5

The rectangular coonJlnates of a Foln: are glven_ Plot the Foin: .(-TVi,-Jvz)EmEa-10Flnd 1W? sets of pclar ccordinate; icr the pcint fcr 5 9 27.(7, 6}(sialler r-val...

Question

The rectangular coonJlnates of a Foln: are glven_ Plot the Foin: .(-TVi,-Jvz)EmEa-10Flnd 1W? sets of pclar ccordinate; icr the pcint fcr 5 9 27.(7, 6}(sialler r-value)(larger r-value}

The rectangular coonJlnates of a Foln: are glven_ Plot the Foin: . (-TVi,-Jvz) Em Ea -10 Flnd 1W? sets of pclar ccordinate; icr the pcint fcr 5 9 27. (7, 6} (sialler r-value) (larger r-value}



Answers

The vertices of $W X Y Z$ are $W(2,4), X(-2,0)$ $Y(-1,-7),$ and $Z(9,3)$ Is $W X Y Z$ a rectangle? Explain.

Okay, so we draw our coordinates first, and then we just, um You draw the points who collects them. So first point is 4 to 5 and then 465 So we have ah, four. And then to out 4 to 5 d. Like right here. So four, two out. Five up. And then 465 before six. Um, you should be out here. Five up to be, like right here. Officials mark that out. It's six for to Okay, there's one another. They have 468 So that's 46 and then three above this. Right? So would be up here. Stals connect that. The next point is 865 So we go out eight six. So here and five up is right here. If you see that, that actually forms another corner of the box. So now we've got three dimensions defined. We could just fill in the rest of the box. They're good

This question were given a series of points and we have to plot them in a 10 x 10 window. So start withdrawing in 10 x 10. So we have 123456789 10, Wolf 123456789 10 123456789 10 12,345,678,910. And uh this is kind of a hand sketch. You can do more accurately in decimus. Should you like to? So A. Is given as negative five, negative 3.5. So A. Apart and blue. We got negative five just here And -3.5. And she's down here. Here's A. Next we have B. Which is that they have to to here's B. We have Q. Which is at 1/1 half. Here's Q. We have d. Which is at 41 just up here. And we have E. Which is at 7, 2.5. Seven Up 2 1/2. Here's E.

Prime number 19, So get volumes. You goto X squared h constraint equation is two x plus a h equals 1 20 or ages to go toe 1 20 u minus two x So given volumes you go to 1 20 x squared minus two x cubed Find V prime, which is to 40 X minus six X squared. Set that equal to zero software X so X is equal to 0/40 maximum value or probably not going to use a zero. We'll probably is the 40 so there'll be 40 centimeters. Then we can calculate the height, which is also 40 centimeter, so all tumult dimensions air 40 by 40 by 40 centimeters.

So let's start with the problem. You have been dealing pythagorean theorem. So here we have a rectangular solid. I'll make the africa. Okay, this is the rectangular solid. Uh let me just label the things given. Okay, this is F. This is G. This is H. This is E uh we have a B C. Uh D. And over here. Okay, so we have been given a tangle of solid. A B C D E. F. G. Alighted A B C D E F G H. This is a rectangle of solid. And in a part, we have been given uh the face diagonal, face diagonal. Ch I'll tell you what is face diagonal. See this is a face and dragging an apparatus is there in it? Okay, so it has given ch equals 17. Ngh measures a G. H. Is this particular edge and this measures eight. And we have F. G equal to six. So we have to find how long is a. G. And in be part, we have been given A G. Equals to 50. F. H. Equals 15 E. Equals two party equal to 40 E. F. Equal to three. Then how long it is? F. G. Okay, there's all things we have to find. Okay, so let me just mark those things. Whatever is given in this. So G. H. It has given us eight. Okay. And F. G. It has given us uh Mm six. Okay. And what else do we have We have been given this face diagonal is 17. Okay, But we have not been given the height of this. See this is the length of, this is great but we have not been given the height over. Okay, So first we have to find the height. Okay, So what I'll do is you can see this triangle. Okay, this is the right angle triangle because we have a right angle over here since it's a rectangle. So I'll take the strangle. Okay uh let me just change the color in triangle C. G. H. And just make it for you. Okay? In triangle C. G. H. Okay this is see this is G. This is H. We have 17 over here. We have eight over here. So we have to find this. Okay, I'll just tell you. Okay C. G. H. So what we can write this perpendicular square plus base square. It calls to high pony square. And like let us be okay. Okay so I like I'll just substitute uh C. And C. G. Square. C. G. Square plus G. X. Square is gonna see it square. Okay. C. D. Have substitute as uh be we're gonna be uh So I let it BCG itself. Okay so I liked like the C. D. Square plus G. H. G. Eight square is a square. Is able to see it square is 17 square. Okay, I can write C. G. Square. Go to 17 square minus eight square. I just took the eight. Oh yeah okay so this is around uh water to commerce. Somebody needs to 89 68 Squadron 64. So C. G. Square C. G. Square is equal to to 25. Okay, so C. G. Equal to on the road to 25 15. Okay. So we have found out the value of C. G. S. 15. I'll put in a box. Okay, so this is nothing but the height. Okay and this height will be throughout. Okay, this is How much 15 we have found. It does 15 so I'll Make it 15. Okay, so now we have to find what is A. G. So in order to find this A G. O. K. G. We will make a right angle Randall. Okay, so I'll just carry this E G O K E JL, correct? And it is right angle 80. So I don't I don't know E G. Okay. I have to find A G. I have A because we have found it just now. Okay, so E equals C G. Okay, C.G. to 15. Okay, we have found a because I wanted the same. Okay, so What I'll do is possible, I have to find, I'll just mark it over here so that you don't have conditions. This is also 15. Okay, this thing we have not found. Okay, so this thing we will find it. Okay, so uh All right, okay, mm in triangle I'll take the strangle Okay, E F G O K E F G N right angle triangle. Okay, F G E six and E F will be eight because see this it is parallel and this is the same red over everywhere. The same. Okay, uh victor bread, whatever you can see the same. Okay, so I like using beauty period. So you have to write by the stadium in triangle E F. G. Okay, what I can do is E. F Square plus F G square. It's going to E G Square. Okay. Easy square. So there's a squared plus six square. This comes out to be E. G square. Okay. And this E G square, is he called? 200 Egypt will be square out of it and it is how much G is called? 10? So I'll write easy call to 10 and I'll put it in the box. Okay? So uh I have found out the E. G. Okay, so I need to move on to the next page. So what I'll do is I'll copy this figure, Okay, I'll take this figure on to the next page. Okay? And there we will go at this once again, so I'll paste it. Okay? So now we have to find how much is A. G. Okay, so I'm sure this is again a right angled triangle. Like this. Okay, it is a right angle that he so I'll take out and I'll make it. Okay, So I mean just make it properly. Okay, this is like this. Okay, I'll just connect this is A. This is E. And this is the E. G. We have found it right now. It is 10. Okay, I like 10 and E. S. 15. Because we have found everywhere it is 15. Okay, so now they have to find A G. So I like in triangle E. G. Using pythagoras theory. I like pt for it. Okay, E square plus E. G. Square. It's called a G square. Okay this is uh 15 square plus 10 squares called a G square. Okay, G square will be to 25 plus 10 square is 100. Okay, this is 3 25. Okay, this is not a perfect square. So I'll have to factors. Okay this is uh 3 to 5. Okay so 3 to 5, I can write it as uh five. I can multiply 3-5 five. This is mm 65 30 65. And again I can take okay this will be five and 25 and 2 13. Okay, so I can write it as a G. Is going to five. I can take this spare out. Okay. Five route 13. Okay, so I can write a G. Is equal to five Route 13. Okay. We have been told to find the length of the diagram A G. In the first part of the question, that is a part. Okay, so we have found, okay now let's move on to the B. Part B. Part is asking uh if a G measures 50" is 40. Okay, so I think again we have to make the figure. Okay. Uh huh. They have actually changed the dimensions. Okay, so what I do is I have to take this copy. This figure one smoke. Okay, so what I'll do is just sorry for the delay, I have to take this figure once again because they have changed the dimensions. Okay, so we actually need to draw the figure once again. So okay, this was this is where we are, so I'll move it in the next page. Okay. Here from here we will start to be part Okay? So I'll paste it. And what they're saying is uh now the measures 15. What they are saying? They have said if ages 15, I have to what A rename this. Okay. A. D. C. This is B. This is E. This is F. G. H. Okay. Now they're saying A is 50 and a sorry, ages 50 E. Measures 40 E. Okay, Is this much like this? S 40. Okay. And they are saying E. F. S. Three E. F. Any of my shows three. Okay. So they are actually asking for the uh F. D. Okay. That is They have given the height. They have given. Okay. Hey, today I'm given and bread. Do they have given? Okay. And they're asking for the length? Okay. Ft Okay. That is what we have to find. So we have to find F. T. Okay, so what I lose uh can construct a right angled triangle. Okay, I'll go in the reverse way, like for finding, we went like this now so now we will come like this. So here we know this is 14. This is 50, so we can find this thing. Okay, so I like in triangle E. G. Okay. Using pythagoras terra. Okay brian do is uh is square plus E. G. Square? Okay. E. G. Square. It calls how much hypothesis hypothesis. 80 square. Okay. And we have been given a uh we have to find this E. G. Okay, so what I lose, I'll take a oh yeah, so E G square is going to uh G square minus E. Square and substitute the values A. G. Is 50 square, E square is 40 square. Okay, so what I'll lewis this is E. G. Okay. Uh 2500 minus 40 squares. 1600. So this is how much? 16 plus 8 69 100. This comes out to be 900 so I can write E. G. Uh square. Okay, this is all the the square. E. G. Is it going to root? 900. Okay. And this comes out to be 30. So I have found eggs value again. Right. Better. We just Okay, this is the figure A. G. And E. Okay, we've got this is 40. This is 50. So now we founded this as 30. Okay, so here we got for this. Now we have to find this thing. Okay, so we will consider this right angle triangle. Okay, so water light and just make the figure. Okay, this is how it looks. Okay. E. G. F. And here we know it is three. We don't know what is this? This is right angle at F. And this much is 30. Okay. So say my new spy programs, hysteria in triangle, E F G. You sing pythagoras, terra. What I can do is I can I E F square plus F G square is going to e G square. Okay, so this is what I can do. So I'll have to find a three. So I like it like this and rearrange the square is E G square minus E F square. And I'll substitute the value. E G S E G is how much is 30? E G is 30. Okay, so I liked 30 square minus E F S three. Okay. Three square. Okay, so F G square is equal to 30 square minus three square. 30 square is 903 squared is nine. Okay, so F G square is equal to 900 minus nine. This is 8 91. Okay. Has become an awkward number. Okay, so we have to find, let's see. F. G. Is according to this, uh this square is below 8 91. Okay. 50 years ago. Underwrote 8 91. 891. What I can do is is it 81-81? Okay. So I can write it like uh 81 into 11. Okay. So there's eight. Even further. What I can do is I can write it as 19 to 9 into 11. Okay. So I got a pair out so I'll take it out. So this becomes 9 11. So F. Gs nine, Route 11. Okay. This was the B. Part. So I consulted uh the A part solution for a part mm hmm, 80 equals. How much did he was


Similar Solved Questions

5 answers
Udon takectbiccm ~bbdinne Df 3 rocze noanFacociaconds (=re25,55,85, 130, 175,225,275, 335,295,and 470 f231acoctGdezcidaF-imalelad during theFaconcsWnc ;3incxirialtt disincc Vtl?
Udon takect biccm ~bbdinne Df 3 rocze noan Facoci aconds (=re 25,55,85, 130, 175,225,275, 335,295,and 470 f231 acoct Gdezcida F-imal elad during the Faconcs Wnc ;3incxirialtt disincc Vtl?...
5 answers
RntohUnknowa Acid Nurber 4Da4J1n Kid:Molariny &r NOH: OHALM (avenge frm FAIA) Tnil |Tr 7Tal jIntal durc[ reeding: mL0.004.0200 30,012.0 |Final burel reading; mL Volume of NaOH used,mL9011236.4030.15 35,00_3590 Volume of unknown used, mI_ 2173 Molarity of unknown, mmollmL95.0095.0033 4039214Avcrab: mclarity cfunkornRelative average devjation acidily
rntoh Unknowa Acid Nurber 4Da4J1n Kid: Molariny &r NOH: OHALM (avenge frm FAIA) Tnil | Tr 7 Tal j Intal durc[ reeding: mL 0.00 4.0 200 30,01 2.0 | Final burel reading; mL Volume of NaOH used,mL 90112 36.40 30.15 35,00_ 3590 Volume of unknown used, mI_ 2173 Molarity of unknown, mmollmL 95.00 95.0...
5 answers
Problemburat of compressed alr pushes pellet oul 0l n exened bytnc blotripo pocot i Diven F(t) = Foel-T{r), wore callud constni Deciuse unit onbmeWnni donrpresnnizcneckCepy:mecrusenbnuujo '3cmnimtrerrsene'e3nosan"lorco alimc ( = DAineOrar UpPant @AJna0 to Fuetnltatunccrtniihn:E1pett Yolrunetvorottho #anuolotinduxponanti conaeantuGive WpPant Knat& EnaAlmunincunlecaAmnLucedtExprctFumeVutinlkeexponential constantMacRoak ProJata
Problem burat of compressed alr pushes pellet oul 0l n exened bytnc blotripo pocot i Diven F(t) = Foel-T{r), wore callud constni Deciuse unit onbme Wnni don rpresnniz cneck Cepy: mecrusenb nuujo '3c mnimt rerrsene 'e3nosan" lorco alimc ( = D Aine Orar Up Pant @ AJna 0 to Fuetnltatun...
5 answers
Ndleconoxoluto oRbom4Iathovalma ole #toreMncman462 InaOcHnESolect a conec chcice belornoclisany,tha anbnudjlecomalcIn rour choiceIna absoute Majnuit hich orcur "*0 (Round Iho abepute mxlmum [uo decnul puctt Jeculo Typn _ axad answer Iar ta value nlanon thmaximun DEcUM Eepuju ! iirtch annthano HTnco mnamneconna
ndleconoxoluto oRbom4Iatho valma ole #tore Mncman 462 Ina OcHnE Solect a conec chcice belor noclisany, tha anbnudjle comalcIn rour choice Ina absoute Majnuit hich orcur "*0 (Round Iho abepute mxlmum [uo decnul puctt Jeculo Typn _ axad answer Iar ta value nlanon thmaximun DEcUM Eepuju ! iirtch ...
5 answers
With 4 rectangles to find lapproximations of the area Use left and right endpoints and the x-axis on the interval [2,4]: Note: this between the graph of f (x) X-x2 techniques from calculus L, so you cannot (at function CANNOT be integrated using Calculus to obtain an exact answer: (3 this time) use the Fundamental Theorem of € points each) Using left endpoints:Using right endpoints:
with 4 rectangles to find lapproximations of the area Use left and right endpoints and the x-axis on the interval [2,4]: Note: this between the graph of f (x) X-x2 techniques from calculus L, so you cannot (at function CANNOT be integrated using Calculus to obtain an exact answer: (3 this time) use ...
5 answers
Rank the following compounds in order of increasing boiling points, CHM(CH:)CHs , CH (CH)NHz , CH CHN(CHs): , HN(CHJNH; How would you separate toluene (CHsCHs) benzoic acid (CHsCOOH ) and aniline (CHsNH ) by an extraction procedure,Draw the product formed
Rank the following compounds in order of increasing boiling points, CHM(CH:)CHs , CH (CH)NHz , CH CHN(CHs): , HN(CHJNH; How would you separate toluene (CHsCHs) benzoic acid (CHsCOOH ) and aniline (CHsNH ) by an extraction procedure, Draw the product formed...
5 answers
$$left.f cot heta+an heta=x, sec heta-cos heta=y ext { , eliminate } heta ext { . {Ans. }(x y)^{frac{2}{3}}left(x^{frac{2}{3}}-y^{frac{2}{3}}ight)=1ight}$$
$$ left.f cot heta+ an heta=x, sec heta-cos heta=y ext { , eliminate } heta ext { . {Ans. }(x y)^{frac{2}{3}}left(x^{frac{2}{3}}-y^{frac{2}{3}} ight)=1 ight} $$...
5 answers
Oliusc Calculaling VApor Frouture trom Gollna polat und enthalpy ol'Tihe enthulpy of vaparlzatlon of Substance X: 22,0And enormal bolllng point 88, #C Calculota tho vapor pressure or X 0t 52"€;Round Your answcf {0 slgnincant diqlts.0,PLuulinutonChec
Oliusc Calculaling VApor Frouture trom Gollna polat und enthalpy ol 'Tihe enthulpy of vaparlzatlon of Substance X: 22,0 And enormal bolllng point 88, #C Calculota tho vapor pressure or X 0t 52"€; Round Your answcf {0 slgnincant diqlts. 0,P Luulinuton Chec...
5 answers
Findy' if y = (2x) VrSelect one:In(21) (21) Vr 3 ~In(2c) (22) Vr 3Vz2 3 + ln(2c) ) (21) r 3 + In() y' = (2x) Vz 3Vz? + In(21) (2c) Vr 3Vz2
Findy' if y = (2x) Vr Select one: In(21) (21) Vr 3 ~In(2c) (22) Vr 3Vz2 3 + ln(2c) ) (21) r 3 + In() y' = (2x) Vz 3Vz? + In(21) (2c) Vr 3Vz2...
5 answers
Determine whether each statement is true or false. If the statement is false, make the necessary change(s) to produce a true statement.Find the standard form of the equation of an ellipse with vertices at (0,-6) and $(0,6),$ passing through (2,-4)
Determine whether each statement is true or false. If the statement is false, make the necessary change(s) to produce a true statement. Find the standard form of the equation of an ellipse with vertices at (0,-6) and $(0,6),$ passing through (2,-4)...
5 answers
Cunan en LodainoeIn daimrd thn tha JvrtJre odult consumg 95 cinol sLi per (y Totest thia cholm # randorn Mmpla at 1 oduits WIs Heecunc sd thet avctavc consumplron Wa: {cund Iobu 1,7cans Oct duy: Assumc Iht sundIrd deilelian 0,5 Enns Uuire ?Aoi u Typottoye Dete nIV e Uiep Valug (ot Ie tet
Cunan en LodainoeIn daimrd thn tha JvrtJre odult consumg 95 cinol sLi per (y Totest thia cholm # randorn Mmpla at 1 oduits WIs Heecunc sd thet avctavc consumplron Wa: {cund Iobu 1,7cans Oct duy: Assumc Iht sundIrd deilelian 0,5 Enns Uuire ? Aoi u Typottoye Dete nIV e Uiep Valug (ot Ie tet...
5 answers
Polarity: Roat NonttolatPhysical PropertiesTlzs> NameSatuhility with ntet IGalble Not Soluhle]Doilitg Foint> (stront cal Ilo; Hleh; Mculral Strong Hieh Modnim| Went Basc)Smnall situc un HelelaLatnLlnctumtortAlcoholPolarNeutral except Alcohols (C1 ate WCok acid9PhenolSolubleEtherThiolAldehyde(c1-CS) (C6 or more] Soluble Not Soluble ICI-C5) (C6 or morelKetone
Polarity: Roat Nonttolat Physical Properties Tlzs> Name Satuhility with ntet IGalble Not Soluhle] Doilitg Foint> (stront cal Ilo; Hleh; Mculral Strong Hieh Modnim| Went Basc) Smnall situc un Helela Latn Llnctum tort Alcohol Polar Neutral except Alcohols (C1 ate WCok acid9 Phenol Soluble Ether...
5 answers
Two dice, each weighted like the one in Exercise 5 , are thrown. Let $X$ be the random variable giving the sum of the numbers showing on top of the two dice.(a) Find the probability function for $X$.(b) Determine the mean and standard deviation of $X .$ Compare them with those found for unweighted dice in Example 3.
Two dice, each weighted like the one in Exercise 5 , are thrown. Let $X$ be the random variable giving the sum of the numbers showing on top of the two dice. (a) Find the probability function for $X$. (b) Determine the mean and standard deviation of $X .$ Compare them with those found for unweighted...
5 answers
Question 81ptsThe graph of a function f(t), defined on the interval [~3,6],is shown below: (The curved part of the graph is half circle of dius ] centered at (2,0).) A function F(r) is defined for 3<I < 6 by F(z) = J" s)dtOn which intervalls} i; the function F(~) increasing?0[-3,-Yul2,4 0[-2,-Iu[8,4 0 (-2,4JU[3,5] 0[-1,4u[4,6]
Question 8 1pts The graph of a function f(t), defined on the interval [~3,6],is shown below: (The curved part of the graph is half circle of dius ] centered at (2,0).) A function F(r) is defined for 3<I < 6 by F(z) = J" s)dt On which intervalls} i; the function F(~) increasing? 0[-3,-Yul2...
4 answers
Explain all the developmental events, fertilization,cleavage, gastrulation, organogenesis in particular, as wellas the embryonic stages they result in (i.e. zygote, morula,blastula, gastrula, neurula, pharyngula respectively).Difference between holoblastic and meroblastic cleavage, and howthat relates to yolk distribution.All 5 of the main ways cells migrateduring gastrula and draw and explain each one.
Explain all the developmental events, fertilization, cleavage, gastrulation, organogenesis in particular, as well as the embryonic stages they result in (i.e. zygote, morula, blastula, gastrula, neurula, pharyngula respectively). Difference between holoblastic and meroblastic cleavage, and how that ...
5 answers
2. Find the power series representation of f(1) TF4z and give the interval of convergence of the series
2. Find the power series representation of f(1) TF4z and give the interval of convergence of the series...
5 answers
Kelctrngtt ImpanantInettNitroglyccrine dccompose> violently according the ckemical equalin bclow WEI mass of carbon dioxide gas pnuluced rm CyHs(NOsh t) ~ CO-g) = 6 Ni(el -[0 H,Olg) 01(2)deconiposItion of 50.9 CHs(NO;;?261 SHE 6.726} =
Kelctrngtt Impanant Inett Nitroglyccrine dccompose> violently according the ckemical equalin bclow WEI mass of carbon dioxide gas pnuluced rm CyHs(NOsh t) ~ CO-g) = 6 Ni(el -[0 H,Olg) 01(2) deconiposItion of 50.9 CHs(NO;;? 261 SHE 6.726} =...
5 answers
Y" +y' = 6(t) - S(t - 3), y(0) = 1,y'(0) = 0
y" +y' = 6(t) - S(t - 3), y(0) = 1,y'(0) = 0...
5 answers
Eol VoyFormat Tooli Tabidt120tPampph0 words8 ptsQuestion 17shown the figure: The towers supporting the cable are The cables of a suspension bridge are in the shape of = paraboia what is the height of the high: If the cables touch the road surface midway between the towers; 700 feet apart and 100 feet SHOW YOUR WORK NO WORK; NO CREDIT cable at point 175 feet from the center of the bridge?Insert Fomtiat Tools Table Edit View12ptParagraph
Eol Voy Format Tooli Tabidt 120t Pampph 0 words 8 pts Question 17 shown the figure: The towers supporting the cable are The cables of a suspension bridge are in the shape of = paraboia what is the height of the high: If the cables touch the road surface midway between the towers; 700 feet apart and ...

-- 0.020700--