Written by the Fiveable Content Team • Last updated September 2025
Verified for the 2026 exam
Verified for the 2026 exam•Written by the Fiveable Content Team • Last updated September 2025
Definition
The derivatives of polar functions refer to the rates at which the radius (r) and angle (θ) are changing with respect to each other. They represent the instantaneous rates of change for polar curves.
This term refers to the rate at which the radius is changing with respect to the angle. It measures how fast or slow a point is moving away from or towards the origin as it rotates.
This term refers to the steepness or inclination of a line that touches a curve at one point. In terms of polar functions, it represents how rapidly a curve is changing direction at any given point.
These are mathematical representations that describe points in terms of their distance from an origin (radius) and their rotation from a reference line (angle). Polar curves can take various shapes such as circles, cardioids, spirals, etc.