 d) En=o-...

-- 0.028193--