Encyclopedia > Secant line

  Article Content

Secant

Redirected from Secant line

In trigonometry, a secant is a particular trigonometric function, the reciprocal of the cosine function.


A secant line of a curve is that line which intersects two (or more) points upon the curve. Note that this use of "secant" comes from the Latin "secare", for "to cut"; this is not a reference to the trigonometric function.

It 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 there is just one).

As a consequence, one could say that the limit of the secant's slope, or direction, is that of the tangent.

Secant Approximation

Consider the curve defined by y = f(x) in a Cartesian coordinate system, and consider a point P with coordinates (c, f(c)) and another point Q with coordinates (c + Δx, f(c + Δx)). Then the slope m of the secant line, through P and Q, is given by:

m = Δy / Δx = [f(c + Δx) - f(c)] / [(c + Δx) - c] = [f(c + Δx) - f(c)] / Δx

The righthand side, of the above equation, is a variation of Newton's difference quotient. As Δx approaches zero, this expression approaches the derivative of f(c), assuming a derivative exists.

See also: derivative, differential calculus



All Wikipedia text is available under the terms of the GNU Free Documentation License

 
  Search Encyclopedia

Search over one million articles, find something about almost anything!
 
 
  
  Featured Article
Reformed churches

... French Reformed refugees to England, Germany, Switzerland, Africa and America. A free (meaning, not state controlled) synod of the Reformed Church emerged in 1848 and ...

 
 
 
This page was created in 30.6 ms