# Slope of the Tangent Line (darker slopes for visibility)

- Author:
- gbattaly

- Topic:
- Derivative

Points A and C are moveable.
The tangent to the graph of f(x) = x^2 at the point C is in blue. The slope of this tangent line is in blue and designated as mTan.
The secant line connecting points A and C is in green. The slope of this secant line is in green and designated as mSec.
1. Select a location for point C.
2. Move point A towards point C.

What happens to the distance between the x-coordinates as A approaches C?
What happens to the slope of the secant line as A approaches C?
As A approaches C, how does the slope of the secant line compare to the slope of the tangent line?
Interpretation: As A moves closer to C, the slope of the secant line connecting A and C approaches the slope of the tangent line at C.
Thus, we can define the slope of the tangent line as the limit of the slope of the secant line as A approaches C (or as delta x approaches 0).