ARTICLES

Relative extrema is a term used in calculus to describe points on the graph of a function where there are minimums and maximums. It can be visualized as representing the peaks and valleys on a line graph.

www.reference.com/article/relative-extrema-af8a69d913756ceb

A quartic function graph shows the curve of a function in which the highest-degree term has x^4. Quartic graphs made from polynomials often have three extrema, two points of inflection and up to four x-intercepts. They c...

The most common use for calculus is to predict the way in which a graph grows. The process uses two derivatives of differential calculus to make accurate estimations in regard to where specific points on graphs end up as...

www.reference.com/article/calculus-used-a4d99d902d3f9ee2

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SIMILAR ARTICLES

In calculus, critical points or stationary points are any values of differentiable functions of complex or real variables whose derivative is 0, f(x0) = 0. In a differentiable function that has several real variables, cr...

www.reference.com/article/critical-points-calculus-3603e3859a567137

In calculus and related mathematical areas, a linear function is a polynomial function of degree zero or one or is the zero polynomial. In linear algebra and functional analysis, a linear function is a linear map.

www.reference.com/article/definition-linear-function-fba91278ef76aaa9

The instantaneous velocity in calculus is the first derivative of a function that expresses distance as a function of time. The instantaneous velocity is also depicted graphically as the slope of the tangent line at a sp...

www.reference.com/article/instantaneous-velocity-calculus-d07a09c66620fd30

Logarithmic differentiation refers to the process in calculus of finding the derivative of a function by using the properties of the natural logarithmic function. The natural logarithmic function is notated by "ln."

www.reference.com/article/logarithmic-differentiation-14f9b676839d14e2

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