First Year Mathematics A (Differentiation & Linear Algebra) (1 Viewer)

InteGrand · Apr 2, 2016

Re: MATH1131 help thread

Flop21 said:
Yeah I understand that rule, thanks.

So I'm just not understanding why the sqrt on the bottom is making y have to be positive. I get that it involves the x but how does it involve the y?

A way of doing this, do we rearrange the function so that x is the subject, and from that we can easily see that y cannot be negative (and is this a good method for solving other functions like this?)?

Because of the square root, the denominator is by definition positive (it can't be 0 since we can't have 0 on a denominator; and remember, the symbol √(t) refers to the positive positive square root of t, where t is a positive real number).

Since y is equal to 1/(something positive), y itself is positive. In other words, 1/t > 0 whenever t > 0.

leehuan · Apr 2, 2016

Re: MATH1131 help thread

sqrt(1) = 1
sqrt(2) = sqrt(2)
sqrt(3) = sqrt(3)
sqrt(4) = 2
...

I just picked some positive integers.

Effectively, you cannot use the square root to force out a negative y value.

$$Note that $\sqrt{1}\neq\pm1$

$$Rather, $-\sqrt{1}=-1$ and $\sqrt{1}=1$ so as we have no negative sign in FRONT of $y=\frac{1}{\sqrt{3-x}}$ it cannot ever be negative$

$The equation would have to be $y=-\frac{1}{\sqrt{3-x}}$ to bring out a negative branch, but that gets rid of the positive branch$

Flop21 · Apr 2, 2016

Re: MATH1131 help thread

InteGrand said:
Because of the square root, the denominator is by definition positive (it can't be 0 since we can't have 0 on a denominator; and remember, the symbol √(t) refers to the positive positive square root of t, where t is a positive real number).

Since y is equal to 1/(something positive), y itself is positive. In other words, 1/t > 0 whenever t > 0.

Ohhh haha right, I understand.

Thanks all

Flop21 · Apr 3, 2016

Re: MATH1131 help thread

leehuan said:
Additional input.

$$The part pertaining to $y\ge0, \, x\ge 0$ tells me to use the first quadrant.\\ Then more specifically, the domain of the function is $0\le x \le 2$. \\ Lastly, it's just a matter of sketching $y \le 2x$ over these boundaries$

Sorry can someone further explain this.

The part I don't understand is actually getting the points to draw, I understand enough to figure out what quadrant etc though.

So you say sketching y<=2x, but how do you do that?

E.g. I have another similar question: sketch the set of points in the (x,y) plane satisfying 0<x<3y and 0<y<2

InteGrand · Apr 3, 2016

Re: MATH1131 help thread

Flop21 said:
Sorry can someone further explain this.

The part I don't understand is actually getting the points to draw, I understand enough to figure out what quadrant etc though.

So you say sketching y<=2x, but how do you do that?

E.g. I have another similar question: sketch the set of points in the (x,y) plane satisfying 0<x<3y and 0<y<2

To sketch y ≤ 2x, first sketch y = 2x. This is the boundary of the region. Then the places where y is less than (or equal to) 2x will be the places below (or on) this line. If the restriction is 0 ≤ x ≤ 2, then we only take the part where x is between 0 and 2.

To sketch the set of points in the (x,y) plane satisfying 0<x<3y and 0<y<2, first we note 0 < y < 2. Therefore, the region must be in the horizontal band strictly between the lines y = 0 and y = 2, so you can draw these lines (in dashed form), as our region will be between these.

Then sketch 0 < x < 3y, taking only the part in the horizontal band. To sketch 0 < x < 3y, first sketch x = 3y (this is the line y = x/3). Its intersection with the dashed line y = 2 is at the point (6, 2). Then, since we want only the places where x > 0 and x < 3y, take the part to the left of this line, but to the right of the y-axis (as x > 0).

So the final region is the interior of the triangle formed by the points (0,0), (0,2), (6,2), and excluding the boundaries.

Flop21 · Apr 3, 2016

Re: MATH1131 help thread

How do I show that f is continuous at 0... f(x) = |x|

InteGrand · Apr 3, 2016

Re: MATH1131 help thread

Flop21 said:
How do I show that f is continuous at 0... f(x) = |x|

Note f(0) = 0, so we need to show that f(x) -> f(0) = 0 as x -> 0. So we need to show that given eps > 0, there exists a delta > 0 such that if 0 < |x-0| < delta (i.e. 0 < |x| < delta), then |f(x) - 0| < eps.

To do this, let delta = eps, for any given eps > 0. Then suppose 0 < |x-0| < delta.

Then we have |x| < delta. Since |x| = ||x|| = ||x| - 0|, we have ||x| - 0| < delta, i.e. |f(x) - 0| < delta. But delta = eps, so |f(x) - 0| < eps, as we wanted.

Hence f is continuous at 0.

Flop21 · Apr 3, 2016

Re: MATH1131 help thread

InteGrand said:
Note f(0) = 0, so we need to show that f(x) -> f(0) = 0 as x -> 0. So we need to show that given eps > 0, there exists a delta > 0 such that if 0 < |x-0| < delta (i.e. 0 < |x| < delta), then |f(x) - 0| < eps.

To do this, let delta = eps, for any given eps > 0. Then suppose 0 < |x-0| < delta.

Then we have |x| < delta. Since |x| = ||x|| = ||x| - 0|, we have ||x| - 0| < delta, i.e. |f(x) - 0| < delta. But delta = eps, so |f(x) - 0| < eps, as we wanted.

Hence f is continuous at 0.

Is that using the formula proof of a limit? [fml I was hoping that was just one small part of the topic and have skipped over it].

InteGrand · Apr 3, 2016

Re: MATH1131 help thread

Flop21 said:
Is that using the formula proof of a limit? [fml I was hoping that was just one small part of the topic and have skipped over it].

I did it (proved the required limit) via the epsilon-delta definition of a limit.

Flop21 · Apr 3, 2016

Re: MATH1131 help thread

InteGrand said:
Note f(0) = 0, so we need to show that f(x) -> f(0) = 0 as x -> 0. So we need to show that given eps > 0, there exists a delta > 0 such that if 0 < |x-0| < delta (i.e. 0 < |x| < delta), then |f(x) - 0| < eps.

To do this, let delta = eps, for any given eps > 0. Then suppose 0 < |x-0| < delta.

Then we have |x| < delta. Since |x| = ||x|| = ||x| - 0|, we have ||x| - 0| < delta, i.e. |f(x) - 0| < delta. But delta = eps, so |f(x) - 0| < eps, as we wanted.

Hence f is continuous at 0.

So knowing the definition of a continuous function, can you just say since the its lim = 0 from both the left and right hand side, it is continuous since as x->a f(x) = f(a).

Would writing just that be acceptable as an answer instead of using the eps-delta method?

InteGrand · Apr 3, 2016

Re: MATH1131 help thread

Flop21 said:
So knowing the definition of a continuous function, can you just say since the its lim = 0 from both the left and right hand side, it is continuous since as x->a f(x) = f(a).

Would writing just that be acceptable as an answer instead of using the eps-delta method?

Idk, by saying that the limits are 0 from the left and right, it seems (in my opinion) too close to assuming what they're asking you to prove.

leehuan · Apr 3, 2016

Re: MATH1131 help thread

They defined continuity for us somewhere along the lines of this

$\\$Let $f:[a,b]\rightarrow \mathbb R .$ Then $f$ is continuous at $c$ for some $c\in [a,b]$ iff\\ $\lim_{x\rightarrow{c}^{-}}{f(x)}=\lim_{x\rightarrow {c}^{+}}{f(x)} $ both exist and equal to $f(c)$

turntaker · Apr 10, 2016

Re: MATH1131 help thread

(a) Show that if A is a 2 × 2 matrix, and its two rows are identical, then det(A) = 0.

(b) Prove by induction that if A is an n × n matrix which has two identical rows, then det(A) = 0.
[Hint: expand along one of the other rows].

How would one approach this question? Part a is quite easy, though I am not sure about part b.

iforgotmyname · Apr 10, 2016

Re: MATH1131 help thread

turntaker said:
(a) Show that if A is a 2 × 2 matrix, and its two rows are identical, then det(A) = 0.

(b) Prove by induction that if A is an n × n matrix which has two identical rows, then det(A) = 0.
[Hint: expand along one of the other rows].

How would one approach this question? Part a is quite easy, though I am not sure about part b.

|a al
|b bl = ab-ba

turntaker · Apr 10, 2016

Re: MATH1131 help thread

iforgotmyname said:
|a al
|b bl = ab-ba

that's part a

InteGrand · Apr 10, 2016

Re: MATH1131 help thread

turntaker said:
(a) Show that if A is a 2 × 2 matrix, and its two rows are identical, then det(A) = 0.

(b) Prove by induction that if A is an n × n matrix which has two identical rows, then det(A) = 0.
[Hint: expand along one of the other rows].

How would one approach this question? Part a is quite easy, though I am not sure about part b.

$\noindent I'll sketch the idea (I assume you managed to do part (a)). Assume the result is true for $n-1$, and consider the $n\times n$ matrix, which'll essentially be of this form: $A=\begin{bmatrix} a_1 &a_2 &\cdots &a_n \\ a_1 & a_2 &\cdots &a_n \\ \vdots & \vdots & \ddots & \vdots\\ x_1 & x_2 &\cdots & x_n \end{bmatrix}$.$

$\noindent (In general, the two identical rows could be in any of the rows, but as you know, we could always switch the rows to put them at the top, and the determinant would only possibly be changed in sign; so if we can prove that the matrix $A$ above has zero determinant, it does it for the general case too.)$

$\noindent Consider expanding $A$ along the last row. The determinant will look like $x_j$ times the minor obtained by deleting the last row and column $j$, summed over $j$ from $1$ to $n$, i.e. $\sum _{j=1} ^{n} (-1)^{n+j}x_j M_{n,j}$, where $M_{n,j}$ represents the minor we described. Now, each term of this sum will involve a determinant of a smaller matrix (size $\left(n-1)\times \left(n-1\right)$), but each of these determinants is just 0 from our inductive hypothesis, because if you look at those submatrices, they each contain the top two rows with one of the elements removed, so they still have the top two rows identical. It follows that the sum is 0, so $\det \left(A\right)=0$, as we wanted to show.$

(Parity of an integer refers to whether it is odd or even.)

Flop21 · Apr 12, 2016

Re: MATH1131 help thread

Okay so with parametric vector forms of lines...

I was under the impression it was x = a + lambda(v). And I though V was simply AB (given two points A and B), so to get the vector you go B-A.

But in the solutions for my practice test it has A-B. Why have they got this, and if that is correct, why?

leehuan · Apr 12, 2016

Re: MATH1131 help thread

Flop21 said:
Okay so with parametric vector forms of lines...

I was under the impression it was x = a + lambda(v). And I though V was simply AB (given two points A and B), so to get the vector you go B-A.

But in the solutions for my practice test it has A-B. Why have they got this, and if that is correct, why?

Doesn't matter. Let mu = -lambda and donezo

Convention is to use B-A because A-B is technically a negative case

InteGrand · Apr 12, 2016

Re: MATH1131 help thread

Flop21 said:
Okay so with parametric vector forms of lines...

I was under the impression it was x = a + lambda(v). And I though V was simply AB (given two points A and B), so to get the vector you go B-A.

But in the solutions for my practice test it has A-B. Why have they got this, and if that is correct, why?

$\noindent Yes, it can be the vector $\overrightarrow{BA}$ or $\overrightarrow{AB}$ or more generally any non-zero scalar multiple of $\overrightarrow{AB}$. This is because whichever non-zero scalar multiple of it we use, we'll end up covering precisely the same line as $\lambda$ varies throughout the real numbers.$

Flop21 · Apr 12, 2016

Re: MATH1131 help thread

InteGrand said:
$\noindent Yes, it can be the vector $\overrightarrow{BA}$ or $\overrightarrow{AB}$ or more generally any non-zero scalar multiple of $\overrightarrow{AB}$. This is because whichever non-zero scalar multiple of it we use, we'll end up covering precisely the same line as $\lambda$ varies throughout the real numbers.$

Oh right, because you can have multiple parametric vector forms for the same line? Because I was getting the signs of my vectors opposite to the answers (since they used A-B).

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