5

Hexose such as glucose can exist in either a linear or a ringfrom under normal physiological conditions, but the linear isfavored. (True or false)...

Question

Hexose such as glucose can exist in either a linear or a ringfrom under normal physiological conditions, but the linear isfavored. (True or false)

Hexose such as glucose can exist in either a linear or a ring from under normal physiological conditions, but the linear is favored. (True or false)



Answers

True or false? Glucose-rich blood flows from the small intestine to the liver, which stores glucose as glycogen.

Okay. This particular question, we have to just answered the question in one burn as to one false. The cushion says that if I just read out, it is possible for a system off tooling medications, Something striking the keywords. It is asking about the possibility. Okay. On what about the possibility that the system off to linear equations in two variables are you toe just writing system off? Do linear equation, this beer, my toe writing. So system off to linear equation in two variables. Okay, system off tool integration and to wearables to be consistent and dependent. So toe be consistent with a straight consistent clear. Because this is the main thing and head so consistent on dependent. Okay, so, yes, this is true. This is true in the case, off many solution. So the answer simply comes out to be Yes. In short, there is a possibility. So the correct answer is true. Okay?

Yeah. So we want to know if the statement is true or false. And the statement that we're given is if F F. T. Is a linear function with positive slope than an anti derivative F is a linear function and this would be false. Here's why if we have um a linear function F F. T. Okay with a positive slope. So I just pick a simple example of X will have F of X equals X. And we see that the um anti derivative of this is not going to be a linear function. In fact it is going to be the graph X squared over two over chip. And the reason why is because if we were to take the derivative of this graph, so let's call this function. She of acts equal to X squared over two. Keep crime of acts is going to end up giving us it's line right here. So we see that if we have a linear function and we take its anti derivative, it's going to give us a quadratic function. If we take a quadratic functions, anti drift, it'll give us a cubic function. So we see that we can't go from linear to linear by taking the derivative or the anti derivative. Um We can however, um go from a line with zero slope, so Y equals four. Um and then if we took the anti derivative, it would give us Y equals four X. That would be the only example. But keep in mind why it was four does not have a positive slope, so it does not count as a counter example.

So here are given statement is well. If a system of three of the new equations is inconsistent, then it's graph has no common points common to all three equations. So graphically the solution to a system is the intersecting point of the graphs of all equations in the system. So in the case of a system with three linear equations, if the graphs of the equations do not intersect at the point, then the system is said to have no solutions and therefore be inconsistent. So the graphs of any pair of equations may or may not intersect, so this given statement is true.

Okay. In this particular case, we have to just answer in one word is true and false. If I just read order statement, the statement says that is it possible for us system off do linear equation and to variable as it says that it is in consistent on depended. So I see this is really not possible because if the system equation is inconsistent, the springs that there's not of any solution at all. So how can it be? Depended? Okay, so this is clearly faults.


Similar Solved Questions

5 answers
QUESTION 3What is the angular separation in degrees of two spectral lines of wavelengths 417 nm and 367 nm formed in order m=2 with a 397 linelmm grating? Express the answer (numerical value only) with two decimal places:
QUESTION 3 What is the angular separation in degrees of two spectral lines of wavelengths 417 nm and 367 nm formed in order m=2 with a 397 linelmm grating? Express the answer (numerical value only) with two decimal places:...
5 answers
'conditions necessary for the following rcactions: Provide the MAJOR intenediate prodluct taclants (monosubstitution). (15 pts) Assume all EAS rcuctions will proxced and that the rcactants only rcact onceHNO; HSO_AICI, (X8)Zn (Hg} HC
'conditions necessary for the following rcactions: Provide the MAJOR intenediate prodluct taclants (monosubstitution). (15 pts) Assume all EAS rcuctions will proxced and that the rcactants only rcact once HNO; HSO_ AICI, (X8) Zn (Hg} HC...
5 answers
Question 5What is the direction 0f the electric force acting on the charged ball?RightDownLett
Question 5 What is the direction 0f the electric force acting on the charged ball? Right Down Lett...
5 answers
Set up only the integral(s) that would be required to find the area common to r = 3and r=5+4cos0 For two points extra credit, all or nothing; what is the area? You musL_show_the work_
Set up only the integral(s) that would be required to find the area common to r = 3and r=5+4cos0 For two points extra credit, all or nothing; what is the area? You musL_show_the work_...
5 answers
Ammonia decompose s t0 H dnd N 8i6r and 0f energ{ Is dbsorbed_ 22.0 Kcai energy is abSorbed When 35.0g How mvch ammonia rea cts? of
Ammonia decompose s t0 H dnd N 8i6r and 0f energ{ Is dbsorbed_ 22.0 Kcai energy is abSorbed When 35.0g How mvch ammonia rea cts? of...
5 answers
An abrupt silicon $mathrm{p}^{+} mathrm{n}$ junction has an $mathrm{n}$ -region doping concentration of $N_{d}=5 imes$ $10^{15} mathrm{~cm}^{-3} .$ What must be the minimum n-region width such that avalanche breakdown occurs before the depletion region reaches an ohmic contact (punchthrough)?
An abrupt silicon $mathrm{p}^{+} mathrm{n}$ junction has an $mathrm{n}$ -region doping concentration of $N_{d}=5 imes$ $10^{15} mathrm{~cm}^{-3} .$ What must be the minimum n-region width such that avalanche breakdown occurs before the depletion region reaches an ohmic contact (punchthrough)?...
5 answers
Is there a critical angle for a light ray coming from a medium with an index of refraction 1.2 and incident ona medium that has an index of refraction $1.4 ?$ If so, what is the critical angle that allows total internal reflection in the first medium?
Is there a critical angle for a light ray coming from a medium with an index of refraction 1.2 and incident on a medium that has an index of refraction $1.4 ?$ If so, what is the critical angle that allows total internal reflection in the first medium?...
1 answers
Find the effective rate of interest. For $5 \%$ compounded continuously
Find the effective rate of interest. For $5 \%$ compounded continuously...
5 answers
Describe the overall trend in Figure 7.19.
Describe the overall trend in Figure 7.19....
1 answers
Determine the size of each matrix. $\left[\begin{array}{r}-3 \\ y \\ 5\end{array}\right]$
Determine the size of each matrix. $\left[\begin{array}{r}-3 \\ y \\ 5\end{array}\right]$...
5 answers
A 83-watt light bulb carries a current of 0.8A. What is theamount of the total charge passing through it in 1 hour? Answer inCoulombs.
A 83-watt light bulb carries a current of 0.8A. What is the amount of the total charge passing through it in 1 hour? Answer in Coulombs....
5 answers
The RECURSION FORMULA of the differential equation y' +12y = 0 is1 OA Cn+l = Cw n +1 12 B Cn+l = Cw n +1 C.None of these. 14 D Cn+l = Cw n +113 OE Cn+1l = Cw n +1
The RECURSION FORMULA of the differential equation y' +12y = 0 is 1 OA Cn+l = Cw n +1 12 B Cn+l = Cw n +1 C.None of these. 14 D Cn+l = Cw n +1 13 OE Cn+1l = Cw n +1...
2 answers
Use Theorem 7.1.1 to find ${flt)}. (Write your answerfunction of s.)ftt)5 {Kt)}
Use Theorem 7.1.1 to find ${flt)}. (Write your answer function of s.) ftt) 5 {Kt)}...
5 answers
8 The flux of the vector field F out of the surface S is given by f JsF . ndS, where n is the outward normal: In each part below r = ci+yj + 2k is the position vector. (2 points) Find the fux of F = FF out of the surface _2 + y2 + 22 = 1. b) (2 points) Find the flux of F = out of the surface w2 + y? + 22 = 1. (3 points) Find the flux ofF = (r-22r)i+(z?y+y)j-zk out of the surface z2+y2+22 =(3 points) Find the flux of Fout of the surface (x _ 8)+}(y- 9)+(2+8)? =
8 The flux of the vector field F out of the surface S is given by f JsF . ndS, where n is the outward normal: In each part below r = ci+yj + 2k is the position vector. (2 points) Find the fux of F = FF out of the surface _2 + y2 + 22 = 1. b) (2 points) Find the flux of F = out of the surface w2 + y?...
5 answers
Let Xand Ybe two continuous random variables with joint probability density finnction given by: f (xy)={3x 0<ysx<l Jo elsewhere with E(1)= } ECT ) 53 E(Y) = 3 E(Y' ) = and E(TY) 3 5 10Then tle value of tlle variance of HY i:91/3200 7/2043/3203/80
Let Xand Ybe two continuous random variables with joint probability density finnction given by: f (xy)={3x 0<ysx<l Jo elsewhere with E(1)= } ECT ) 53 E(Y) = 3 E(Y' ) = and E(TY) 3 5 10 Then tle value of tlle variance of HY i: 91/320 0 7/20 43/320 3/80...

-- 0.019788--