Having a cow !

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Let’s have a cow first:

There are more:

For example:

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Constructing the tangent line of circle again

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We will construct the tangent line of circle differently than what is shown in a previous post.

Start from the equation of circle with radius r, centered at the origin of the rectangular coordinate system:

x^2+y^2=r^2\quad\quad\quad(1)

Differentiate (1), we have

2x + 2y { {dy} \over {dx} } = 0.

At (x_0, y_0),

{x_0 + y_0 {{dy} \over {dx}}} = 0

i.e.,

y_0 {{dy} \over {dx}} = -x_0

If y_0 \neq 0,

{{dy} \over {dx} }={ {-x_0} \over {y_0}}

y = {{-x_0} \over {y_0}} x + m

That is

y_0 y = -x_0 x +my_0

or

x_0 x + y_0 y= my_0\quad\quad\quad(2)

At (x_0, y_0),

my_0 = x_0^2+y_0^2=r^2

It follows that by (2),

x_0 x + y_0 y= r^2

Constructing the tangent line of circle without calculus

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The tangent line of a circle can be defined as a line that intersects the circle at one point only.

Put a circle in the rectangular coordinate system.

Let (x_0, y_0) be a point on a circle. The tangent line at (x_0, y_0) is a line intersects the circle at (x_0, y_0) only.

Let’s first find a function y=kx+m that represents the line.

From circle’s equation x^2+y^2=r^2, we have

y^2=r^2-x^2

Since the line intersects the circle at (x_0, y_0) only,

r^2-x^2=(kx+m)^2

has only one solution.

That means

k^2x^2+x^2+2kmx+m^2-r^2 =0

has only one solution. i.e., its discriminant

(2km)^2-4(k^2+1)(m^2-r^2)=0\quad\quad\quad(1)

By the definition of slope,

kx+m-y_0 = k(x-x_0).

It follows that

m =y_0-kx_0\quad\quad\quad(2)

Substitute (2) into (1) and solve for k gives

k = \frac{-x_0}{y_0}\quad\quad\quad(3)

The slope of line connecting (0, 0) and (x_0, y_0) where x_0 \neq 0 is \frac{y_0}{x_0}.

Since \frac{-x_0}{y_0}\cdot \frac{y_0}{x_0} = -1, the tangent line is perpendicular to the line connecting (0, 0) and (x_0, y_0).

Substitute (3) into y = k x +m, we have

y=-\frac{x_0}{y_0} x + m\quad\quad\quad(4).

The fact that the line intersects the circle at (x_0, y_0) means

y_0 = -\frac{x_0^2}{y_0} + m

or

y_0^2=-x_0^2+ my_0.

Hence,

m =\frac{x_0^2+y_0^2}{y_0} = \frac{r^2}{y_0}.

It follows that by (4),

x_0 x +y_0 y = r^2\quad\quad\quad(5)

(5) is derived under the assumption that y_0 \neq 0. However, by letting y_0 =0 in (5), we obtain two tangent lines that can not be expressed in the form of y=kx+m:

x=-r, x=r

Constructing the tangent line of quadratic without calculus

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The tangent line of a quadratic function at (x_0, y_0)is a line y=kx+m that intersects y=ax^2+bx+c at (x_0, y_0=ax_0^2+bx_0+c) only.

The presence of function y=kx+m immediately excludes the vertical line x=x_0 which also intersects y=ax^2+bx+c at (x_0, ax_0^2+bx_0+c) only (see Fig. 1).

Fig. 1

Let’s find k.

Line y = kx+m intersects y=ax^2+bx+c at (x_0, ax_0^2+bx_0+c) only means quadratic equation

ax^2+bx +c =kx +m

has only one solution. That is, the discriminant of ax^2+bx+c-kx-m =0 is zero:

(b-k)^2-4a(c-m) = 0\quad\quad\quad(1)

Fig. 2

And, by the definition of slope (see Fig. 2),

(x-x_0)k = (kx+m)-(ax_0^2+bx_0+c).

It follows that

m = (ax_0^2+b_0+c)-x_0 k\quad\quad\quad(2)

Substituting (2) into (1), we have

(b-k)^2-4a(c-((a_0 x^2+b x_0 + c)-x_0 k)=0.

Solve it for k gives

k = 2 a x_0 +b.

Fig. 3

A Proof without Calculus

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Now, solve \sin(x)=x.

By inspection, x=0.

Is this the only solution?

Visually, it is difficult to tell (see Fig. 1 and Fig. 2)

Fig. 1

Fig. 2

However, we can prove that 0 is the only solution:

Fig. 3

If 0 < x \leq 1 < \frac{\pi}{2} then from Fig. 3, we have

Area of triangle OAB < Area of circular sector OAB.

That is,

\frac{1}{2}\cdot 1 \cdot \sin(x)< \frac{1}{2}\cdot 1 \cdot x.

Hence,

\forall 0< x \leq 1, \sin(x) < x\quad\quad\quad(1)

If x>1 then

\sin(x) \leq 1 \overset{x>1}{\implies} \sin(x) \leq 1< x \implies \forall x>1, \sin(x) <x\quad\quad\quad(2)

Put (1) and (2) together, we have

\forall x > 0, \sin(x) < x\quad\quad\quad(3)

If x < 0 then

-x > 0 \overset{(3)}\implies \sin(-x) < -x \overset{\sin(-x)=-\sin(x)}\implies -\sin(x) < -x \implies \sin(x) > x

i.e.,

\forall x < 0, \sin(x) > x\quad\quad\quad(4)

Therefore by (3) and (4), we conclude that

only when x = 0, \sin(x)=x.

From proof to simpler proof

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Solve \sin(x)=2x for x.

By mere inspection, we have x=0.

Visually, it appears that 0 is the only solution (see Fig.1 or Fig. 2)

Fig. 1

Fig. 2

To show that 0 is the only solution of \sin(x)=2x analytically, let

f(x) = \sin(x)-2x

0 is a solution of \sin(x)=2x means

f(0) = 0\quad\quad\quad(1)

Suppose there is a solution

x^* \neq 0\quad\quad\quad(2)

then,

f(x^*)=\sin(x^*)-2x^*=0\quad\quad\quad(3)

Since f(x) is an function continuous and differentiable on (-\infty, +\infty),

by Lagrange’s Mean-Value Theorem (see “A Sprint to FTC“), there \exists c \in (0, x^*) such that

f(x^*)-f(0)=f'(c)(x^*-0)

\overset{(1), (3)}{\implies} 0 = f'(c) x^*\quad\quad\quad(4)

\overset{(2)}{\implies} f'(c)=0\quad\quad\quad(5).

We know

f'(x) = \cos(x)-2.

From (5), we have

\cos(c)-2=0.

i.e.,

\cos(c)=2.

This is not possible since \forall x \in R, -1 \le \cos(x) \le 1.

A simpler alternative without direct applying Lagrange’s Mean-Value Theorem is:

f(x) = \sin(x)-2x \implies f'(x) = \cos(x) - 2 \overset{-1 \le \cos(x) \le 1}{\implies} f'(x) < 0\implies

f(x) =\sin(x)-2x is a strictly decreasing function.

Since f(0) = 0, \forall x<0, f(x) > 0 and \forall x>0, f(x) < 0.

Therefore, 0 is the only solution of f(x)=0. i.e.,

0 is the only solution of \sin(x) = 2x.

Analyzing Heron’s Algorithm

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Finding the value of \sqrt{a} for a>0 is equivalent to seeking a positive number x whose square yields a: x^2=a. In other words, the solution to x^2-a=0.

We can find \sqrt{4} by solving x^2-4=0. It is 2 by mere inspection. \sqrt{9} can also be obtained by solving x^2-9=0, again, by mere inspection. But ‘mere inspection’ can only go so far. For Example, what is \sqrt{15241578750190521}?

Method for finding the square root of a positive real number date back to the acient Greek and Babylonian eras. Heron’s algorithm, also known as the Babylonian method, is an algorithm named after the 1^{st} – century Greek mathematician Hero of Alexandria, It proceeds as follows:

  1. Begin with an arbitrary positive starting value x_0.
  2. Let x_{k+1} be the average of x_k and \frac{a}{x_k}
  3. Repeat step 2 until the desired accuracy is achieved.

This post offers an analysis of Heron’s algorithm. Our aim is a better understanding of the algorithm through mathematics.

Let us begin by arbitrarily choosing a number x_0>0. If x_0^2-a=0, then x_0 is \sqrt{a}, and we have guessed the exact value of the square root. Otherwise, we are in one of the following cases:

Case 1: x_0^2-a > 0 \implies x_0^2 > a \implies \sqrt{a} x_0 > a \implies \sqrt{a} > \frac{a}{x_0} \implies \frac{a}{x_0} < \sqrt{a} < x_0

Case 2: x_0^2-a <0 \implies x_0 < \sqrt{a} \implies \sqrt{a} x_0 < a \implies \sqrt{a} < \frac{a}{x_0} \implies x_0 < \sqrt{a} < \frac{a}{x_0}

Both cases indicate that \sqrt{a} lies somewhere between \frac{a}{x_0} and x_0.

Let us define e_0 as the relative error of approximating \sqrt{a} by x_0:

e_0 =\frac{x_0-\sqrt{a}}{\sqrt{a}}

The closer e_0 is to 0, the better x_0 is as an approximation of \sqrt{a}.

Since x_0>0, \sqrt{a}>0,

e_0 + 1 = \frac{x_0-\sqrt{a}}{\sqrt{a}} + 1 = \frac{x_0}{\sqrt{a}} > 0\quad\quad\quad(1)

By (1),

x_0 = \sqrt{a} (e_0+1)\quad\quad\quad(2)

Let x_1 be the mid-point of x_0 and \frac{a}{x_0}:

x_1 = \frac{1}{2} (x_0 + \frac{a}{x_0})\quad\quad\quad(3)

and, e_1 the relative error of x_1 approximating \sqrt{a},

e_1 = \frac{x_1-\sqrt{a}}{\sqrt{a}}\quad\quad\quad(4)

We have

x_1-\sqrt{a}\overset{(3)}{=}\frac{1}{2}(x_0+\frac{a}{x_0}) - \sqrt{a} \overset{(2)}{=}\frac{1}{2}(\sqrt{a}(e_0+1)+\frac{a}{\sqrt{a}(e_0+1)})-\sqrt{a}=\frac{\sqrt{a}}{2}\frac{e_0^2}{e_0+1}\overset{(1)}{>}0\quad(5)

e_1 = \frac{x_1-\sqrt{a}}{\sqrt{a}} \overset{(5)}{=} \frac{\frac{\sqrt{a}}{2}\frac{e_0^2}{e_0+1}}{\sqrt{a}} = \frac{1}{2}\frac{e_0^2}{e_0+1}\overset{(1)}{ > }0\quad\quad\quad(6)

By (5),

x_1 > \sqrt{a} \implies \sqrt{a} x_1 > a \implies \sqrt{a} > \frac{a}{x_1}\implies \frac{\sqrt{a}}{x_1} < \sqrt{a} < x_1

i.e., \sqrt{a} lies between \frac{a}{x_1} and x_1.

We can generate more values in stages by

x_{k+1} = \frac{1}{2}(x_k + \frac{a}{x_k}), \;k=1, 2, 3, ...\quad\quad(8)

Clearly,

\forall k, x_k >0.

Let

e_k = \frac{x_k-\sqrt{a}}{\sqrt{a}}.

We have

x_k = \sqrt{a}(e_k+1)\quad\quad\quad(9)

and

e_{k+1} = \frac{x_{k+1}-\sqrt{a}}{\sqrt{a}}=\frac{\frac{1}{2}(\sqrt{a}(e_k+1) + \frac{a}{\sqrt{a}(e_k+1)})-\sqrt{a}}{\sqrt{a}}=\frac{1}{2}\frac{e_k^2}{e_k + 1}\quad\quad\quad(10)

Consequently, we can prove that

\forall k \ge 1, e_{k+1} > 0\quad\quad\quad(11)

by induction:

When k = 1, e_{1+1} \overset{(10)}{=} \frac{1}{2}\frac{e_1^2}{e_1+1} \overset{(6)} {>} 0.

Assume when k = p,

e_{p+1} =\frac{1}{2}\frac{e_p^2}{e_p^2+1} >0\quad\quad\quad(12)

When k = p + 1, e_{(p+1)+1} \overset{(10)}{=}\frac{1}{2}\frac{e_{p+1}^2}{e_{p+1} + 1}\overset{(12)}{>}0.

Since (11) implies

\forall k \ge 2, e_k > 0\quad\quad\quad(13)

(10) and (13) together implies

\forall k \ge 1, e_k > 0\quad\quad\quad(14)

It follows that

\forall k \ge 1, 0 \overset{(14)}{<} e_{k+1} \overset{(10)}{=} \frac{1}{2}\frac{e_k^2}{e_k+1} \overset{(14)}{<} \frac{1}{2}\frac{e_k^2}{e_k}=\frac{1}{2}e_k\quad\quad\quad(15)

and

\forall k \ge 1, 0 \overset{(14)}{<} e_{k+1} \overset{(10)}{=} \frac{1}{2}\frac{e_k^2}{e_k+1}\overset{(14)}{<}\frac{1}{2}\frac{e_k^2}{1}<e_k^2\quad\quad\quad(16)

(15) indicates that the error is cut at least in half at each stage after the first.

Therefore, we will reach a stage n that

0 < e_n < 1\quad\quad\quad(17)

It can be shown that

\forall k \ge 1, 0< e_{n+k} < e_n^{2^k}\quad\quad\quad(18)

by induction:

When k = 1,

0 \overset{(14)}{<} e_{n+1} \overset{(10)}{=}\frac{1}{2}\frac{e_n^2}{e_n+1} \overset{}{<} e_n^2=e_n^{2^1}\quad\quad\quad(19)

Assume when k = p,

0 < e_{n+p} < e_n^{2^p}\quad\quad\quad(20)

When k = p+1,

0 \overset{(14)}{<} e_{n+(p+1)} = e_{(n+p)+1} \overset{(16)}{<}e_{n+p}^2\overset{(20)}{<}(e_n^{2^p})^2 = e_n^{2^p\cdot 2} = e_n^{2^{p+1}}

From (17) and (18), we see that eventually, the error decreases at an exponential rate.

Illustrated below is a script that implements the Heron’s Algorithm:

/*
a   - the positive number whose square root we are seeking
x0  - the initial guess
eps - the desired accuracy
*/
square_root(a, x0, eps) := block(
    [xk],
    numer:true,
    xk:x0,
    loop,
        if abs(xk^2-a) < eps then return(xk),
        xk:(xk+a/xk)/2,
    go(loop)
)$

Suppose we want to find \sqrt{2} and start with x_0 = 99. Fig. 2 shows the Heron’s algorithm in action.

Fig. 1