Questions tagged [secant]

For questions about secant lines, which are lines that pass through two points on some curve.

In geometry, a secant line of a curve is a line that (locally) intersects two points on the curve. A chord is an interval of a secant line, the portion of the line that lies within the curve. The word secant comes from the Latin word secare, meaning to cut.

Secants can be used to approximate the tangent to a curve, at some point $P$. If the secant to a curve is defined by two points, $P$ and $Q$, with $P$ fixed and $Q$ variable, as $Q$ approaches $P$ along the curve, the direction of the secant approaches that of the tangent at $P$, (assuming that the first derivative of the curve is continuous at point $P$ so that there is only one tangent). As a consequence, one could say that the limit, as $Q$ approaches $P$, of the secant's slope, or direction, is that of the tangent. In calculus, this idea is the basis of the geometric definition of the derivative.

Source: https://en.wikipedia.org/wiki/Secant_line

64 questions

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2 answers

When taking the integral of $\sec(x)$, how do you come up with the crucial step?

You have to multiply with $\frac{\sec(x) + \tan(x)}{\sec(x) + \tan(x)}$ (http://math2.org/math/integrals/more/sec.htm), but how do you come up with this idea? Is there a specific reason for that step, or is it just mathematical intuition?

integration secant

asked Oct 06 '16 at 14:05

user3144065

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0 answers

A notion of "differentiation" based on secant rather than tangent

Given a differentiable real function $f$, the derivative $f'(x)$ is the slope of the tangent to the graph of $f$ at $(x,f(x))$. Suppose that, instead of the tangent, we look at the secant to the graph of $f$, between the point $(x,f(x))$ and the…

real-analysis derivatives tangent-line secant

asked Dec 31 '23 at 07:43

Erel Segal-Halevi

11,509

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2 answers

Evaluate $\sum_{n\geq 0} \mbox{arccot}(n^2 + n + 1)$

(This is a 1986 Putnam Challenge problem.) First, note that \begin{equation} n^2 + n + 1 = \frac{n^3 - 1}{n - 1}, \end{equation} which is the slope of the secant line through $f(x) = x^3$ at $x = 1$ and $x = n$. So $\mbox{arccot}\Big(\frac{n^3 -…

sequences-and-series trigonometry contest-math closed-form secant

asked Nov 02 '22 at 22:47

Dave Moutardier

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1 answer

Tangents imply secants

I am stuck with proving a limit which I think should be immediate... I will explain the problem and comment one of my attempts. Let $x: [0, \infty) \to \mathbb{R}^n$ be a differentiable arc with $\lim\limits_{t \to \infty} x(t) = x_0 \in…

differential-geometry tangent-line secant

asked Jun 23 '20 at 11:17

user651025

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2 answers

Connection between trigonometric identities and secant/tangent lines

Assuming the relationship I am asking about is obvious to most students, I hope this post is an opportunity for some to have fun exploring a basic question. What I'm wondering about is the relationship to the trigonometric identities I learned about…

calculus trigonometry limits-without-lhopital tangent-line secant

asked Jun 17 '20 at 01:58

abellizard

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4 answers

Find a general formula for a tangent to a cubic which, is also normal to the cubic at the second intersection

Let me preface by saying that I am not a professional mathematician, I just like to do some math in my spare time. I assume someone has tried this before but I can't find the right words to type into a search engine to get me what I want. As the…

calculus geometry cubics tangent-line secant

asked Sep 19 '19 at 23:01

CocoPrez

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1 answer

What is the term for a line that doesn't touch a function?

A line that cuts into a function is a secant line, and a line that just touches a function is a tangent line. But what is the term for a line that does not touch the function? Take the parabola: $$y=x^2$$ A secant line would be: $y=2$ A tangent line…

geometry tangent-line secant

asked Aug 20 '18 at 13:47

Kantura

2,787

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No lines meeting a curve in at least three distinct points implies no lines meeting a curve in three points counted with multiplicity?

Suppose $X\subset\Bbb P^3$ is a smooth projective curve over an algebraically closed field. Define a multisecant to be a line $L$ which intersects $X$ in at least three distinct points. If $X$ has no multisecants, does this imply that there are no…

algebraic-geometry algebraic-curves secant

asked Dec 08 '21 at 09:32

Hank Scorpio

2,951

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1 answer

Speed of convergence for the secant method

I am studying the following sequence, which comes from the secant method applied to $f : x \mapsto x^3$ between $\left[-\frac{1}{2},1\right]$ : $$x_{n+1}=x_n - \frac{x_{n}-x_{n-1}}{x_n^3-x_{n-1}^3} x_n^3$$ with $x_0=-\frac{1}{2}$ and $x_1=1$. I…

real-analysis sequences-and-series newton-raphson secant

asked Sep 30 '20 at 09:06

Velobos

2,190

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1 answer

Prove that if $x_n \to q$ as $n \to \infty$ and if $f'(q) \neq 0$ then $q$ is a zero of $f$ for the secant method.

The following is a textbook exercise that i am struggling with In the secant method prove that if $x_n \to q$ as $n \to \infty$ and if $f'(q) \neq 0$ then $q$ is a zero of $f$ I think i have a fair idea about why intuitively it is true however I…

real-analysis analysis numerical-methods secant

asked Sep 30 '19 at 19:58

user488081

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0 answers

construct an optimal car ramp minimizing the possible ride height

In the words of mathematics there is the problem of connecting two horizontal street sections separated by a distance, say A, at different height levels (difference H) with a function f(x). You now can imagine a secant line of given length…

calculus-of-variations secant

asked Nov 09 '17 at 13:55

Alexander Fischer

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1 answer

Some questions on the proof via Terracini's lemma and dimension that the secant variety of the twisted cubic is $\Bbb P^3$

I have found an argument in Four lectures about secant varieties by Enrico Carlini, Luke Oeding and Nathan Grieve on how to prove that the secant variety of the twisted cubic in projective space is indeed the entire space. From what I understand, it…

algebraic-geometry algebraic-curves projective-space secant

asked Dec 16 '24 at 15:18

Ferdi

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1 answer

Convergence of The Secant Method

I've been studying on some root finding techniques including The Bisection Method, False Position, The Secant Method and Newton-Raphson Method. I've seen proof of convergence for all of these techniques (under some assumptions on the functions of…

numerical-methods roots newton-raphson secant regula-falsi

asked Dec 19 '22 at 15:20

G.Bar

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0 answers

Why is it that when the lattice points of the √x function are connected, the area between the secant line and the √x function is constant?

If you connect the lattice points of $f(x) = \sqrt{x}$ together through secant lines, you create a function $ g(x) = \left\lfloor \sqrt{x} \right\rfloor + \frac{x - \left\lfloor \sqrt{x} \right\rfloor^2}{\left\lceil \sqrt{x} \right\rceil^2 - \left…

calculus algebra-precalculus secant

asked Nov 06 '22 at 18:07

Math Man

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2 answers

Prove when Instaneous Velocity is equal to Average Velocity with Constant Acceleration

Assume constant acceleration. It seems that average velocity over some time interval [t1, t2], will be equal to the instantaneous velocity at the midpoint t = 1/2[t1 + t2]. I'm wondering how you might prove this mathematically (assuming what I've…

derivatives proof-writing physics tangent-line secant

asked Aug 05 '22 at 18:57

wannabemathman

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