5

2) x1/3 yl/} = 1...

Question

2) x1/3 yl/} = 1

2) x1/3 yl/} = 1



Answers

$$\begin{array}{c|c} x & y \\ \hline 0 & 0 \\ -1 & 1 \\ -2 & 2 \end{array}$$

This question gives us a relation in the form of a table and asks us if it is a function or not. We're given the X values 01 and two in the UAE. Values zero negative one and negative too. So what makes a relation of function well to be a function, every X value must map to one and only one. Why value? So we can have, say, an X one and a next to both mapped of Why be? And that's fine because X one maps toe one and only one. Why value and X two maps. I wanted only one my value. But if we haven't X that goes toe, why one end twi to then? That's not a right, because now we have to. Why values for this one. X So the first and second examples are fine, but the third example is not a function Well, let's take a look at the relation that were given. We see that each X value 01 and two has only one instance in this relation and it goes to one other y value zero negative one and negative too, since there's no X values that have more than one. Why value? We can say for sure that this is a function. So this relation is a function. Now, the question also wants us to say what the domain and range of this function are. Well, the domain is just the list of possible X values. And when we have the relation written out like this is gonna be pretty simple. That remain is just zero, one and two, like we see in our table the range with a list of possible why values is gonna be the other side of the table zero negative one and negative too. And so these are our domains and ranges for this function that we know is a function because each x goes toe one and only one y value, and that's your final answer.

Okay, We're going to talk about where the function why is equal to two X minus one to the 1/3. Power is continuous. And another way to right. That is the cube root of two eggs minus one That might help some of us understand this a little bit better. So we know that for even brute radicals for even root radicals we cannot take cannot have a negative number inside. But we can for our troops so we can have positive numbers inside the odd route. Radical. We can have negative numbers. We have zero, and it doesn't matter. So that is telling me that on this function is continuous misspelled. That is continuous for all exercise.

Hello, everyone. Today we're gonna find at least the 1st 4 terms of the general solution to the differential equation. Why Prime minus two X Y equals zero as a power. Siri's about the 00.0 equals negative one. So we're gonna do a little bit of substitution. I'm gonna write t as experts one so that X is equal to t minus one. I'm gonna write why, as a power siris of tea. So it's equal to the sum over all Angry, delicate zero of a NT to the end. And so when we take the first derivative, it becomes some of any greater than or equal to one of end times a n times t to the n minus one. So now our equation becomes why Prime minus two times T minus one tense. Why and when we plug in are y of tea. We get some in greater or equal to one and a n teach the n minus one minus two turns to some and greater or equal to zero a n t. To the endless one plus two time some in greater or equal to zero of a n t to the end. So now we're gonna pull some numbers out, and then we're gonna group the rest of the coefficients in so that they fit inside to some that has the same index. So after a little re indexing and some pulling out of constants, we get to a zero. It was a one plus the sun of end. Great Article 20 of the quantity and plus two times a M plus two just two a. M plus one minus to a n all of that times t to the endless one, which equals zero. This gives us the system of equations to a zero. It was a one equal zero, then to a two, because to a one minus to a zero equals zero and three a three. Thus to a two minus to a one equals here. And so now, solving the system, we have that a one it's equal to negative to a zero. A two is equal two to a zero minus to a one over too, which, by substitution and simplifying, gives us three a zero and a three becomes to a one minus two. A two over three, which, after substitution and simplification, gives us negative 10 over three times a zero. So now our way of tea. The 1st 4 terms becomes a zero times one minus Tootie those three T squared minus 10 over three t tube plus whatever. And when we make the substitution into a function of X since remember, T is equal to X plus one, this becomes a zero times one minus two tends experts, one plus three times X plus one square minus 10 over three times experts one cute plus whatever and there we have it.

In this problem we're being asked to expand the given expression. So we have Y -1 over why being squared. Now, even though this why by this one of why isn't a binomial? We can use our formula for a binomial difference being squared to help us simplify this expression. So remember it works like this. If we have a minus B being squared, the simple finance er is a squared minus to a B plus B squared. Where A is the first term of the prophecies. Which in this case is why and be as the second term in the prophecies. And then this problem that would be one over Y. So we're going to our substitute these expressions into our formula. So first we'll square why? Well that's just why squared Then we'll subtract two times y times one over why. And then lastly we're going to have to square one over why? So now let's go ahead and simplify. Well our first terms all set. It's simply just why square Now for our middle term, those wives are gonna cancel each other out. So we're simply just left when negative too. Now for our last term we just have to square the numerator and denominator. Well one square is one and when we square y we get y squared and now there's nothing else we can do to simplify. So we now we have our final simplified answer


Similar Solved Questions

5 answers
3,4.11 1 E Homework: 7 Chapter U Part 21 1 u1
3,4.11 1 E Homework: 7 Chapter U Part 2 1 1 u 1...
5 answers
HydeaumontChart..Use the binomial series to find the Maclaurin series for the function; f{x) V1 -f(x) = 1 +n =1Need Help? RiII call%71 points LarCalc11 9.10, .025.MI. Use the binomial series to find the Maclaurin series for the function; f(x) = Vi+xf(x) = 1 +3 .7 . 11 (4n n = 2 5) Need Help? Read It Kastec It Talk Jto 4 Tutor
HydeaumontChart.. Use the binomial series to find the Maclaurin series for the function; f{x) V1 - f(x) = 1 + n =1 Need Help? Ri II call% 71 points LarCalc11 9.10, .025.MI. Use the binomial series to find the Maclaurin series for the function; f(x) = Vi+x f(x) = 1 + 3 .7 . 11 (4n n = 2 5) Need Help?...
5 answers
#4) Evaluate:Jc y2da + xzdy + rydz from (0,0,0) to (1,3,-1) and from (1,3,~1) to (0,3,0)_ where C consists of the line segments
#4) Evaluate: Jc y2da + xzdy + rydz from (0,0,0) to (1,3,-1) and from (1,3,~1) to (0,3,0)_ where C consists of the line segments...
5 answers
Draw 9rwph malch Ihe doscrption given_ has 5 negative danvative Over 5) and (2,0 Wnich = the Iollowing graphs matches descnption?positive derivative Over ( 5,2), and f ( - 5) = but ( (2) doas nct exist
Draw 9rwph malch Ihe doscrption given_ has 5 negative danvative Over 5) and (2,0 Wnich = the Iollowing graphs matches descnption? positive derivative Over ( 5,2), and f ( - 5) = but ( (2) doas nct exist...
5 answers
Pseudomonas fluorescens produces fluorescent pigment: The color of the colonies is an example of which of the following?adaptation to the environmentgcnotypcphenotypechange in DNA base composition
Pseudomonas fluorescens produces fluorescent pigment: The color of the colonies is an example of which of the following? adaptation to the environment gcnotypc phenotype change in DNA base composition...
5 answers
Let f (u; v)cosv + sin u) and g (x, % 2) (x2 + ry , 3xz) _(Use symbolic notation and fractions where needed.Give your answer as comma separated list of a,e , f from;1D(f 0 g) (0, 3, 4)
Let f (u; v) cos v + sin u) and g (x, % 2) (x2 + ry , 3xz) _ (Use symbolic notation and fractions where needed.Give your answer as comma separated list of a, e , f from ;1 D(f 0 g) (0, 3, 4)...
5 answers
A3.10 mlsspeed afblock A VAf)? What i5 the final = WWhatis the direction of VAf? kinetic energy before the collission? What i5 the total Whatis the total Kinetic energy after the collission?86.90 mlsC4 60 m/sRightE: LeftR 36.5 ]6.27.0 ]4.32.5 ]25.0 J
A3.10 mls speed afblock A VAf)? What i5 the final = WWhatis the direction of VAf? kinetic energy before the collission? What i5 the total Whatis the total Kinetic energy after the collission? 86.90 mls C4 60 m/s Right E: Left R 36.5 ] 6.27.0 ] 4.32.5 ] 25.0 J...
5 answers
Suppoeo the lollowing dala raprosant Iho rtings (on a scale frorn to 5) for & cerain srart phono pomo, wvith reprosonuing poor rabng Complole parts (0) through (d) belmStrFrequengy 2180 2587 4134 3710 11,010Conslruct discralo probablity distribution Ior Ihe random vanable B12r (52 P(e)(Round lo Ihreo decimal places a8 needed )
Suppoeo the lollowing dala raprosant Iho rtings (on a scale frorn to 5) for & cerain srart phono pomo, wvith reprosonuing poor rabng Complole parts (0) through (d) belm Str Frequengy 2180 2587 4134 3710 11,010 Conslruct discralo probablity distribution Ior Ihe random vanable B12r (52 P(e) (Roun...
5 answers
9_ [-/2 Points]DETAILSSPRECALC7 5.1.047.Consider the following. t = 191(a) Find the reference number t for the value of t.(b) Find the terminal point determined by t (x,Y) =Need Help?ReudItWalich It
9_ [-/2 Points] DETAILS SPRECALC7 5.1.047. Consider the following. t = 191 (a) Find the reference number t for the value of t. (b) Find the terminal point determined by t (x,Y) = Need Help? ReudIt Walich It...
5 answers
Find all real numbers on the interval [0,2r) that satisfy the equation. Use radian measure. 2 sin 2+" sinX =The solution set is comma separate answers as needed (Simplify your answel_ Type an exacl answer, using x as needed Use =
Find all real numbers on the interval [0,2r) that satisfy the equation. Use radian measure. 2 sin 2+" sinX = The solution set is comma separate answers as needed (Simplify your answel_ Type an exacl answer, using x as needed Use =...
5 answers
Which of the following is equation of circle on positive y-axis r =5 sin 60 Scos 60 r= 6 cose Or = 6 sine
Which of the following is equation of circle on positive y-axis r =5 sin 60 Scos 60 r= 6 cose Or = 6 sine...
5 answers
02 (4 points}Foreach of Ie iolkllng seres. detcimine Ihe series converge ar diverge Be sure i0 Menuly whlch iESt you are Uslng and check dny conditlons required (0 use Ine test467)"uni(4 ()[email protected])22 WIch (I any) Of the above series converge absolulely?O1aIqaIne} crop an WIqU PDI ( ( clkk [xoweu
02 (4 points} Foreach of Ie iolkllng seres. detcimine Ihe series converge ar diverge Be sure i0 Menuly whlch iESt you are Uslng and check dny conditlons required (0 use Ine test 467)" uni(4 () [email protected])22 WIch (I any) Of the above series converge absolulely? O1aIqaIne} crop an WIqU PDI ( ( clkk [xo...
5 answers
The joint probability density function of two random variables X and Y is given by fxy(z,y) = {8 0 < € < 1,0 < y < 1; otherwise _ Note: el = 2.718281828Find the P(Y > 0.7+ X): use symbols such as %][The answer should be a number rounded to five decimal places, don
The joint probability density function of two random variables X and Y is given by fxy(z,y) = {8 0 < € < 1,0 < y < 1; otherwise _ Note: el = 2.718281828 Find the P(Y > 0.7+ X): use symbols such as %] [The answer should be a number rounded to five decimal places, don...
5 answers
Find the centroid of the region lying underneath the graph of the function f(x) Vx over the interval [0, 17]. (Use symbolic notation and fractions where needed. Give your answer aS point's coordinates in the form (* *) )
Find the centroid of the region lying underneath the graph of the function f(x) Vx over the interval [0, 17]. (Use symbolic notation and fractions where needed. Give your answer aS point's coordinates in the form (* *) )...
5 answers
Briefly compare meiosis with mitosis, state what occursduring fertilization?
briefly compare meiosis with mitosis, state what occurs during fertilization?...
5 answers
Let set A be: A = {all baby high chairs, 0, 5,Easter Bunny}: Consider the following statements: S A 0 € AWhich of the following is/are necessarily true?Both statements are true_Statement (1) is not necessarily true but statement (2) is trueStatement (1) is true, but statement (2) is not necessarily trueNeither statement is necessarily true
Let set A be: A = {all baby high chairs, 0, 5,Easter Bunny}: Consider the following statements: S A 0 € A Which of the following is/are necessarily true? Both statements are true_ Statement (1) is not necessarily true but statement (2) is true Statement (1) is true, but statement (2) is not ne...
5 answers
External toolAvailable after Feb 21 at 3.59amPart CWhat is the frequency of this wave Express your answer in hertz to two significant figures.AzdHzSubmitRequest AnswerProvide Feedback
external tool Available after Feb 21 at 3.59am Part C What is the frequency of this wave Express your answer in hertz to two significant figures. Azd Hz Submit Request Answer Provide Feedback...

-- 0.029104--